A paraconsistent logic is an attempt at a
logical system
A formal system is an abstract structure used for inferring theorems from axioms according to a set of rules. These rules, which are used for carrying out the inference of theorems from axioms, are the logical calculus of the formal system.
A form ...
to deal with
contradiction
In traditional logic, a contradiction occurs when a proposition conflicts either with itself or established fact. It is often used as a tool to detect disingenuous beliefs and bias. Illustrating a general tendency in applied logic, Aristotle's ...
s in a discriminating way. Alternatively, paraconsistent logic is the subfield of
logic
Logic is the study of correct reasoning. It includes both formal and informal logic. Formal logic is the science of deductively valid inferences or of logical truths. It is a formal science investigating how conclusions follow from premises ...
that is concerned with studying and developing "inconsistency-tolerant" systems of logic which reject the
principle of explosion
In classical logic, intuitionistic logic and similar logical systems, the principle of explosion (, 'from falsehood, anything ollows; or ), or the principle of Pseudo-Scotus, is the law according to which any statement can be proven from a co ...
.
Inconsistency-tolerant logics have been discussed since at least 1910 (and arguably much earlier, for example in the writings of
Aristotle
Aristotle (; grc-gre, Ἀριστοτέλης ''Aristotélēs'', ; 384–322 BC) was a Greek philosopher and polymath during the Classical period in Ancient Greece. Taught by Plato, he was the founder of the Peripatetic school of phil ...
); however, the term ''paraconsistent'' ("beside the consistent") was first coined in 1976, by the
Peru
, image_flag = Flag of Peru.svg
, image_coat = Escudo nacional del Perú.svg
, other_symbol = Great Seal of the State
, other_symbol_type = Seal (emblem), National seal
, national_motto = "Fi ...
vian
philosopher
A philosopher is a person who practices or investigates philosophy. The term ''philosopher'' comes from the grc, φιλόσοφος, , translit=philosophos, meaning 'lover of wisdom'. The coining of the term has been attributed to the Greek th ...
Francisco Miró Quesada Cantuarias
Francisco Miró Quesada Cantuarias (21 December 1918 – 11 June 2019) was a Peruvian philosopher, journalist and politician.
In his works he discusses the belief in "human nature" on the basis that any collective assumption about such a natu ...
. The study of paraconsistent logic has been dubbed paraconsistency, which encompasses the school of
dialetheism
Dialetheism (from Greek 'twice' and 'truth') is the view that there are statements that are both true and false. More precisely, it is the belief that there can be a true statement whose negation is also true. Such statements are called "true ...
.
Definition
In
classical logic
Classical logic (or standard logic or Frege-Russell logic) is the intensively studied and most widely used class of deductive logic. Classical logic has had much influence on analytic philosophy.
Characteristics
Each logical system in this class ...
(as well as
intuitionistic logic
Intuitionistic logic, sometimes more generally called constructive logic, refers to systems of symbolic logic that differ from the systems used for classical logic by more closely mirroring the notion of constructive proof. In particular, systems ...
and most other logics), contradictions
entail
In English common law, fee tail or entail is a form of trust established by deed or settlement which restricts the sale or inheritance of an estate in real property and prevents the property from being sold, devised by will, or otherwise alien ...
everything. This feature, known as the
principle of explosion
In classical logic, intuitionistic logic and similar logical systems, the principle of explosion (, 'from falsehood, anything ollows; or ), or the principle of Pseudo-Scotus, is the law according to which any statement can be proven from a co ...
or ''ex contradictione sequitur quodlibet'' (
Latin
Latin (, or , ) is a classical language belonging to the Italic branch of the Indo-European languages. Latin was originally a dialect spoken in the lower Tiber area (then known as Latium) around present-day Rome, but through the power of the ...
, "from a contradiction, anything follows") can be expressed formally as
Which means: if ''P'' and its negation ¬''P'' are both assumed to be true, then of the two claims ''P'' and (some arbitrary) ''A'', at least one is true. Therefore, ''P'' or ''A'' is true. However, if we know that either ''P'' or ''A'' is true, and also that ''P'' is false (that ¬''P'' is true) we can conclude that ''A'', which could be anything, is true. Thus if a
theory
A theory is a rational type of abstract thinking about a phenomenon, or the results of such thinking. The process of contemplative and rational thinking is often associated with such processes as observational study or research. Theories may be s ...
contains a single inconsistency, it is
trivial
Trivia is information and data that are considered to be of little value. It can be contrasted with general knowledge and common sense.
Latin Etymology
The ancient Romans used the word ''triviae'' to describe where one road split or forked ...
– that is, it has every sentence as a theorem.
The characteristic or defining feature of a paraconsistent logic is that it rejects the principle of explosion. As a result, paraconsistent logics, unlike classical and other logics, can be used to formalize inconsistent but non-trivial theories.
Comparison with classical logic
Paraconsistent logics are
propositionally ''weaker'' than
classical logic
Classical logic (or standard logic or Frege-Russell logic) is the intensively studied and most widely used class of deductive logic. Classical logic has had much influence on analytic philosophy.
Characteristics
Each logical system in this class ...
; that is, they deem ''fewer'' propositional inferences valid. The point is that a paraconsistent logic can never be a propositional extension of classical logic, that is, propositionally validate everything that classical logic does. In some sense, then, paraconsistent logic is more conservative or cautious than classical logic. It is due to such conservativeness that paraconsistent languages can be more ''expressive'' than their classical counterparts including the hierarchy of
metalanguage
In logic and linguistics, a metalanguage is a language used to describe another language, often called the ''object language''. Expressions in a metalanguage are often distinguished from those in the object language by the use of italics, quot ...
s due to
Alfred Tarski
Alfred Tarski (, born Alfred Teitelbaum;School of Mathematics and Statistics, University of St Andrews ''School of Mathematics and Statistics, University of St Andrews''. January 14, 1901 – October 26, 1983) was a Polish-American logician a ...
et al. According to
Solomon Feferman
Solomon Feferman (December 13, 1928 – July 26, 2016) was an American philosopher and mathematician who worked in mathematical logic.
