Diagrams (3061 to 3085 of 5537)

Source	Date (min⁠–⁠max)	Aristotelian Family	B.C. (min⁠–⁠max)	Geometric Shape
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 205, by Mélès, Baptiste	2012	Classical Sigma-2	3	Square
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 205, by Mélès, Baptiste	2012	Classical Sigma-2	3	Rectangle
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 206, by Mélès, Baptiste	2012	Non-Sigma		Rectangle
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 206, by Mélès, Baptiste	2012	Non-Sigma		Rectangle
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 208, by Mélès, Baptiste	2012	Non-Sigma		Square
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 208, by Mélès, Baptiste	2012	Non-Sigma		Triangle
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 208, by Mélès, Baptiste	2012	Non-Sigma		Triangle
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 208, by Mélès, Baptiste	2012	Classical Sigma-2	3	Rectangle
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 210, by Mélès, Baptiste	2012	Non-Sigma		Rectangle
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 211, by Mélès, Baptiste	2012	Non-Sigma		Rectangle
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 211, by Mélès, Baptiste	2012	Non-Sigma		Rectangle
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 211, by Mélès, Baptiste	2012	Classical Sigma-2	3	Rectangle
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 212, by Mélès, Baptiste	2012	Classical Sigma-2	3	Rectangle
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 213, by Mélès, Baptiste	2012	Classical Sigma-2	3	Square
The Square of Opposition and Generalized Quantifiers, p. 223, by D'Alfonso, Duilio	2012	Classical Sigma-2	3	Square
The Square of Opposition and Generalized Quantifiers, p. 223, by D'Alfonso, Duilio	2012	Classical Sigma-2	3	Square
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 213, by Mélès, Baptiste	2012	Non-Sigma		Square
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 213, by Mélès, Baptiste	2012	Non-Sigma		Square
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 213, by Mélès, Baptiste	2012	Non-Sigma		Square
No Group of Opposition for Constructive Logics: The Intuitionistic and Linear Cases, p. 213, by Mélès, Baptiste	2012	Non-Sigma		Square
The Square of Opposition and Generalized Quantifiers, p. 224, by D'Alfonso, Duilio	2012	A Single PCD	2	Square
The Square of Opposition and Generalized Quantifiers, p. 224, by D'Alfonso, Duilio	2012	Classical Sigma-2	3	Square
The Square of Opposition and Generalized Quantifiers, p. 224, by D'Alfonso, Duilio	2012	Classical Sigma-2	3	Square
Privations, Negations and the Square: Basic Elements of a Logic of Privations, p. 234, by Gerogiorgakis, Stamatios	2012	Sherwood-Czeżowski Sigma-3	4	Hexagon
Privations, Negations and the Square: Basic Elements of a Logic of Privations, p. 235, by Gerogiorgakis, Stamatios	2012	Sherwood-Czeżowski Sigma-3	4	Square