Diagrams (4038 to 4062 of 5537)

Source	Date (min⁠–⁠max)	Aristotelian Family	B.C. (min⁠–⁠max)	Geometric Shape
Logical Squares for Classical Logic Sentences, p. 309, by Wybraniec-Skardowska, Urszula	2016	A Single PCD	2	Square
Logical Squares for Classical Logic Sentences, p. 309, by Wybraniec-Skardowska, Urszula	2016	A Single PCD	2	Square
Graded Generalized Hexagon in Fuzzy Natural Logic, p. 37, by Murinová, Petra; Novák, Vilém	2016	Jacoby-Sesmat-Blanché Sigma-3	3	Hexagon
Graded Generalized Hexagon in Fuzzy Natural Logic, p. 45, by Murinová, Petra; Novák, Vilém	2016	Non-Sigma		Hexagon
Syllogisms and 5-Square of Opposition with Intermediate Quantifiers in Fuzzy Natural Logic, p. 351, by Murinová, Petra; Novák, Vilém	2016	Classical Sigma-2	3	Rectangle
Syllogisms and 5-Square of Opposition with Intermediate Quantifiers in Fuzzy Natural Logic, p. 351, by Murinová, Petra; Novák, Vilém	2016	Non-Sigma	7	Rectangle
Syllogisms and 5-Square of Opposition with Intermediate Quantifiers in Fuzzy Natural Logic, p. 352, by Murinová, Petra; Novák, Vilém	2016	Non-Sigma		Rectangle
Syllogisms and 5-Square of Opposition with Intermediate Quantifiers in Fuzzy Natural Logic, p. 353, by Murinová, Petra; Novák, Vilém	2016	Non-Sigma		Rectangle
Syllogisms and 5-Square of Opposition with Intermediate Quantifiers in Fuzzy Natural Logic, p. 354, by Murinová, Petra; Novák, Vilém	2016	Non-Sigma		Rectangle
Orthopairs and granular computing, p. 167, by Ciucci, Davide	2016	Jacoby-Sesmat-Blanché Sigma-3	3	Hexagon
Les Oppositions Modales dans la Logique d'Al Fārābi, p. 19, by Chatti, Saloua	2016	Sigma-6 Graph		Rectangle
Les Oppositions Modales dans la Logique d'Al Fārābi, p. 24, by Chatti, Saloua	2016	Sigma-9 Graph		Octagon
Les Oppositions Modales dans la Logique d'Al Fārābi, p. 25, by Chatti, Saloua	2016	Sigma-6 Graph		Octagon
Les Oppositions Modales dans la Logique d'Al Fārābi, p. 25, by Chatti, Saloua	2016	Sherwood-Czeżowski Sigma-3	4	Hexagon
Les Oppositions Modales dans la Logique d'Al Fārābi, p. 26, by Chatti, Saloua	2016	Contrariety 3-clique	3	Triangle
Subalternation and existence presuppositions in an unconventionally formalized canonical square of opposition, p. 194, by Jacquette, Dale	2016	Classical Sigma-2	3	Rectangle
Subalternation and existence presuppositions in an unconventionally formalized canonical square of opposition, p. 195, by Jacquette, Dale	2016	Classical Sigma-2	3	Rectangle
Subalternation and existence presuppositions in an unconventionally formalized canonical square of opposition, p. 196, by Jacquette, Dale	2016	Classical Sigma-2	3	Square
Subalternation and existence presuppositions in an unconventionally formalized canonical square of opposition, p. 197, by Jacquette, Dale	2016	Classical Sigma-2	3	Rectangle
Subalternation and existence presuppositions in an unconventionally formalized canonical square of opposition, p. 199, by Jacquette, Dale	2016	Classical Sigma-2	3	Rectangle
Subalternation and existence presuppositions in an unconventionally formalized canonical square of opposition, p. 203, by Jacquette, Dale	2016	Non-Sigma	4	Rectangle
Subalternation and existence presuppositions in an unconventionally formalized canonical square of opposition, p. 204, by Jacquette, Dale	2016	Non-Sigma	4	Rectangle
Structures of opposition induced by relations. The Boolean and the gradual cases, p. 353, by Ciucci, Davide; Dubois, Didier; Prade, Henri	2016	Classical Sigma-2	3	Rectangle
Structures of opposition induced by relations. The Boolean and the gradual cases, p. 355, by Ciucci, Davide; Dubois, Didier; Prade, Henri	2016	Classical Sigma-2	3	Rectangle
Structures of opposition induced by relations. The Boolean and the gradual cases, p. 357, by Ciucci, Davide; Dubois, Didier; Prade, Henri	2016	Keynes-Johnson Sigma-4	7	Cube