An existential graph is a type of

diagram A diagram is a symbolic representation of information using visualization techniques. Diagrams have been used since prehistoric times on walls of caves, but became more prevalent during the Enlightenment. Sometimes, the technique uses a three- ...

matic or visual notation for logical expressions, proposed by

Charles Sanders Peirce Charles Sanders Peirce ( ; September 10, 1839 – April 19, 1914) was an American philosopher, logician, mathematician and scientist who is sometimes known as "the father of pragmatism". Educated as a chemist and employed as a scientist for t ...

, who wrote on graphical logic as early as 1882,Peirce, C. S., "

n Junctures and Fractures in Logic N, or n, is the fourteenth letter in the Latin alphabet, used in the modern English alphabet, the alphabets of other western European languages and others worldwide. Its name in English is ''en'' (pronounced ), plural ''ens''. History ...

(editors' title for MS 427 (the new numbering system), Fall–Winter 1882), and "Letter, Peirce to O. H. Mitchell" (L 294, 21 December 1882), '' Writings of Charles S. Peirce'', v. 4, "Junctures" on pp. 391–393 (Googl
preview
and the letter on pp. 394–399 (Googl
preview
. See Sowa, John F. (1997), "Matching Logical Structure to Linguistic Structure", ''Studies in the Logic of Charles Sanders Peirce'', Nathan Houser, Don D. Roberts, and James Van Evra, editors, Bloomington and Indianopolis: Indiana University Press, pp. 418–444, see 420, 425, 426, 428. and continued to develop the method until his death in 1914.

The graphs

Peirce proposed three systems of existential graphs: * ''alpha'',

isomorphic In mathematics, an isomorphism is a structure-preserving mapping between two structures of the same type that can be reversed by an inverse mapping. Two mathematical structures are isomorphic if an isomorphism exists between them. The word is ...

sentential logic Propositional calculus is a branch of logic. It is also called propositional logic, statement logic, sentential calculus, sentential logic, or sometimes zeroth-order logic. It deals with propositions (which can be true or false) and relations b ...

and the

two-element Boolean algebra In mathematics and abstract algebra, the two-element Boolean algebra is the Boolean algebra whose ''underlying set'' (or universe or ''carrier'') ''B'' is the Boolean domain. The elements of the Boolean domain are 1 and 0 by convention, so that ''B ...

; * ''beta'', isomorphic to

first-order logic First-order logic—also known as predicate logic, quantificational logic, and first-order predicate calculus—is a collection of formal systems used in mathematics, philosophy, linguistics, and computer science. First-order logic uses quantifie ...

with identity, with all formulas closed; * ''gamma'', (nearly) isomorphic to

normal modal logic In logic, a normal modal logic is a set ''L'' of modal formulas such that ''L'' contains: * All propositional tautologies; * All instances of the Kripke schema: \Box(A\to B)\to(\Box A\to\Box B) and it is closed under: * Detachment rule (''modus po ...

. ''Alpha'' nests in ''beta'' and ''gamma''. ''Beta'' does not nest in ''gamma'', quantified modal logic being more general than put forth by Peirce.

Alpha

The

syntax In linguistics, syntax () is the study of how words and morphemes combine to form larger units such as phrases and sentences. Central concerns of syntax include word order, grammatical relations, hierarchical sentence structure ( constituency) ...

is: *The blank page; *Single letters or phrases written anywhere on the page; *Any graph may be enclosed by a

simple closed curve In topology, the Jordan curve theorem asserts that every ''Jordan curve'' (a plane simple closed curve) divides the plane into an " interior" region bounded by the curve and an "exterior" region containing all of the nearby and far away exterior ...

called a ''cut'' or ''sep''. A cut can be empty. Cuts can nest and concatenate at will, but must never intersect. Any well-formed part of a graph is a subgraph. The

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 ...

are: *The blank page denotes Truth; *Letters, phrases, subgraphs, and entire graphs may be True or False; *To enclose a subgraph with a cut is equivalent to logical

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 ...

or Boolean complementation. Hence an empty cut denotes False; *All subgraphs within a given cut are tacitly

conjoined Conjoined twins – sometimes popularly referred to as Siamese twins – are twins joined ''in utero''. A very rare phenomenon, the occurrence is estimated to range from 1 in 49,000 births to 1 in 189,000 births, with a somewhat higher incidence ...