Life
Solomon Feferman was born in The Bronx in New York City to working-class parents who had immigrated to th ...
984
Year 984 ( CMLXXXIV) was a leap year starting on Tuesday (link will display the full calendar) of the Julian calendar.
Events
By place
Europe
* Spring – German boy-king Otto III (4-years old) is seized by the deposed Henry II ...
"natural language abounds with directly or indirectly self-referential yet apparently harmless expressions—all of which are excluded from the Tarskian framework." This expressive limitation can be overcome in paraconsistent logic.
Motivation
A primary motivation for paraconsistent logic is the conviction that it ought to be possible to reason with inconsistent
information
Information is an abstract concept that refers to that which has the power to inform. At the most fundamental level information pertains to the interpretation of that which may be sensed. Any natural process that is not completely random ...
in a controlled and discriminating way. The principle of explosion precludes this, and so must be abandoned. In non-paraconsistent logics, there is only one inconsistent theory: the trivial theory that has every sentence as a theorem. Paraconsistent logic makes it possible to distinguish between inconsistent theories and to reason with them.
Research into paraconsistent logic has also led to the establishment of the philosophical school of
dialetheism
Dialetheism (from Greek 'twice' and 'truth') is the view that there are statements that are both true and false. More precisely, it is the belief that there can be a true statement whose negation is also true. Such statements are called "true ...
(most notably advocated by
Graham Priest
Graham Priest (born 1948) is Distinguished Professor of Philosophy at the CUNY Graduate Center, as well as a regular visitor at the University of Melbourne, where he was Boyce Gibson Professor of Philosophy and also at the University of St Andr ...
), which asserts that true contradictions exist in reality, for example groups of people holding opposing views on various moral issues.
Being a dialetheist rationally commits one to some form of paraconsistent logic, on pain of otherwise embracing
trivialism
Trivialism is the logical theory that all statements (also known as propositions) are true and that all contradictions of the form "p and not p" (e.g. the ball is red and not red) are true. In accordance with this, a trivialist is a person who b ...
, i.e. accepting that all contradictions (and equivalently all statements) are true.
However, the study of paraconsistent logics does not necessarily entail a dialetheist viewpoint. For example, one need not commit to either the existence of true theories or true contradictions, but would rather prefer a weaker standard like
empirical adequacy, as proposed by
Bas van Fraassen
Bastiaan Cornelis van Fraassen (; born 1941) is a Dutch-American philosopher noted for his contributions to philosophy of science, epistemology and formal logic. He is a Distinguished Professor of Philosophy at San Francisco State University and ...
.
Philosophy
In classical logic Aristotle's three laws, namely, the excluded middle (''p'' or ¬''p''), non-contradiction ¬ (''p'' ∧ ¬''p'') and identity (''p'' iff ''p''), are regarded as the same, due to the inter-definition of the connectives. Moreover, traditionally contradictoriness (the presence of contradictions in a theory or in a body of knowledge) and triviality (the fact that such a theory entails all possible consequences) are assumed inseparable, granted that negation is available. These views may be philosophically challenged, precisely on the grounds that they fail to distinguish between contradictoriness and other forms of inconsistency.
On the other hand, it is possible to derive triviality from the 'conflict' between consistency and contradictions, once these notions have been properly distinguished. The very notions of consistency and inconsistency may be furthermore internalized at the object language level.
Tradeoffs
Paraconsistency involves tradeoffs. In particular, abandoning the principle of explosion requires to abandon at least one of the following two principles:
Both of these principles have been challenged.
One approach is to reject disjunction introduction but keep disjunctive syllogism and transitivity. In this approach, rules of
natural deduction In logic and proof theory, natural deduction is a kind of proof calculus in which logical reasoning is expressed by inference rules closely related to the "natural" way of reasoning. This contrasts with Hilbert-style systems, which instead use axiom ...
hold, except for
disjunction introduction
Disjunction introduction or addition (also called or introduction) is a rule of inference of propositional logic and almost every other deduction system. The rule makes it possible to introduce disjunctions to logical proofs. It is the inferen ...
and
excluded middle
In logic, the law of excluded middle (or the principle of excluded middle) states that for every proposition, either this proposition or its negation is true. It is one of the so-called three laws of thought, along with the law of noncontradi ...
; moreover, inference A⊢B does not necessarily mean entailment A⇒B. Also, the following usual Boolean properties hold:
double negation
In propositional logic, double negation is the theorem that states that "If a statement is true, then it is not the case that the statement is not true." This is expressed by saying that a proposition ''A'' is logically equivalent to ''not (not ...
as well as
associativity
In mathematics, the associative property is a property of some binary operations, which means that rearranging the parentheses in an expression will not change the result. In propositional logic, associativity is a valid rule of replacement f ...
,
commutativity
In mathematics, a binary operation is commutative if changing the order of the operands does not change the result. It is a fundamental property of many binary operations, and many mathematical proofs depend on it. Most familiar as the name of ...
,
distributivity
In mathematics, the distributive property of binary operations generalizes the distributive law, which asserts that the equality
x \cdot (y + z) = x \cdot y + x \cdot z
is always true in elementary algebra.
For example, in elementary arithmetic, ...
,
De Morgan De Morgan or de Morgan is a surname, and may refer to:
* Augustus De Morgan (1806–1871), British mathematician and logician.
** De Morgan's laws (or De Morgan's theorem), a set of rules from propositional logic.
** The De Morgan Medal, a trien ...
, and
idempotence
Idempotence (, ) is the property of certain operations in mathematics and computer science whereby they can be applied multiple times without changing the result beyond the initial application. The concept of idempotence arises in a number of pl ...
inferences (for conjunction and disjunction). Furthermore, inconsistency-robust proof of negation holds for entailment: (A⇒(B∧¬B))⊢¬A.
Another approach is to reject disjunctive syllogism. From the perspective of
dialetheism
Dialetheism (from Greek 'twice' and 'truth') is the view that there are statements that are both true and false. More precisely, it is the belief that there can be a true statement whose negation is also true. Such statements are called "true ...
, it makes perfect sense that disjunctive syllogism should fail. The idea behind this syllogism is that, if ''¬ A'', then ''A'' is excluded and ''B'' can be inferred from ''A ∨ B''. However, if ''A'' may hold as well as ''¬A'', then the argument for the inference is weakened.
