Diagrams (26 to 50 of 5537)

Source	Date (min⁠–⁠max)	Aristotelian Family	B.C. (min⁠–⁠max)	Geometric Shape
A Database of Aristotelian Diagrams: Empirical Foundations for Logical Geometry, p. 128, by Demey, Lorenz; Smessaert, Hans	2022	Classical Sigma-2	3	Rectangle
A Defeasible Logic of Intention, p. 327, by Castro-Manzano, José Martín	2013	Classical Sigma-2	3	Square
A Diagrammatic Calculus of Syllogisms, p. 360, by Pagnan, Ruggero	2012	Classical Sigma-2	3	Rectangle
A Diagrammatic Calculus of Syllogisms, p. 43, by Pagnan, Ruggero	2013	Classical Sigma-2	3	Rectangle
A Few Worries About the Systematic Metaphysics of Open Future Open Theism, p. 48, by Arbour, Benjamin H.	2019	Classical Sigma-2	3	Square
A Formal Analysis of Generalized Peterson's Syllogisms Related to Graded Peterson's Cube, p. 26, by Fiala, Karel; Murinová, Petra	2022	Classical Sigma-2	3	Rectangle
A Formal Analysis of Generalized Peterson's Syllogisms Related to Graded Peterson's Cube, p. 26, by Fiala, Karel; Murinová, Petra	2022			Cube
A Formal Concept View of Abstract Argumentation, p. 9, by Amgoud, Leila; Prade, Henri	2013	Keynes-Johnson Sigma-4	7	Cube
A Formal Model of the Intermediate Quantifiers "A Few", "Several" and "A Little", p. 440, by Novák, Vilém; Murinová, Petra	2019	Non-Sigma		Rectangle
A Generalization of Hume's Thesis, p. 111, by Woleński, Jan	2006	Classical Sigma-2	3	Square
A Generalization of Hume's Thesis, p. 112, by Woleński, Jan	2006	Sigma-4 Graph	4–16	Square
A Hexagon of Opposition for the Theism/Atheism Debate, p. 390, by Demey, Lorenz	2019	Classical Sigma-2	3	Rectangle
A Hexagon of Opposition for the Theism/Atheism Debate, p. 390, by Demey, Lorenz	2019	Jacoby-Sesmat-Blanché Sigma-3	3	Hexagon
A Hexagon of Opposition for the Theism/Atheism Debate, p. 390, by Demey, Lorenz	2019	Jacoby-Sesmat-Blanché Sigma-3	3	Hexagon
A Hexagonal Framework of the Field $\mathbb{F}_4$ and the Associated Borromean Logic, p. 123, by Guitart, René	2012	Classical Sigma-2	3	Rectangle
A Hexagonal Framework of the Field $\mathbb{F}_4$ and the Associated Borromean Logic, p. 123, by Guitart, René	2012	Classical Sigma-2	3	Rectangle
A Hexagonal Framework of the Field $\mathbb{F}_4$ and the Associated Borromean Logic, p. 123, by Guitart, René	2012	Jacoby-Sesmat-Blanché Sigma-3	3	Hexagon
A Hexagonal Framework of the Field $\mathbb{F}_4$ and the Associated Borromean Logic, p. 123, by Guitart, René	2012	Jacoby-Sesmat-Blanché Sigma-3	3	Cube
A Hexagonal Framework of the Field $\mathbb{F}_4$ and the Associated Borromean Logic, p. 123, by Guitart, René	2012	Jacoby-Sesmat-Blanché Sigma-3	3	Rectangular Cuboid
A Hexagonal Framework of the Field $\mathbb{F}_4$ and the Associated Borromean Logic, p. 126, by Guitart, René	2012	Jacoby-Sesmat-Blanché Sigma-3	3	Hexagon
A Hexagonal Framework of the Field $\mathbb{F}_4$ and the Associated Borromean Logic, p. 127, by Guitart, René	2012			Hexagon
A Hexagonal Framework of the Field $\mathbb{F}_4$ and the Associated Borromean Logic, p. 127, by Guitart, René	2012			Hexagon
A Hexagonal Framework of the Field $\mathbb{F}_4$ and the Associated Borromean Logic, p. 127, by Guitart, René	2012			Hexagon
A Hexagonal Framework of the Field $\mathbb{F}_4$ and the Associated Borromean Logic, p. 127, by Guitart, René	2012			Hexagon
A Hexagonal Framework of the Field $\mathbb{F}_4$ and the Associated Borromean Logic, p. 128, by Guitart, René	2012			Hexagon