. Hence the ''alpha'' graphs are a minimalist notation for

, grounded in the expressive adequacy of And and Not. The ''alpha'' graphs constitute a radical simplification of the

and the truth functors. The ''depth'' of an object is the number of cuts that enclose it. ''Rules of inference'': *Insertion - Any subgraph may be inserted into an odd numbered depth. *Erasure - Any subgraph in an even numbered depth may be erased. ''Rules of equivalence'': *Double cut - A pair of cuts with nothing between them may be drawn around any subgraph. Likewise two nested cuts with nothing between them may be erased. This rule is equivalent to Boolean involution. *Iteration/Deiteration – To understand this rule, it is best to view a graph as a

tree structure A tree structure, tree diagram, or tree model is a way of representing the hierarchical nature of a structure in a graphical form. It is named a "tree structure" because the classic representation resembles a tree, although the chart is gener ...

having

node In general, a node is a localized swelling (a "knot") or a point of intersection (a vertex). Node may refer to: In mathematics *Vertex (graph theory), a vertex in a mathematical graph *Vertex (geometry), a point where two or more curves, lines, ...

s and

ancestors An ancestor, also known as a forefather, fore-elder or a forebear, is a parent or (recursively) the parent of an antecedent (i.e., a grandparent, great-grandparent, great-great-grandparent and so forth). ''Ancestor'' is "any person from whom ...

. Any subgraph ''P'' in node ''n'' may be copied into any node depending on ''n''. Likewise, any subgraph ''P'' in node ''n'' may be erased if there exists a copy of ''P'' in some node ancestral to ''n'' (i.e., some node on which ''n'' depends). For an equivalent rule in an algebraic context, see C2 in ''

Laws of Form ''Laws of Form'' (hereinafter ''LoF'') is a book by G. Spencer-Brown, published in 1969, that straddles the boundary between mathematics and philosophy. ''LoF'' describes three distinct logical systems: * The "primary arithmetic" (described in Ch ...

''. A proof manipulates a graph by a series of steps, with each step justified by one of the above rules. If a graph can be reduced by steps to the blank page or an empty cut, it is what is now called a tautology (or the complement thereof). Graphs that cannot be simplified beyond a certain point are analogues of the

satisfiable In mathematical logic, a formula is ''satisfiable'' if it is true under some assignment of values to its variables. For example, the formula x+3=y is satisfiable because it is true when x=3 and y=6, while the formula x+1=x is not satisfiable over ...

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 ...

s of

Beta

Peirce notated

predicate Predicate or predication may refer to: * Predicate (grammar), in linguistics * Predication (philosophy) * several closely related uses in mathematics and formal logic: **Predicate (mathematical logic) **Propositional function **Finitary relation, o ...

s using intuitive English phrases; the standard notation of contemporary logic, capital Latin letters, may also be employed. A dot asserts the existence of some individual in the

domain of discourse In the formal sciences, the domain of discourse, also called the universe of discourse, universal set, or simply universe, is the set of entities over which certain variables of interest in some formal treatment may range. Overview The domain ...

. Multiple instances of the same object are linked by a line, called the "line of identity". There are no literal variables or quantifiers in the sense of

. A line of identity connecting two or more predicates can be read as asserting that the predicates share a common variable. The presence of lines of identity requires modifying the ''alpha'' rules of Equivalence. The beta graphs can be read as a system in which all formula are to be taken as closed, because all variables are implicitly quantified. If the "shallowest" part of a line of identity has even (odd) depth, the associated variable is tacitly existentially ( universally) quantified. Zeman (1964) was the first to note that the ''beta'' graphs are

with

equality Equality may refer to: Society * Political equality, in which all members of a society are of equal standing ** Consociationalism, in which an ethnically, religiously, or linguistically divided state functions by cooperation of each group's elite ...

