You're using an ancient browser to surf the modern web. Please update to the latest version (and don't use Internet Explorer!).

Leonardi.DB
a logical geometry project

Diagrams (4279 to 4303 of 5537)

Searching for diagrams matching all criteria ...

Diagram Source Date
(min⁠–⁠max)
Aristotelian Family
B.C.
(min⁠–⁠max)
Geometric Shape
http://purl.org/lg/diagrams/carnielli_2017_groups-not-squares-exorcizing-a_1dvi3605j_p-241_1g79b9iji Groups, Not Squares: Exorcizing a Fetish, p. 241, by Carnielli, Walter 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/drago_2017_from-aristotle-s-square-of-opposition_1g799v4or_p-60_1g79cetur From Aristotle's Square of Opposition to the "Tri-unity's Concordance": Cusanus' Non-classical Reasoning, p. 60, by Drago, Antonino 2017 A Single PCD 1 Digon
http://purl.org/lg/diagrams/kumova_2017_symmetric-properties-of-the_1dvi2mqgl_p-97_1g79d4j47 Symmetric Properties of the Syllogistic System Inherited from the Square of Opposition, p. 97, by Kumova, Bora I. 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/kumova_2017_symmetric-properties-of-the_1dvi2mqgl_p-97_1g79di3tb Symmetric Properties of the Syllogistic System Inherited from the Square of Opposition, p. 97, by Kumova, Bora I. 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/kumova_2017_symmetric-properties-of-the_1dvi2mqgl_p-97_1g79dtefg Symmetric Properties of the Syllogistic System Inherited from the Square of Opposition, p. 97, by Kumova, Bora I. 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/kumova_2017_symmetric-properties-of-the_1dvi2mqgl_p-97_1g79e2fuc Symmetric Properties of the Syllogistic System Inherited from the Square of Opposition, p. 97, by Kumova, Bora I. 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/drago_2017_from-aristotle-s-square-of-opposition_1g799v4or_p-71_1g79faqtp From Aristotle's Square of Opposition to the "Tri-unity's Concordance": Cusanus' Non-classical Reasoning, p. 71, by Drago, Antonino 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/drago_2017_from-aristotle-s-square-of-opposition_1g799v4or_p-71_1g79fimpj From Aristotle's Square of Opposition to the "Tri-unity's Concordance": Cusanus' Non-classical Reasoning, p. 71, by Drago, Antonino 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/drago_2017_from-aristotle-s-square-of-opposition_1g799v4or_p-71_1g79fm5g2 From Aristotle's Square of Opposition to the "Tri-unity's Concordance": Cusanus' Non-classical Reasoning, p. 71, by Drago, Antonino 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/raclavsky-_2017_two-standard-and-two-modal-squares_1dvi2rs7t_p-125_1g79g00cj Two Standard and Two Modal Squares of Opposition, p. 125, by Raclavský, Jiří 2017 Degenerate Sigma-2 with Unconnectedness 4 4 Square
http://purl.org/lg/diagrams/raclavsky-_2017_two-standard-and-two-modal-squares_1dvi2rs7t_p-130_1g79get42 Two Standard and Two Modal Squares of Opposition, p. 130, by Raclavský, Jiří 2017 Classical Sigma-2 3 Square
http://purl.org/lg/diagrams/raclavsky-_2017_two-standard-and-two-modal-squares_1dvi2rs7t_p-133_1g79gsqbk Two Standard and Two Modal Squares of Opposition, p. 133, by Raclavský, Jiří 2017 Classical Sigma-2 3 Square
http://purl.org/lg/diagrams/raclavsky-_2017_two-standard-and-two-modal-squares_1dvi2rs7t_p-137_1g79mr6fb Two Standard and Two Modal Squares of Opposition, p. 137, by Raclavský, Jiří 2017 Classical Sigma-2 3 Square
http://purl.org/lg/diagrams/raclavsky-_2017_two-standard-and-two-modal-squares_1dvi2rs7t_p-140_1g79n39j0 Two Standard and Two Modal Squares of Opposition, p. 140, by Raclavský, Jiří 2017 Jacoby-Sesmat-Blanché Sigma-3 3 Hexagon
http://purl.org/lg/diagrams/beziau_2017_there-is-no-cube-of-opposition_1dvi2upjc_p-180_1g79ndaeb There Is No Cube of Opposition, p. 180, by Beziau, Jean-Yves 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/beziau_2017_there-is-no-cube-of-opposition_1dvi2upjc_p-183_1g79oe567 There Is No Cube of Opposition, p. 183, by Beziau, Jean-Yves 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/beziau_2017_there-is-no-cube-of-opposition_1dvi2upjc_p-183_1g79oirpp There Is No Cube of Opposition, p. 183, by Beziau, Jean-Yves 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/beziau_2017_there-is-no-cube-of-opposition_1dvi2upjc_p-183_1g7bjpgil There Is No Cube of Opposition, p. 183, by Beziau, Jean-Yves 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/beziau_2017_there-is-no-cube-of-opposition_1dvi2upjc_p-183_1g7bjuvgb There Is No Cube of Opposition, p. 183, by Beziau, Jean-Yves 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/beziau_2017_there-is-no-cube-of-opposition_1dvi2upjc_p-187_1g7bkg6ta There Is No Cube of Opposition, p. 187, by Beziau, Jean-Yves 2017 Contrariety 3-clique 3 Triangle
http://purl.org/lg/diagrams/beziau_2017_there-is-no-cube-of-opposition_1dvi2upjc_p-187_1g7bkla5e There Is No Cube of Opposition, p. 187, by Beziau, Jean-Yves 2017 Jacoby-Sesmat-Blanché Sigma-3 3 Hexagon
http://purl.org/lg/diagrams/beziau_2017_there-is-no-cube-of-opposition_1dvi2upjc_p-189_1g7blhmar There Is No Cube of Opposition, p. 189, by Beziau, Jean-Yves 2017 Contrariety 4-clique 4 Rectangle
http://purl.org/lg/diagrams/smessaert-et-al-_2017_the-unreasonable_1dvehhloo_p-204_1g7bmigje The Unreasonable Effectiveness of Bitstrings in Logical Geometry, p. 204, by Smessaert, Hans; Demey, Lorenz 2017 Jacoby-Sesmat-Blanché Sigma-3 3 Hexagon
http://purl.org/lg/diagrams/smessaert-et-al-_2017_the-unreasonable_1dvehhloo_p-204_1g7bvlciv The Unreasonable Effectiveness of Bitstrings in Logical Geometry, p. 204, by Smessaert, Hans; Demey, Lorenz 2017 Sherwood-Czeżowski Sigma-3 4 Hexagon
http://purl.org/lg/diagrams/smessaert-et-al-_2017_the-unreasonable_1dvehhloo_p-204_1g7bvqldm The Unreasonable Effectiveness of Bitstrings in Logical Geometry, p. 204, by Smessaert, Hans; Demey, Lorenz 2017 Degenerate Sigma-3 with Unconnectedness 4 4 Hexagon
↑ Back to top ↑