Yet another approach is to do both simultaneously. In many systems of
relevant logic Relevance logic, also called relevant logic, is a kind of non-classical logic requiring the antecedent and consequent of implications to be relevantly related. They may be viewed as a family of substructural or modal logics. It is generally, but ...
, as well as
linear logic
Linear logic is a substructural logic proposed by Jean-Yves Girard as a refinement of classical and intuitionistic logic, joining the dualities of the former with many of the constructive properties of the latter. Although the logic has also be ...
, there are two separate disjunctive connectives. One allows disjunction introduction, and one allows disjunctive syllogism. Of course, this has the disadvantages entailed by separate disjunctive connectives including confusion between them and complexity in relating them.
Furthermore, the rule of proof by contradiction (below) just by itself is inconsistency non-robust in the sense that the negation of every proposition can be proved from a contradiction.
Strictly speaking, having just the rule above is paraconsistent because it is not the case that ''every'' proposition can be proved from a contradiction. However, if the rule
double negation elimination
In propositional logic, double negation is the theorem that states that "If a statement is true, then it is not the case that the statement is not true." This is expressed by saying that a proposition ''A'' is logically equivalent to ''not (not ...
(
) is added as well, then every proposition can be proved from a contradiction. Double negation elimination does not hold for
intuitionistic logic
Intuitionistic logic, sometimes more generally called constructive logic, refers to systems of symbolic logic that differ from the systems used for classical logic by more closely mirroring the notion of constructive proof. In particular, systems ...
.
Example
One well-known system of paraconsistent logic is the system known as LP ("Logic of Paradox"), first proposed by the
Argentinian
Argentines (mistakenly translated Argentineans in the past; in Spanish (masculine) or ( feminine)) are people identified with the country of Argentina. This connection may be residential, legal, historical or cultural. For most Argentines, ...
logician
Florencio González Asenjo in 1966 and later popularized by
Priest
A priest is a religious leader authorized to perform the sacred rituals of a religion, especially as a mediatory agent between humans and one or more deities. They also have the authority or power to administer religious rites; in particu ...
and others.
One way of presenting the semantics for LP is to replace the usual
functional
Functional may refer to:
* Movements in architecture:
** Functionalism (architecture)
** Form follows function
* Functional group, combination of atoms within molecules
* Medical conditions without currently visible organic basis:
** Functional sy ...
valuation with a
relational one. The binary relation
relates a
formula
In science, a formula is a concise way of expressing information symbolically, as in a mathematical formula or a ''chemical formula''. The informal use of the term ''formula'' in science refers to the general construct of a relationship betwee ...
to a
truth value
In logic and mathematics, a truth value, sometimes called a logical value, is a value indicating the relation of a proposition to truth, which in classical logic has only two possible values (''true'' or '' false'').
Computing
In some progr ...
:
means that
is true, and
means that
is false. A formula must be assigned ''at least'' one truth value, but there is no requirement that it be assigned ''at most'' one truth value. The semantic clauses for
negation
In logic, negation, also called the logical complement, is an operation that takes a proposition P to another proposition "not P", written \neg P, \mathord P or \overline. It is interpreted intuitively as being true when P is false, and false ...
and
disjunction
In logic, disjunction is a logical connective typically notated as \lor and read aloud as "or". For instance, the English language sentence "it is raining or it is snowing" can be represented in logic using the disjunctive formula R \lor S ...
are given as follows:
*
*
*
*
(The other
logical connective
In logic, a logical connective (also called a logical operator, sentential connective, or sentential operator) is a logical constant. They can be used to connect logical formulas. For instance in the syntax of propositional logic, the binary co ...
s are defined in terms of negation and disjunction as usual.)
Or to put the same point less symbolically:
* ''not A'' is true
if and only if
In logic and related fields such as mathematics and philosophy, "if and only if" (shortened as "iff") is a biconditional logical connective between statements, where either both statements are true or both are false.
The connective is bicondi ...
''A'' is false
* ''not A'' is false if and only if ''A'' is true
* ''A or B'' is true if and only if ''A'' is true or ''B'' is true
* ''A or B'' is false if and only if ''A'' is false and ''B'' is false
(Semantic)
logical consequence
Logical consequence (also entailment) is a fundamental concept in logic, which describes the relationship between statements that hold true when one statement logically ''follows from'' one or more statements. A valid logical argument is on ...
is then defined as truth-preservation:
:
if and only if
is true whenever every element of
is true.
Now consider a valuation
such that
and
but it is not the case that
. It is easy to check that this valuation constitutes a
counterexample
A counterexample is any exception to a generalization. In logic a counterexample disproves the generalization, and does so rigorously in the fields of mathematics and philosophy. For example, the fact that "John Smith is not a lazy student" is a ...
to both explosion and disjunctive syllogism. However, it is also a counterexample to
modus ponens
In propositional logic, ''modus ponens'' (; MP), also known as ''modus ponendo ponens'' (Latin for "method of putting by placing") or implication elimination or affirming the antecedent, is a deductive argument form and rule of inference. ...
for the
material conditional
The material conditional (also known as material implication) is an operation commonly used in logic. When the conditional symbol \rightarrow is interpreted as material implication, a formula P \rightarrow Q is true unless P is true and Q is ...
of LP. For this reason, proponents of LP usually advocate expanding the system to include a stronger conditional connective that is not definable in terms of negation and disjunction.
As one can verify, LP preserves most other inference patterns that one would expect to be valid, such as
De Morgan's laws
In propositional logic and Boolean algebra, De Morgan's laws, also known as De Morgan's theorem, are a pair of transformation rules that are both valid rules of inference. They are named after Augustus De Morgan, a 19th-century British mathem ...
and the usual
introduction and elimination rules for negation,
conjunction
Conjunction may refer to:
* Conjunction (grammar), a part of speech
* Logical conjunction, a mathematical operator
** Conjunction introduction, a rule of inference of propositional logic
* Conjunction (astronomy), in which two astronomical bodies ...
