Certainty (also known as epistemic certainty or objective certainty) is the
epistemic property of
belief
A belief is an attitude that something is the case, or that some proposition is true. In epistemology, philosophers use the term "belief" to refer to attitudes about the world which can be either true or false. To believe something is to take ...
s which a person has no rational grounds for doubting.
One standard way of defining epistemic certainty is that a belief is certain if and only if the person holding that belief could not be mistaken in holding that belief. Other common definitions of certainty involve the indubitable nature of such beliefs or define certainty as a property of those beliefs with the greatest possible
justification
Justification may refer to:
* Justification (epistemology), a property of beliefs that a person has good reasons for holding
* Justification (jurisprudence), defence in a prosecution for a criminal offenses
* Justification (theology), God's act of ...
. Certainty is closely related to
knowledge
Knowledge can be defined as awareness of facts or as practical skills, and may also refer to familiarity with objects or situations. Knowledge of facts, also called propositional knowledge, is often defined as true belief that is disti ...
, although contemporary philosophers tend to treat knowledge as having lower requirements than certainty.
Importantly, epistemic certainty is not the same thing as psychological certainty (also known as subjective certainty or certitude), which describes the highest degree to which a person could be convinced that something is true. While a person may be completely convinced that a particular belief is true, and might even be psychologically incapable of entertaining its falsity, this does not entail that the belief is itself beyond rational doubt or incapable of being false. While the word "certainty" is sometimes used to refer to a person's ''subjective'' certainty about the truth of a belief, philosophers are primarily interested in the question of whether any beliefs ever attain ''objective'' certainty.
The
philosophical
Philosophy (from , ) is the systematized study of general and fundamental questions, such as those about existence, reason, knowledge, values, mind, and language. Such questions are often posed as problems to be studied or resolved. Som ...
question of whether one can ever be truly certain about anything has been widely debated for centuries. Many proponents of
philosophical skepticism deny that certainty is possible, or claim that it is only possible in ''
a priori'' domains such as logic or mathematics. Historically, many philosophers have held that knowledge requires epistemic certainty, and therefore that one must have
infallible justification in order to count as knowing the truth of a proposition. However, many philosophers such as
René Descartes
René Descartes ( or ; ; Latinized: Renatus Cartesius; 31 March 1596 – 11 February 1650) was a French philosopher, scientist, and mathematician, widely considered a seminal figure in the emergence of modern philosophy and science. Mathe ...
were troubled by the resulting skeptical implications, since all of our experiences at least seem to be compatible with various
skeptical scenarios. It is generally accepted today that most of our beliefs are compatible with their falsity and are therefore
fallible, although the status of being certain is still often ascribed to a limited range of beliefs (such as "
I exist"). The apparent fallibility of our beliefs has led many contemporary philosophers to deny that knowledge requires certainty.
History
Ancient Greece
Major elements of
philosophical skepticismthe idea that things cannot be known with certainty, which the ancient Greeks expressed by the word ''
acatalepsia''are apparent in the writings of several ancient Greek philosophers, particularly
Xenophanes and
Democritus
Democritus (; el, Δημόκριτος, ''Dēmókritos'', meaning "chosen of the people"; – ) was an Ancient Greek pre-Socratic philosopher from Abdera, primarily remembered today for his formulation of an atomic theory of the universe. ...
. The first Hellenistic school that embraced philosophical skepticism was
Pyrrhonism, which was founded by
Pyrrho of Elis. Pyrrho's skepticism quickly spread to Plato's
Academy under
Arcesilaus, who abandoned Platonic
dogma
Dogma is a belief or set of beliefs that is accepted by the members of a group without being questioned or doubted. It may be in the form of an official system of principles or doctrines of a religion, such as Roman Catholicism, Judaism, Islam ...
and initiated
Academic Skepticism, the second skeptical school of
Hellenistic philosophy
Hellenistic philosophy is a time-frame for Western philosophy and Ancient Greek philosophy corresponding to the Hellenistic period. It is purely external and encompasses disparate intellectual content. There is no single philosophical school or c ...
