Diagrammatic reasoning
Diagrammatic reasoning is reasoning by means of visual representations. The study of diagrammatic reasoning is about the understanding of concepts and ideas, visualized with the use of diagrams and imagery instead of by linguistic or algebraic means.
Diagram
A diagram is a 2D geometric symbolic representation of information according to some visualization technique. Sometimes, the technique uses a 3D visualization which is then projected onto the 2D surface. The term diagram in common sense can have two meanings:- visual information device: Like the term "illustration" the diagram is used as a collective term standing for the whole class of technical genres, including graphs, technical drawings and tables.
- specific kind of visual display: This is only the genre, that shows qualitative data with shapes that are connected by lines, arrows, or other visual links.
In the specific sense diagrams and charts contrast computer graphics, technical illustrations, infographics, maps, and technical drawings, by showing "abstract rather than literal representations of information". The essences of a diagram can be seen as:
- a form of visual formatting devices
- a display that does not show quantitative data, but rather relationships and abstract information
- with building blocks such as geometrical shapes that are connected by lines, arrows, or other visual links.
Logical graph
A logical graph is a special type of graph-theoretic 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, Peirce developed several versions of a graphical formalism, or a graph-theoretic formal language, designed to be interpreted for logic.
In the century since Peirce initiated this line of development, a variety of formal systems have branched out from what is abstractly the same formal base of graph-theoretic structures.
Conceptual graph
A conceptual graph is a notation for logic based on the existential graphs of Charles Sanders Peirce and the semantic networks of artificial intelligence. In the first published paper on conceptual graphs, John F. Sowa used them to represent the conceptual schemas used in database systems. His first book applied them to a wide range of topics in artificial intelligence, computer science, and cognitive science. A linear notation, called the Conceptual Graph Interchange Format , has been standardized in the ISO standard for Common Logic.Image:Cat-on-mat.svg|thumb|250px|Elsie the cat is sitting on a mat
The diagram on the right is an example of the display form for a conceptual graph. Each box is called a concept node, and each oval is called a relation node. In CGIF, this CG would be represented by the following statement:
In CGIF, brackets enclose the information inside the concept nodes, and parentheses enclose the information inside the relation nodes. The letters x and y, which are called coreference labels, show how the concept and relation nodes are connected. In the Common Logic Interchange Format , those letters are mapped to variables, as in the following statement:
As this example shows, the asterisks on the coreference labels *x and *y in CGIF map to existentially quantified variables in CLIF, and the question marks on ?x and ?y map to bound variables in CLIF. A universal quantifier, represented @every*z in CGIF, would be represented forall in CLIF.
Entitative graph
An entitative graph is an element of the graphical 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 sentential aspects of logic are concerned.The syntax is:
- The blank page;
- Single letters, phrases;
- Objects enclosed by a simple closed curve called a cut. A cut can be empty.
- The blank page denotes False;
- Letters, phrases, subgraphs, and entire graphs can be True' or False;
- To surround objects with a cut is equivalent to Boolean complementation. Hence an empty cut denotes Truth;
- All objects within a given cut are tacitly joined by disjunction.
Existential graph
An existential graph is a type of diagrammatic or visual notation for logical expressions, proposed by Charles Sanders Peirce, who wrote his first paper on graphical logic in 1882 and continued to develop the method until his death in 1914. Peirce proposed three systems of existential graphs:- alpha – isomorphic to sentential logic and the two-element Boolean algebra;
- beta – isomorphic to first-order logic with identity, with all formulas closed;
- gamma – isomorphic to normal modal logic.
Image:PeirceAlphaGraphs.svg|thumb|250px|Alpha Graphs
In alpha the syntax is:
- The blank page;
- Single letters or phrases written anywhere on the page;
- Any graph may be enclosed by a simple closed curve called a cut or sep. A cut can be empty. Cuts can nest and concatenate at will, but must never intersect.
The semantics 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 or Boolean complementation. Hence an empty cut denotes False;
- All subgraphs within a given cut are tacitly conjoined.
Characteristica universalis
, commonly interpreted as universal characteristic, or universal character in English, is a universal and formal language imagined by the German philosopher Gottfried Leibniz able to express mathematical, scientific, and metaphysical concepts. Leibniz thus hoped to create a language usable within the framework of a universal logical calculation or calculus ratiocinator.Image:Characteristica universalis diagram.jpg|thumb|250px|right|Leibniz's diagrammatic reasoning.
Since the characteristica universalis is diagrammatic and employs pictograms, the diagrams in Leibniz's work warrant close study. On at least two occasions, Leibniz illustrated his philosophical reasoning with diagrams. One diagram, the frontispiece to his 1666 De Arte Combinatoria, represents the Aristotelian theory of how all material things are formed from combinations of the elements earth, water, air, and fire.
Image:LeibnizCharacters.jpg|thumb|225px|left|Basic elements of Leibniz's pictograms.
These four elements make up the four corners of a diamond. Opposing pairs of these are joined by a bar labeled "contraries". At the four corners of the superimposed square are the four qualities defining the elements. Each adjacent pair of these is joined by a bar labeled "possible combination"; the diagonals joining them are labeled "impossible combination." Starting from the top, fire is formed from the combination of dryness and heat; air from wetness and heat; water from coldness and wetness; earth from coldness and dryness.