(also see Zeman 1967). However, the secondary literature, especially Roberts (1973) and Shin (2002), does not agree on just how this is so. Peirce's writings do not address this question, because first-order logic was first clearly articulated only some years after his death, in the 1928 first edition of

David Hilbert David Hilbert (; ; 23 January 1862 – 14 February 1943) was a German mathematician, one of the most influential mathematicians of the 19th and early 20th centuries. Hilbert discovered and developed a broad range of fundamental ideas in many a ...

and

Wilhelm Ackermann Wilhelm Friedrich Ackermann (; ; 29 March 1896 – 24 December 1962) was a German mathematician and logician best known for his work in mathematical logic and the Ackermann function, an important example in the theory of computation. Biography ...

's ''

Principles of Mathematical Logic ''Principles of Mathematical Logic'' is the 1950 American translation of the 1938 second edition of David Hilbert's and Wilhelm Ackermann's classic text ''Grundzüge der theoretischen Logik'', on elementary mathematical logic. The 1928 first editi ...

''.

Gamma

Add to the syntax of ''alpha'' a second kind of

, written using a dashed rather than a solid line. Peirce proposed rules for this second style of cut, which can be read as the primitive

unary operator In mathematics, an unary operation is an operation with only one operand, i.e. a single input. This is in contrast to binary operations, which use two operands. An example is any function , where is a set. The function is a unary operation on ...

modal logic Modal logic is a collection of formal systems developed to represent statements about necessity and possibility. It plays a major role in philosophy of language, epistemology, metaphysics, and natural language semantics. Modal logics extend other ...

. Zeman (1964) was the first to note that straightforward emendations of the ''gamma'' graph rules yield the well-known modal logics S4 and S5. Hence the ''gamma'' graphs can be read as a peculiar form of

. This finding of Zeman's has gone unremarked to this day, but is nonetheless included here as a point of interest.

Peirce's role

The existential graphs are a curious offspring of Peirce the

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 ...

ian/mathematician with Peirce the founder of a major strand of

semiotics Semiotics (also called semiotic studies) is the systematic study of sign processes ( semiosis) and meaning making. Semiosis is any activity, conduct, or process that involves signs, where a sign is defined as anything that communicates something ...

. Peirce's graphical logic is but one of his many accomplishments in logic and mathematics. In a series of papers beginning in 1867, and culminating with his classic paper in the 1885 ''

American Journal of Mathematics The ''American Journal of Mathematics'' is a bimonthly mathematics journal published by the Johns Hopkins University Press. History The ''American Journal of Mathematics'' is the oldest continuously published mathematical journal in the United ...

'', Peirce developed much of the

propositional calculus Propositional calculus is a branch of logic. It is also called propositional logic, statement logic, sentential calculus, sentential logic, or sometimes zeroth-order logic. It deals with propositions (which can be true or false) and relations b ...

, quantification and the

predicate calculus Predicate or predication may refer to: * Predicate (grammar), in linguistics * Predication (philosophy) * several closely related uses in mathematics and formal logic: **Predicate (mathematical logic) **Propositional function **Finitary relation, o ...

, and some rudimentary

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 ...

Model theorists A model is an informative representation of an object, person or system. The term originally denoted the Plan_(drawing), plans of a building in late 16th-century English, and derived via French and Italian ultimately from Latin ''modulus'', a mea ...

consider Peirce the first of their kind. He also extended

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 ...

relation algebra In mathematics and abstract algebra, a relation algebra is a residuated Boolean algebra expanded with an involution called converse, a unary operation. The motivating example of a relation algebra is the algebra 2''X''² of all binary relations ...