. The major difference between the two skeptical schools was that Pyrrhonism's aims were psychotherapeutic (i.e., to lead practitioners to the state of
ataraxiafreedom from anxiety, whereas those of Academic Skepticism were about making judgments under
uncertainty
Uncertainty refers to Epistemology, epistemic situations involving imperfect or unknown information. It applies to predictions of future events, to physical measurements that are already made, or to the unknown. Uncertainty arises in partially ...
(i.e., to identify what arguments were most truth-like).
Descartes – 17th century
In his ''
Meditations on First Philosophy'', Descartes first discards all belief in things which are not absolutely certain, and then tries to establish what can be known for sure. Although the phrase "
Cogito, ergo sum" is often attributed to Descartes' ''Meditations on First Philosophy'', it is actually put forward in his ''Discourse on Method''. Due to the implications of inferring the conclusion within the predicate, however, he changed the argument to "I think, I exist"; this then became his first certainty.
Descartes' conclusion being that, in order to doubt, that which is doing the doubting certainly has to existthe act of doubting thus proving the existence of the doubter.
Ludwig Wittgenstein – 20th century
''
On Certainty'' is a series of notes made by
Ludwig Wittgenstein just prior to his death. The main theme of the work is that
context plays a role in epistemology. Wittgenstein asserts an
anti-foundationalist message throughout the work: that every claim can be doubted but certainty is possible in a framework. "The function
ropositionsserve in language is to serve as a kind of framework within which empirical propositions can make sense".
Degrees of certainty
Physicist
Lawrence M. Krauss
Lawrence Maxwell Krauss (born May 27, 1954) is an American theoretical physicist and cosmologist who previously taught at Arizona State University, Yale University, and Case Western Reserve University. He founded ASU's Origins Project, now cal ...
suggests that the need for identifying degrees of certainty is under-appreciated in various domains, including policy-making and the understanding of science. This is because different goals require different degrees of certaintyand politicians are not always aware of (or do not make it clear) how much certainty we are working with.
Rudolf Carnap viewed certainty as a matter of degree ("degrees of certainty") which could be
objectively measured, with degree one being certainty.
Bayesian analysis derives degrees of certainty which are interpreted as a measure of
subjective
Subjective may refer to:
* Subjectivity, a subject's personal perspective, feelings, beliefs, desires or discovery, as opposed to those made from an independent, objective, point of view
** Subjective experience, the subjective quality of conscio ...
psychological belief
A belief is an attitude that something is the case, or that some proposition is true. In epistemology, philosophers use the term "belief" to refer to attitudes about the world which can be either true or false. To believe something is to take ...
.
Alternatively, one might use the
legal degrees of certainty. These standards of
evidence ascend as follows: no credible evidence, some credible evidence, a preponderance of evidence, clear and convincing evidence, beyond reasonable doubt, and beyond any shadow of a doubt (i.e. ''undoubtable''recognized as an impossible standard to meetwhich serves only to terminate the list).
If knowledge requires absolute certainty, then
knowledge is most likely impossible, as evidenced by the apparent fallibility of our beliefs.
Foundational crisis of mathematics
The ''foundational crisis of mathematics'' was the early 20th century's term for the search for proper foundations of mathematics.
After several schools of the
philosophy of mathematics ran into difficulties one after the other in the 20th century, the assumption that mathematics had any foundation that could be stated within
mathematics itself began to be heavily challenged.
One attempt after another to provide unassailable foundations for mathematics was found to suffer from various
paradoxes (such as
Russell's paradox
In mathematical logic, Russell's paradox (also known as Russell's antinomy) is a set-theoretic paradox discovered by the British philosopher and mathematician Bertrand Russell in 1901. Russell's paradox shows that every set theory that contain ...
) and to be
inconsistent.
Various schools of thought were opposing each other. The leading school was that of the
formalist approach, of which
David Hilbert was the foremost proponent, culminating in what is known as
Hilbert's program, which sought to ground mathematics on a small basis of a
formal system proved sound by
metamathematical finitistic means. The main opponent was the
intuitionist school, led by
L.E.J. Brouwer, which resolutely discarded formalism as a meaningless game with symbols.