, and disjunction. Surprisingly, the
logical truth
Logical truth is one of the most fundamental concepts in logic. Broadly speaking, a logical truth is a statement which is true regardless of the truth or falsity of its constituent propositions. In other words, a logical truth is a statement whic ...
s (or
tautologies) of LP are precisely those of classical propositional logic. (LP and classical logic differ only in the ''
inference
Inferences are steps in reasoning, moving from premises to logical consequences; etymologically, the word '' infer'' means to "carry forward". Inference is theoretically traditionally divided into deduction and induction, a distinction that in ...
s'' they deem valid.) Relaxing the requirement that every formula be either true or false yields the weaker paraconsistent logic commonly known as
first-degree entailment (FDE). Unlike LP, FDE contains no logical truths.
LP is only one of ''many'' paraconsistent logics that have been proposed. It is presented here merely as an illustration of how a paraconsistent logic can work.
Relation to other logics
One important type of paraconsistent logic is
relevance logic Relevance logic, also called relevant logic, is a kind of non-classical logic requiring the antecedent and consequent of implications to be relevantly related. They may be viewed as a family of substructural or modal logics. It is generally, but ...
. A logic is ''relevant'' if it satisfies the following condition:
: if ''A'' → ''B'' is a theorem, then ''A'' and ''B'' share a
non-logical constant
In logic, the formal languages used to create expressions consist of symbols, which can be broadly divided into constants and variables. The constants of a language can further be divided into logical symbols and non-logical symbols (sometimes ...
.
It follows that a
relevance logic Relevance logic, also called relevant logic, is a kind of non-classical logic requiring the antecedent and consequent of implications to be relevantly related. They may be viewed as a family of substructural or modal logics. It is generally, but ...
cannot have (''p'' ∧ ¬''p'') → ''q'' as a theorem, and thus (on reasonable assumptions) cannot validate the inference from to ''q''.
Paraconsistent logic has significant overlap with
many-valued logic
Many-valued logic (also multi- or multiple-valued logic) refers to a propositional calculus in which there are more than two truth values. Traditionally, in Aristotle's logical calculus, there were only two possible values (i.e., "true" and "false" ...
; however, not all paraconsistent logics are many-valued (and, of course, not all many-valued logics are paraconsistent).
Dialetheic logics, which are also many-valued, are paraconsistent, but the converse does not hold.
Intuitionistic logic
Intuitionistic logic, sometimes more generally called constructive logic, refers to systems of symbolic logic that differ from the systems used for classical logic by more closely mirroring the notion of constructive proof. In particular, systems ...
allows ''A'' ∨ ¬''A'' not to be equivalent to true, while paraconsistent logic allows ''A'' ∧ ¬''A'' not to be equivalent to false. Thus it seems natural to regard paraconsistent logic as the "
dual" of intuitionistic logic. However, intuitionistic logic is a specific logical system whereas paraconsistent logic encompasses a large class of systems. Accordingly, the dual notion to paraconsistency is called ''paracompleteness'', and the "dual" of intuitionistic logic (a specific paracomplete logic) is a specific paraconsistent system called ''anti-intuitionistic'' or ''dual-intuitionistic logic'' (sometimes referred to as ''Brazilian logic'', for historical reasons). The duality between the two systems is best seen within a
sequent calculus
In mathematical logic, sequent calculus is a style of formal logical argumentation in which every line of a proof is a conditional tautology (called a sequent by Gerhard Gentzen) instead of an unconditional tautology. Each conditional tautology i ...
framework. While in intuitionistic logic the sequent
:
is not derivable, in dual-intuitionistic logic
:
is not derivable. Similarly, in intuitionistic logic the sequent
:
is not derivable, while in dual-intuitionistic logic
:
is not derivable. Dual-intuitionistic logic contains a connective # known as ''pseudo-difference'' which is the dual of intuitionistic implication. Very loosely, can be read as "''A'' but not ''B''". However, # is not
truth-functional
In logic, a truth function is a function that accepts truth values as input and produces a unique truth value as output. In other words: The input and output of a truth function are all truth values; a truth function will always output exactly one ...
as one might expect a 'but not' operator to be; similarly, the intuitionistic implication operator cannot be treated like "". Dual-intuitionistic logic also features a basic connective ⊤ which is the dual of intuitionistic ⊥: negation may be defined as
A full account of the duality between paraconsistent and intuitionistic logic, including an explanation on why dual-intuitionistic and paraconsistent logics do not coincide, can be found in Brunner and Carnielli (2005).
These other logics avoid explosion:
implicational propositional calculus In mathematical logic, the implicational propositional calculus is a version of classical propositional calculus which uses only one connective, called implication or conditional. In formulas, this binary operation is indicated by "implies", "if ...
,
positive propositional calculus,
equivalential calculus and
minimal logic
Minimal logic, or minimal calculus, is a symbolic logic system originally developed by Ingebrigt Johansson. It is an intuitionistic and paraconsistent logic, that rejects both the law of the excluded middle as well as the principle of explosion ...
. The latter, minimal logic, is both paraconsistent and paracomplete (a subsystem of intuitionistic logic). The other three simply do not allow one to express a contradiction to begin with since they lack the ability to form negations.
An ideal three-valued paraconsistent logic
Here is an example of a
three-valued logic
In logic, a three-valued logic (also trinary logic, trivalent, ternary, or trilean, sometimes abbreviated 3VL) is any of several many-valued logic systems in which there are three truth values indicating ''true'', ''false'' and some indeterminate ...
which is paraconsistent and ''ideal'' as defined in "Ideal Paraconsistent Logics" by O. Arieli, A. Avron, and A. Zamansky, especially pages 22–23. The three truth-values are: ''t'' (true only), ''b'' (both true and false), and ''f'' (false only).
A formula is true if its truth-value is either ''t'' or ''b'' for the valuation being used. A formula is a tautology of paraconsistent logic if it is true in every valuation which maps atomic propositions to . Every tautology of paraconsistent logic is also a tautology of classical logic. For a valuation, the set of true formulas is closed under
modus ponens
In propositional logic, ''modus ponens'' (; MP), also known as ''modus ponendo ponens'' (Latin for "method of putting by placing") or implication elimination or affirming the antecedent, is a deductive argument form and rule of inference. ...
and the
deduction theorem In mathematical logic, a deduction theorem is a metatheorem that justifies doing conditional proofs—to prove an implication ''A'' → ''B'', assume ''A'' as an hypothesis and then proceed to derive ''B''—in systems that do not have an ...