. He stopped short of

metalogic Metalogic is the study of the metatheory of logic. Whereas ''logic'' studies how logical systems can be used to construct valid and sound arguments, metalogic studies the properties of logical systems.Harry GenslerIntroduction to Logic Routledge, ...

(which eluded even ''

Principia Mathematica The ''Principia Mathematica'' (often abbreviated ''PM'') is a three-volume work on the foundations of mathematics written by mathematician–philosophers Alfred North Whitehead and Bertrand Russell and published in 1910, 1912, and 1913. ...

''). But Peirce's evolving

semiotic Semiotics (also called semiotic studies) is the systematic study of sign processes ( semiosis) and meaning making. Semiosis is any activity, conduct, or process that involves signs, where a sign is defined as anything that communicates something ...

theory led him to doubt the value of logic formulated using conventional linear notation, and to prefer that logic and mathematics be notated in two (or even three) dimensions. His work went beyond Euler's diagrams and

Venn Venn is a surname and a given name. It may refer to: Given name * Venn Eyre (died 1777), Archdeacon of Carlisle, Cumbria, England * Venn Pilcher (1879–1961), Anglican bishop, writer, and translator of hymns * Venn Young (1929–1993), New Zea ...

's 1880

revision Revision is the process of revising. More specifically, it may refer to: * Update, a modification of software or a database * Revision control, the management of changes to sets of computer files * ''ReVisions'', a 2004 anthology of alternate hi ...

thereof.

Frege Friedrich Ludwig Gottlob Frege (; ; 8 November 1848 – 26 July 1925) was a German philosopher, logician, and mathematician. He was a mathematics professor at the University of Jena, and is understood by many to be the father of analytic philo ...

's 1879 ''

Begriffsschrift ''Begriffsschrift'' (German for, roughly, "concept-script") is a book on logic by Gottlob Frege, published in 1879, and the formal system set out in that book. ''Begriffsschrift'' is usually translated as ''concept writing'' or ''concept notatio ...

'' also employed a two-dimensional notation for logic, but one very different from Peirce's. Peirce's first published paper on graphical logic (reprinted in Vol. 3 of his ''Collected Papers'') proposed a system dual (in effect) to the ''alpha'' existential graphs, called the

entitative graph An entitative graph is an element of the diagrammatic syntax for logic that Charles Sanders Peirce developed under the name of qualitative logic beginning in the 1880s, taking the coverage of the formalism only as far as the propositional or ...

s. He very soon abandoned this formalism in favor of the existential graphs. In 1911

Victoria, Lady Welby Victoria, Lady Welby (27 April 1837 – 29 March 1912), more correctly Lady Welby-Gregory, was a self-educated British philosopher of language, musician and watercolourist. Life Welby was born to the Hon. Charles Stuart-Wortley-Mackenzie and ...

showed the existential graphs to

C. K. Ogden Charles Kay Ogden (; 1 June 1889 – 20 March 1957) was an English linguist, philosopher, and writer. Described as a polymath but also an eccentric and outsider, he took part in many ventures related to literature, politics, the arts, and philos ...

who felt they could usefully be combined with Welby's thoughts in a "less abstruse form." Otherwise they attracted little attention during his life and were invariably denigrated or ignored after his death, until the PhD theses by Roberts (1964) and Zeman (1964).

References

*1931–1935 & 1958. '' The Collected Papers of Charles Sanders Peirce''. Volume 4, Book II: "Existential Graphs", consists of paragraphs 347–584. A discussion also begins in paragraph 617. **Paragraphs 347–349 (II.1.1. "Logical Diagram")—Peirce's definition "Logical Diagram (or Graph)" in Baldwin's ''Dictionary of Philosophy and Psychology'' (1902)
v. 2, p. 28
''Classics in the History of Psychology'