The fight was acrimonious. In 1920 Hilbert succeeded in having Brouwer, whom he considered a threat to mathematics, removed from the editorial board of ''
Mathematische Annalen'', the leading mathematical journal of the time.
Gödel's incompleteness theorems, proved in 1931, showed that essential aspects of Hilbert's program could not be attained. In
Gödel's first result he showed how to construct, for any sufficiently powerful and consistent finitely axiomatizable systemsuch as necessary to axiomatize the elementary theory of
arithmetica statement that can be shown to be true, but that does not follow from the rules of the system. It thus became clear that the notion of mathematical truth cannot be reduced to a purely formal system as envisaged in Hilbert's program. In a next result Gödel showed that such a system was not powerful enough for proving its own consistency, let alone that a simpler system could do the job. This proves that there is no hope to ''prove'' the consistency of any system that contains an axiomatization of elementary arithmetic, and, in particular, to prove the consistency of
Zermelo–Fraenkel set theory (ZFC), the system which is generally used for building all mathematics.
However, if ZFC is not consistent, there exists a proof of both a theorem and its negation, and this would imply a proof of all theorems and all their negations. As, despite the large number of mathematical areas that have been deeply studied, no such contradiction has ever been found, this provides an almost certainty of mathematical results. Moreover, if such a contradiction would eventually be found, most mathematicians are convinced that it will be possible to resolve it by a slight modification of the axioms of ZFC.
Moreover, the method of
forcing
Forcing may refer to: Mathematics and science
* Forcing (mathematics), a technique for obtaining independence proofs for set theory
*Forcing (recursion theory), a modification of Paul Cohen's original set theoretic technique of forcing to deal with ...
allows proving the consistency of a theory, provided that another theory is consistent. For example, if ZFC is consistent, adding to it the
continuum hypothesis or a negation of it defines two theories that are both consistent (in other words, the continuum is independent from the axioms of ZFC). This existence of proofs of relative consistency implies that the consistency of modern mathematics depends weakly on a particular choice on the axioms on which mathematics are built.
In this sense, the crisis has been resolved, as, although consistency of ZFC is not provable, it solves (or avoids) all logical paradoxes at the origin of the crisis, and there are many facts that provide a quasi-certainty of the consistency of modern mathematics.
See also
*
Almost surely
In probability theory, an event is said to happen almost surely (sometimes abbreviated as a.s.) if it happens with probability 1 (or Lebesgue measure 1). In other words, the set of possible exceptions may be non-empty, but it has probability 0 ...
*
Fideism
*
Gut feeling
Feelings are subjective self-contained phenomenal experiences. According to the ''APA Dictionary of Psychology'', a feeling is "a self-contained phenomenal experience"; and feelings are "subjective, evaluative, and independent of the sensations ...
*
Infallibility
Infallibility refers to an inability to be wrong. It can be applied within a specific domain, or it can be used as a more general adjective. The term has significance in both epistemology and theology, and its meaning and significance in both fi ...
*
Justified true belief
*
Neuroethological innate behavior,
instinct
*
Pascal's Wager
*
Pragmatism
*
Scientific consensus
Scientific consensus is the generally held judgment, position, and opinion of the majority or the supermajority of scientists in a particular field of study at any particular time.
Consensus is achieved through scholarly communication at co ...
*
Skeptical hypothesis
Philosophical skepticism ( UK spelling: scepticism; from Greek σκέψις ''skepsis'', "inquiry") is a family of philosophical views that question the possibility of knowledge. It differs from other forms of skepticism in that it even rej ...
* As contrary concepts
**
Fallibilism
**
Indeterminism
**
Multiverse
References
External links
*
certainty The American Heritage Dictionary of the English Language
''The American Heritage Dictionary of the English Language'' (''AHD'') is an American English, American dictionary of English published by Boston publisher Houghton Mifflin Harcourt, Houghton Mifflin, the first edition of which appeared in 1969. ...
.
Bartleby.com
*
*
The certainty of belief
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