. Any tautology of classical logic which contains no negations is also a tautology of paraconsistent logic (by merging ''b'' into ''t''). This logic is sometimes referred to as "Pac" or "LFI1".
Included
Some tautologies of paraconsistent logic are:
* All axiom schemas for paraconsistent logic:
:
** for deduction theorem and ?→ =
:
** for deduction theorem (note: → = follows from the deduction theorem)
:
** →? =
:
** ?→ =
:
** → =
:
** ~ =
:
** ~ = (note: ~ = and ~ = follow from the way the truth-values are encoded)
:
** v? =
:
** ?v =
:
** v? =
:
** ?v =
:
** v =
:
** v =
:
** &? =
:
** ?& =
:
** &? =
:
** ?& =
:
** & =
:
** & =
:
** ? is the union of with
* Some other theorem schemas:
:
:
:
:
:
:
:
** every truth-value is either ''t'', ''b'', or ''f''.
:
Excluded
Some tautologies of classical logic which are ''not'' tautologies of paraconsistent logic are:
:
** no explosion in paraconsistent logic
:
:
:
** disjunctive syllogism fails in paraconsistent logic
:
** contrapositive fails in paraconsistent logic
:
:
:
** not all contradictions are equivalent in paraconsistent logic
:
:
:
** counter-factual for →? = (inconsistent with ''b''→''f'' = ''f'')
Strategy
Suppose we are faced with a contradictory set of premises Γ and wish to avoid being reduced to triviality. In classical logic, the only method one can use is to reject one or more of the premises in Γ. In paraconsistent logic, we may try to compartmentalize the contradiction. That is, weaken the logic so that Γ→''X'' is no longer a tautology provided the propositional variable ''X'' does not appear in Γ. However, we do not want to weaken the logic any more than is necessary for that purpose. So we wish to retain modus ponens and the deduction theorem as well as the axioms which are the introduction and elimination rules for the logical connectives (where possible).
To this end, we add a third truth-value ''b'' which will be employed within the compartment containing the contradiction. We make ''b'' a fixed point of all the logical connectives.
:
We must make ''b'' a kind of truth (in addition to ''t'') because otherwise there would be no tautologies at all.
To ensure that modus ponens works, we must have
:
that is, to ensure that a true hypothesis and a true implication lead to a true conclusion, we must have that a not-true (''f'') conclusion and a true (''t'' or ''b'') hypothesis yield a not-true implication.
If all the propositional variables in Γ are assigned the value ''b'', then Γ itself will have the value ''b''. If we give ''X'' the value ''f'', then
:
.
So Γ→''X'' will not be a tautology.
Limitations:
(1) There must not be constants for the truth values because that would defeat the purpose of paraconsistent logic. Having ''b'' would change the language from that of classical logic. Having ''t'' or ''f'' would allow the explosion again because
:
or
would be tautologies. Note that ''b'' is not a fixed point of those constants since ''b'' ≠ ''t'' and ''b'' ≠ ''f''.
(2) This logic's ability to contain contradictions applies only to contradictions among particularized premises, not to contradictions among axiom schemas.
(3) The loss of disjunctive syllogism may result in insufficient commitment to developing the 'correct' alternative, possibly crippling mathematics.
(4) To establish that a formula Γ is equivalent to Δ in the sense that either can be substituted for the other wherever they appear as a subformula, one must show
:
.
This is more difficult than in classical logic because the contrapositives do not necessarily follow.
Applications
Paraconsistent logic has been applied as a means of managing inconsistency in numerous domains, including:
[Most of these are discussed in Bremer (2005) and Priest (2002).]
*
Semantics
Semantics (from grc, σημαντικός ''sēmantikós'', "significant") is the study of reference, meaning, or truth. The term can be used to refer to subfields of several distinct disciplines, including philosophy
Philosophy (f ...
: Paraconsistent logic has been proposed as means of providing a simple and intuitive formal account of
truth
Truth is the property of being in accord with fact or reality.Merriam-Webster's Online Dictionarytruth 2005 In everyday language, truth is typically ascribed to things that aim to represent reality or otherwise correspond to it, such as beliefs ...
that does not fall prey to paradoxes such as
the Liar. However, such systems must also avoid
Curry's paradox
Curry's paradox is a paradox in which an arbitrary claim ''F'' is proved from the mere existence of a sentence ''C'' that says of itself "If ''C'', then ''F''", requiring only a few apparently innocuous logical deduction rules. Since ''F'' is arbi ...
, which is much more difficult as it does not essentially involve negation.
*
Set theory
Set theory is the branch of mathematical logic that studies sets, which can be informally described as collections of objects. Although objects of any kind can be collected into a set, set theory, as a branch of mathematics, is mostly conce ...
and the
foundations of mathematics
Foundations of mathematics is the study of the philosophy, philosophical and logical and/or algorithmic basis of mathematics, or, in a broader sense, the mathematical investigation of what underlies the philosophical theories concerning the natu ...
*
Epistemology
Epistemology (; ), or the theory of knowledge, is the branch of philosophy concerned with knowledge. Epistemology is considered a major subfield of philosophy, along with other major subfields such as ethics, logic, and metaphysics.
Episte ...
and
belief revision Belief revision is the process of changing beliefs to take into account a new piece of information. The logical formalization of belief revision is researched in philosophy, in databases, and in artificial intelligence for the design of rational age ...
: Paraconsistent logic has been proposed as a means of reasoning with and revising inconsistent theories and belief systems.
*
Knowledge management
Knowledge management (KM) is the collection of methods relating to creating, sharing, using and managing the knowledge and information of an organization. It refers to a multidisciplinary approach to achieve organisational objectives by making ...
and
artificial intelligence
Artificial intelligence (AI) is intelligence—perceiving, synthesizing, and inferring information—demonstrated by machines, as opposed to intelligence displayed by animals and humans. Example tasks in which this is done include speech re ...