**Paragraphs 350–371 (II.1.2. "Of Euler's Diagrams")—from "Graphs" (manuscript 479) c. 1903. **Paragraphs 372–58
Eprint
**Paragraphs 372–393 (II.2. "Symbolic Logic")—Peirce's part of "Symbolic Logic" in Baldwin's ''Dictionary of Philosophy and Psychology'' (1902
v. 2, pp. 645
��650, beginning (near second column's top) with "If symbolic logic be defined...". Paragraph 393 (Baldwin's DPP2 p. 650) is by Peirce and

Christine Ladd-Franklin Christine Ladd-Franklin (December 1, 1847 – March 5, 1930) was an American psychologist, logician, and mathematician. Early life and education Christine Ladd, sometimes known by her nickname "Kitty", was born on December 1, 1847, in Winds ...

("C.S.P., C.L.F."). **Paragraphs 394–417 (II.3. "Existential Graphs")—from Peirce's pamphlet ''A Syllabus of Certain Topics of Logic'', pp. 15–23, Alfred Mudge & Son, Boston (1903). **Paragraphs 418–509 (II.4. "On Existential Graphs, Euler's Diagrams, and Logical Algebra")—from "Logical Tracts, No. 2" (manuscript 492), c. 1903. **Paragraphs 510–529 (II.5. "The Gamma Part of Existential Graphs")—from "Lowell Lectures of 1903," Lecture IV (manuscript 467). **Paragraphs 530–572 (II.6.)—"Prolegomena To an Apology For Pragmaticism" (1906), ''

The Monist ''The Monist: An International Quarterly Journal of General Philosophical Inquiry'' is a quarterly peer-reviewed academic journal in the field of philosophy. It was established in October 1890 by American publisher Edward C. Hegeler. History Init ...

'', v. XVI
n. 4, pp. 492
546. Corrections (1907) in ''The Monist'' v. XVII
p. 160
**Paragraphs 573–584 (II.7. "An Improvement on the Gamma Graphs")—from "For the National Academy of Science, 1906 April Meeting in Washington" (manuscript 490). **Paragraphs 617–623 (at least) (in Book III, Ch. 2, §2, paragraphs 594–642)—from "Some Amazing Mazes: Explanation of Curiosity the First", ''The Monist'', v. XVIII, 1908
n. 3, pp. 416
464, see startin
p. 440
*1992. "Lecture Three: The Logic of Relatives", '' Reasoning and the Logic of Things'', pp. 146–164. Ketner, Kenneth Laine (editing and introduction), and

Hilary Putnam Hilary Whitehall Putnam (; July 31, 1926 – March 13, 2016) was an American philosopher, mathematician, and computer scientist, and a major figure in analytic philosophy in the second half of the 20th century. He made significant contributions ...

(commentary).

Harvard University Press Harvard University Press (HUP) is a publishing house established on January 13, 1913, as a division of Harvard University, and focused on academic publishing. It is a member of the Association of American University Presses. After the retirem ...

. Peirce's 1898 lectures in Cambridge, Massachusetts. *1977, 2001. '' Semiotic and Significs: The Correspondence between C.S. Peirce and Victoria Lady Welby''. Hardwick, C.S., ed. Lubbock TX: Texas Tech University Press. 2nd edition 2001.
A transcription of Peirce's MS 514
(1909), edited with commentary by

John Sowa John Florian Sowa (born 1940) is an American computer scientist, an expert in artificial intelligence and computer design, and the inventor of conceptual graphs. Biography Sowa received a BS in mathematics from Massachusetts Institute of Techn ...

. Currently, the chronological critical edition of Peirce's works, the ''

Writings Writing is a medium of human communication which involves the representation of a language through a system of physically inscribed, mechanically transferred, or digitally represented symbols. Writing systems do not themselves constitute h ...

'', extends only to 1892. Much of Peirce's work on

logical graph A logical graph is a special type of diagrammatic structure in any one of several systems of graphical syntax that Charles Sanders Peirce developed for logic. In his papers on ''qualitative logic'', ''entitative graphs'', and ''existential graphs'' ...

s consists of manuscripts written after that date and still unpublished. Hence our understanding of Peirce's graphical logic is likely to change as the remaining 23 volumes of the chronological edition appear.

Secondary literature

* Hammer, Eric M. (1998), "Semantics for Existential Graphs," ''Journal of Philosophical Logic 27'': 489–503. * Ketner, Kenneth Laine **(1981), "The Best Example of Semiosis and Its Use in Teaching Semiotics", ''American Journal of Semiotics'' v. I, n. 1–2, pp. 47–83. Article is an introduction to existential graphs. **(1990), ''Elements of Logic: An Introduction to Peirce's Existential Graphs'', Texas Tech University Press, Lubbock, TX, 99 pages, spiral-bound. * Queiroz, João & Stjernfelt, Frederik ** (2011), "Diagrammatical Reasoning and Peircean Logic Representation", ''Semiotica'' vol. 186 (1/4). (Special issue on Peirce's diagrammatic logic.

* Roberts, Don D. **(1964), "Existential Graphs and Natural Deduction" in Moore, E. C., and Robin, R. S., eds., ''Studies in the Philosophy of C. S. Peirce, 2nd series''. Amherst MA:

University of Massachusetts Press The University of Massachusetts Press is a university press that is part of the University of Massachusetts Amherst. The press was founded in 1963, publishing scholarly books and non-fiction. The press imprint is overseen by an interdisciplinar ...

. The first publication to show any sympathy and understanding for Peirce's graphical logic. **(1973). ''The Existential Graphs of C.S. Peirce.'' John Benjamins. An outgrowth of his 1963 thesis. * Shin, Sun-Joo (2002), ''The Iconic Logic of Peirce's Graphs''. MIT Press. * Zalamea, Fernando. ''Peirce's Logic of Continuity.'' Docent Press, Boston MA. 2012. ISBN 9 780983 700494. **Part II: Peirce's Existential Graphs, pp. 76-162. * Zeman, J. J. **(1964),
The Graphical Logic of C.S. Peirce.
' Unpublished Ph.D. thesis submitted to the

University of Chicago The University of Chicago (UChicago, Chicago, U of C, or UChi) is a private research university in Chicago, Illinois. Its main campus is located in Chicago's Hyde Park neighborhood. The University of Chicago is consistently ranked among the b ...

. **(1967), "A System of Implicit Quantification," ''Journal of Symbolic Logic 32'': 480–504.

External links

Stanford Encyclopedia of Philosophy The ''Stanford Encyclopedia of Philosophy'' (''SEP'') combines an online encyclopedia of philosophy with peer-reviewed publication of original papers in philosophy, freely accessible to Internet users. It is maintained by Stanford University. Eac ...

Peirce's Logic
by Sun-Joo Shin and Eric Hammer. * Dau, Frithjof
Peirce's Existential Graphs --- Readings and Links.
An annotated bibliography on the existential graphs. * Gottschall, Christian

— Java applet for deriving Alpha graphs. * Liu, Xin-Wen,

(via Wayback Machine), Institute of Philosophy, Chinese Academy of Social Sciences, Beijing, PRC. * (NB. Existential graphs and

conceptual graph A conceptual graph (CG) is a formalism for knowledge representation. In the first published paper on CGs, John F. Sowa used them to represent the conceptual schemas used in database systems. The first book on CGs applied them to a wide range of ...

s.) * Van Heuveln, Bram,
Existential Graphs.
Dept. of Cognitive Science,

Rensselaer Polytechnic Institute Rensselaer Polytechnic Institute () (RPI) is a private research university in Troy, New York, with an additional campus in Hartford, Connecticut. A third campus in Groton, Connecticut closed in 2018. RPI was established in 1824 by Stephen Van ...

. Alpha only. * Zeman, Jay J.,
Existential Graphs
. Wit
four online papers
by Peirce. {{DEFAULTSORT:Existential Graph Logic Logical calculi Philosophical logic History of logic History of mathematics Charles Sanders Peirce