: Some
computer scientist
A computer scientist is a person who is trained in the academic study of computer science.
Computer scientists typically work on the theoretical side of computation, as opposed to the hardware side on which computer engineers mainly focus (al ...
s have utilized paraconsistent logic as a means of coping gracefully with inconsistent or contradictory information. Mathematical framework and rules of paraconsistent logic have been proposed as the
activation function
In artificial neural networks, the activation function of a node defines the output of that node given an input or set of inputs.
A standard integrated circuit can be seen as a digital network of activation functions that can be "ON" (1) or " ...
of an
artificial neuron
An artificial neuron is a mathematical function conceived as a model of biological neurons, a neural network. Artificial neurons are elementary units in an artificial neural network. The artificial neuron receives one or more inputs (representing e ...
in order to build a
neural network
A neural network is a network or circuit of biological neurons, or, in a modern sense, an artificial neural network, composed of artificial neurons or nodes. Thus, a neural network is either a biological neural network, made up of biological ...
for
function approximation
In general, a function approximation problem asks us to select a function among a that closely matches ("approximates") a in a task-specific way. The need for function approximations arises in many branches of applied mathematics, and compute ...
,
model identification
In statistics, identifiability is a property which a model must satisfy for precise inference to be possible. A model is identifiable if it is theoretically possible to learn the true values of this model's underlying parameters after obtaining ...
, and
control
Control may refer to:
Basic meanings Economics and business
* Control (management), an element of management
* Control, an element of management accounting
* Comptroller (or controller), a senior financial officer in an organization
* Controllin ...
with success.
*
Deontic logic
Deontic logic is the field of philosophical logic that is concerned with obligation, permission, and related concepts. Alternatively, a deontic logic is a formal system that attempts to capture the essential logical features of these concepts. I ...
and
metaethics
In metaphilosophy and ethics, meta-ethics is the study of the nature, scope, and meaning of moral judgment. It is one of the three branches of ethics generally studied by philosophers, the others being normative ethics (questions of how one ought ...
: Paraconsistent logic has been proposed as a means of dealing with ethical and other normative conflicts.
*
Software engineering
Software engineering is a systematic engineering approach to software development.
A software engineer is a person who applies the principles of software engineering to design, develop, maintain, test, and evaluate computer software. The term '' ...
: Paraconsistent logic has been proposed as a means for dealing with the pervasive inconsistencies among the
documentation
Documentation is any communicable material that is used to describe, explain or instruct regarding some attributes of an object, system or procedure, such as its parts, assembly, installation, maintenance and use. As a form of knowledge manageme ...
,
use cases
In software and systems engineering, the phrase use case is a polyseme with two senses:
# A usage scenario for a piece of software; often used in the plural to suggest situations where a piece of software may be useful.
# A potential scenario ...
, and
code
In communications and information processing, code is a system of rules to convert information—such as a letter, word, sound, image, or gesture—into another form, sometimes shortened or secret, for communication through a communication ...
of large
software systems
A software system is a system of intercommunicating components based on software forming part of a computer system (a combination of hardware and software). It "consists of a number of separate programs, configuration files, which are used to ...
.
[Hewitt (2008b)][Hewitt (2008a)]
*
Electronics
The field of electronics is a branch of physics and electrical engineering that deals with the emission, behaviour and effects of electrons using electronic devices. Electronics uses active devices to control electron flow by amplification ...
design routinely uses a
four-valued logic
In logic, a four-valued logic is any logic with four truth values. Several types of four-valued logic have been advanced.
Belnap
Nuel Belnap considered the challenge of question answering by computer in 1975. Noting human fallibility, he was con ...
, with "hi-impedance (z)" and "don't care (x)" playing similar roles to "don't know" and "both true and false" respectively, in addition to true and false. This logic was developed independently of philosophical logics.
*
Quantum physics
Quantum mechanics is a fundamental theory in physics that provides a description of the physical properties of nature at the scale of atoms and subatomic particles. It is the foundation of all quantum physics including quantum chemistry, qua ...
*
Black hole
A black hole is a region of spacetime where gravitation, gravity is so strong that nothing, including light or other Electromagnetic radiation, electromagnetic waves, has enough energy to escape it. The theory of general relativity predicts t ...
physics
*
Hawking radiation
Hawking radiation is theoretical black body radiation that is theorized to be released outside a black hole's event horizon because of relativistic quantum effects. It is named after the physicist Stephen Hawking, who developed a theoretical arg ...
*
Quantum computing
Quantum computing is a type of computation whose operations can harness the phenomena of quantum mechanics, such as superposition, interference, and entanglement. Devices that perform quantum computations are known as quantum computers. Though ...
*
Spintronics
Spintronics (a portmanteau meaning spin transport electronics), also known as spin electronics, is the study of the intrinsic spin of the electron and its associated magnetic moment, in addition to its fundamental electronic charge, in solid-sta ...
*
Quantum entanglement
Quantum entanglement is the phenomenon that occurs when a group of particles are generated, interact, or share spatial proximity in a way such that the quantum state of each particle of the group cannot be described independently of the state of ...
*
Quantum coupling
Quantum coupling is an effect in quantum mechanics in which two or more quantum systems are bound such that a change in one of the quantum states in one of the systems will cause an instantaneous change in all of the bound systems. It is a state s ...
*
Uncertainty principle
In quantum mechanics, the uncertainty principle (also known as Heisenberg's uncertainty principle) is any of a variety of mathematical inequalities asserting a fundamental limit to the accuracy with which the values for certain pairs of physic ...
Criticism
Some philosophers have argued against dialetheism on the grounds that the counterintuitiveness of giving up any of the three principles above outweighs any counterintuitiveness that the principle of explosion might have.
Others, such as
David Lewis, have objected to paraconsistent logic on the ground that it is simply impossible for a statement and its negation to be jointly true. A related objection is that "negation" in paraconsistent logic is not really ''
negation
In logic, negation, also called the logical complement, is an operation that takes a proposition P to another proposition "not P", written \neg P, \mathord P or \overline. It is interpreted intuitively as being true when P is false, and false ...
''; it is merely a
subcontrary An immediate inference is an inference which can be made from only one statement or proposition. For instance, from the statement "All toads are green", the immediate inference can be made that "no toads are not green" or "no toads are non-green" ( ...
-forming operator.
[See Slater (1995), Béziau (2000).]
Alternatives
Approaches exist that allow for resolution of inconsistent beliefs without violating any of the intuitive logical principles. Most such systems use
multi-valued logic
Many-valued logic (also multi- or multiple-valued logic) refers to a propositional calculus in which there are more than two truth values. Traditionally, in Aristotle's logical calculus, there were only two possible values (i.e., "true" and "false ...
with
Bayesian inference
Bayesian inference is a method of statistical inference in which Bayes' theorem is used to update the probability for a hypothesis as more evidence or information becomes available. Bayesian inference is an important technique in statistics, a ...
and the
Dempster-Shafer theory, allowing that no non-tautological belief is completely (100%) irrefutable because it must be based upon incomplete, abstracted, interpreted, likely unconfirmed, potentially uninformed, and possibly incorrect knowledge (of course, this very assumption, if non-tautological, entails its own refutability, if by "refutable" we mean "not completely
00%irrefutable"). These systems effectively give up several logical principles in practice without rejecting them in theory.
Notable figures
Notable figures in the history and/or modern development of paraconsistent logic include:
*
Alan Ross Anderson
Alan Ross Anderson (1925–1973) was an American logician and professor of philosophy at Yale University and the University of Pittsburgh.
A frequent collaborator with Nuel Belnap, Anderson was instrumental in the development of relevance lo ...
(United States, 1925–1973). One of the founders of
relevance logic Relevance logic, also called relevant logic, is a kind of non-classical logic requiring the antecedent and consequent of implications to be relevantly related. They may be viewed as a family of substructural or modal logics. It is generally, but ...
, a kind of paraconsistent logic.
*
Florencio González Asenjo (
Argentina
Argentina (), officially the Argentine Republic ( es, link=no, República Argentina), is a country in the southern half of South America. Argentina covers an area of , making it the second-largest country in South America after Brazil, th ...
, 1927-2013)
*
Diderik Batens
Diderik Batens (born 15 November 1944), is a Belgian logician and epistemologist at the University of Ghent, known chiefly for his work on adaptive and paraconsistent logics. His epistemological views may be broadly characterized as fallibilist
...
(Belgium)
*
Nuel Belnap
Nuel Dinsmore Belnap Jr. (; born 1930) is an American logician and philosopher who has made contributions to the philosophy of logic, temporal logic, and structural proof theory. He taught at the University of Pittsburgh from 1963 until his ret ...
(United States, b. 1930) developed logical connectives of a
four-valued logic
In logic, a four-valued logic is any logic with four truth values. Several types of four-valued logic have been advanced.
Belnap
Nuel Belnap considered the challenge of question answering by computer in 1975. Noting human fallibility, he was con ...
.
*
Jean-Yves Béziau
Jean-Yves Béziau (; born January 15, 1965, in Orléans, France) is a professor and researcher of the Brazilian Research Council (CNPq) at the University of Brazil in Rio de Janeiro.
Career
Béziau works in the field of logic—in particular, ...
(France/Switzerland, b. 1965). Has written extensively on the general structural features and philosophical foundations of paraconsistent logics.
*
Ross Brady Ross or ROSS may refer to:
People
* Clan Ross, a Highland Scottish clan
* Ross (name), including a list of people with the surname or given name Ross, as well as the meaning
* Earl of Ross, a peerage of Scotland
Places
* RoSS, the Republic of Sout ...
(Australia)
*
Bryson Brown
Bryson may refer to:
People and fictional characters
* Bryson (surname)
* Bryson (given name)
Places Canada
* Bryson, Quebec, a village and municipality
* Bryson, a hydroelectric station in Quebec
United States
* Bryson, Missouri, an unincor ...
(Canada)
*
Walter Carnielli
Walter Alexandre Carnielli (born 11 January 1952 in Campinas, Brazil) is a Brazilian mathematician, logician, and philosopher, full professor of Logic at thState University of Campinas (UNICAMP) With Bachelor and Ms.C. degrees in mathematics at th ...
(
Brazil
Brazil ( pt, Brasil; ), officially the Federative Republic of Brazil (Portuguese: ), is the largest country in both South America and Latin America. At and with over 217 million people, Brazil is the world's fifth-largest country by area ...
). The developer of the ''possible-translations semantics'', a new semantics which makes paraconsistent logics applicable and philosophically understood.
*
Newton da Costa
Newton Carneiro Affonso da Costa (born 16 September 1929 in Curitiba, Brazil) is a Brazilian mathematician, logician, and philosopher. He studied engineering and mathematics at the Federal University of Paraná in Curitiba and the title of his ...
(
Brazil
Brazil ( pt, Brasil; ), officially the Federative Republic of Brazil (Portuguese: ), is the largest country in both South America and Latin America. At and with over 217 million people, Brazil is the world's fifth-largest country by area ...
, b. 1929). One of the first to develop formal systems of paraconsistent logic.
*
Itala M. L. D'Ottaviano (
Brazil
Brazil ( pt, Brasil; ), officially the Federative Republic of Brazil (Portuguese: ), is the largest country in both South America and Latin America. At and with over 217 million people, Brazil is the world's fifth-largest country by area ...
)
*
J. Michael Dunn
J. Michael Dunn (June 19, 1941 – April 5, 2021) was Oscar Ewing Professor Emeritus of Philosophy, Professor Emeritus of Informatics and Computer Science, was twice chair of the Philosophy Department, was Executive Associate Dean of the College o ...
(United States). An important figure in relevance logic.
*
Carl Hewitt
Carl Eddie Hewitt () is an American computer scientist who designed the Planner programming language for automated planningCarl Hewitt''PLANNER: A Language for Proving Theorems in Robots''IJCAI. 1969. and the actor model of concurrent computing, ...
*
Stanisław Jaśkowski (
Poland
Poland, officially the Republic of Poland, is a country in Central Europe. It is divided into 16 administrative provinces called voivodeships, covering an area of . Poland has a population of over 38 million and is the fifth-most populous ...
). One of the first to develop formal systems of paraconsistent logic.
*
R. E. Jennings (Canada)
*
David Kellogg Lewis
David (; , "beloved one") (traditional spelling), , ''Dāwūd''; grc-koi, Δαυΐδ, Dauíd; la, Davidus, David; gez , ዳዊት, ''Dawit''; xcl, Դաւիթ, ''Dawitʿ''; cu, Давíдъ, ''Davidŭ''; possibly meaning "beloved one". w ...
(USA, 1941–2001). Articulate critic of paraconsistent logic.
*
Jan Łukasiewicz
Jan Łukasiewicz (; 21 December 1878 – 13 February 1956) was a Polish logician and philosopher who is best known for Polish notation and Łukasiewicz logic His work centred on philosophical logic, mathematical logic and history of logic. He ...
(
Poland
Poland, officially the Republic of Poland, is a country in Central Europe. It is divided into 16 administrative provinces called voivodeships, covering an area of . Poland has a population of over 38 million and is the fifth-most populous ...
, 1878–1956)
*
Robert K. Meyer
The name Robert is an ancient Germanic given name, from Proto-Germanic "fame" and "bright" (''Hrōþiberhtaz''). Compare Old Dutch ''Robrecht'' and Old High German ''Hrodebert'' (a compound of ''Hrōþ, Hruod'' ( non, Hróðr) "fame, glory ...
(United States/Australia)
*
Chris Mortensen
Chris Mortensen (born November 7, 1951) is an American journalist providing reports for ESPN's '' Sunday NFL Countdown'', ''Monday Night Countdown'', ''SportsCenter'', ESPN Radio, and ESPN.com.
Early life
Mortensen attended North Torrance Hi ...
(Australia). Has written extensively on
paraconsistent mathematics
Paraconsistent mathematics, sometimes called inconsistent mathematics, represents an attempt to develop the classical infrastructure of mathematics (e.g. analysis) based on a foundation of paraconsistent logic instead of classical logic
Classical ...
.
*
Lorenzo Peña
Lorenzo Peña (born August 29, 1944) is a Spanish philosopher, lawyer, logician and political thinker. His rationalism is a neo-Leibnizian approach both in metaphysics and law.
Life
Lorenzo Peña was born in Alicante, Spain, on August 29, 1 ...
(Spain, b. 1944). Has developed an original line of paraconsistent logic, gradualistic logic (also known as ''transitive logic'', TL), akin to
fuzzy logic
Fuzzy logic is a form of many-valued logic in which the truth value of variables may be any real number between 0 and 1. It is employed to handle the concept of partial truth, where the truth value may range between completely true and completely ...
.
*
Val Plumwood
Val Plumwood (11 August 1939 – 29 February 2008) was an Australian philosopher and ecofeminist known for her work on anthropocentrism. From the 1970s she played a central role in the development of radical ecosophy. Working mostly as an indepe ...
ormerly Routley(Australia, b. 1939). Frequent collaborator with Sylvan.
*
Graham Priest
Graham Priest (born 1948) is Distinguished Professor of Philosophy at the CUNY Graduate Center, as well as a regular visitor at the University of Melbourne, where he was Boyce Gibson Professor of Philosophy and also at the University of St Andr ...
(Australia). Perhaps the most prominent advocate of paraconsistent logic in the world today.
*
Francisco Miró Quesada (
Peru
, image_flag = Flag of Peru.svg
, image_coat = Escudo nacional del Perú.svg
, other_symbol = Great Seal of the State
, other_symbol_type = Seal (emblem), National seal
, national_motto = "Fi ...
). Coined the term ''paraconsistent logic''.
*
B. H. Slater (Australia). Another articulate critic of paraconsistent logic.
*
Richard Sylvan ormerly Routley(New Zealand/Australia, 1935–1996). Important figure in relevance logic and a frequent collaborator with Plumwood and Priest.
*
Nicolai A. Vasiliev Nicolai Alexandrovich Vasiliev (russian: Николай Александрович Васильев), also Vasil'ev, Vassilieff, Wassilieff (December 31, 1940), was a Russian logician, philosopher, psychologist, poet. He was a forerunner of Paracons ...
(Russia, 1880–1940). First to construct logic tolerant to contradiction (1910).
See also
*
Deviant logic Deviant logic is a type of logic incompatible with classical logic. Philosopher Susan Haack uses the term ''deviant logic'' to describe certain non-classical systems of logic. In these logics:
* the set of well-formed formulas generated equals t ...
*
Formal logic
Logic is the study of correct reasoning. It includes both formal and informal logic. Formal logic is the science of deductively valid inferences or of logical truths. It is a formal science investigating how conclusions follow from premises ...
*
Probability logic Probabilistic logic (also probability logic and probabilistic reasoning) involves the use of probability and logic to deal with uncertain situations. Probabilistic logic extends traditional logic truth tables with probabilistic expressions. A diffi ...
*
Intuitionistic logic
Intuitionistic logic, sometimes more generally called constructive logic, refers to systems of symbolic logic that differ from the systems used for classical logic by more closely mirroring the notion of constructive proof. In particular, systems ...
*
Table of logic symbols
In logic, a set of symbols is commonly used to express logical representation. The following table lists many common symbols, together with their name, how they should be read out loud, and the related field of mathematics. Additionally, the subs ...
Notes
Resources
*
*
*
*
*
*
*
*
*
*
*
*
*
*
* (First published Tue Sep 24, 1996; substantive revision Fri Mar 20, 2009)
*
*
External links
*
*
*
"World Congress on Paraconsistency, Ghent 1997, Juquehy 2000, Toulouse, 2003, Melbourne 2008, Kolkata, 2014"Paraconsistent First-Order Logic with infinite hierarchy levels of contradiction LP#. Axiomatical system HST#, as paraconsistent generalization of Hrbacek set theory HST* O. Arieli, A. Avron, A. Zamansky
"Ideal Paraconsistent Logics"
{{Non-classical logic
Belief revision
Non-classical logic
Philosophical logic
Systems of formal logic