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Leonardi.DB
a logical geometry project

Diagrams (4151 to 4175 of 6311)

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http://purl.org/lg/diagrams/gaines_2015_universal-logic-as-a-science-of_1dvf0db11_p-180_1j20augrp Universal Logic as a Science of Patterns, p. 180, by Gaines, Brian R. 2015 Pentagon
http://purl.org/lg/diagrams/gaines_2015_universal-logic-as-a-science-of_1dvf0db11_p-180_1j20b174t Universal Logic as a Science of Patterns, p. 180, by Gaines, Brian R. 2015 Pentagon
http://purl.org/lg/diagrams/gaines_2015_universal-logic-as-a-science-of_1dvf0db11_p-185_1j20ctij7 Universal Logic as a Science of Patterns, p. 185, by Gaines, Brian R. 2015 Triangle
http://purl.org/lg/diagrams/gaines_2015_universal-logic-as-a-science-of_1dvf0db11_p-185_1j20d0onn Universal Logic as a Science of Patterns, p. 185, by Gaines, Brian R. 2015 Triangle
http://purl.org/lg/diagrams/guitart_2015_hexagonal-logic-of-the-field-usd_1dvf0ku3r_p-194_1j20d40ql Hexagonal Logic of the Field $\mathbb{F}_8$ as a Boolean Logic with Three Involutive Modalities, p. 194, by Guitart, René 2015 Rectangular Cuboid
http://purl.org/lg/diagrams/guitart_2015_hexagonal-logic-of-the-field-usd_1dvf0ku3r_p-194_1j20d7fgc Hexagonal Logic of the Field $\mathbb{F}_8$ as a Boolean Logic with Three Involutive Modalities, p. 194, by Guitart, René 2015 Cube
http://purl.org/lg/diagrams/guitart_2015_hexagonal-logic-of-the-field-usd_1dvf0ku3r_p-195_1j20ddr1m Hexagonal Logic of the Field $\mathbb{F}_8$ as a Boolean Logic with Three Involutive Modalities, p. 195, by Guitart, René 2015 Hexagon
http://purl.org/lg/diagrams/guitart_2015_hexagonal-logic-of-the-field-usd_1dvf0ku3r_p-195_1j20dgvkn Hexagonal Logic of the Field $\mathbb{F}_8$ as a Boolean Logic with Three Involutive Modalities, p. 195, by Guitart, René 2015 Hexagon
http://purl.org/lg/diagrams/lenzen_2015_caramuel-and-the-quantification-of-the_1dvf1gm20_p-363_1j20dkbk4 Caramuel and the "Quantification of the Predicate", p. 363, by Lenzen, Wolfgang 2015 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/lenzen_2015_caramuel-and-the-quantification-of-the_1dvf1gm20_p-371_1j20dot92 Caramuel and the "Quantification of the Predicate", p. 371, by Lenzen, Wolfgang 2015 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/smessaert-et-al-_2015_beziau-s-contributions-to_1dvehlp8g_p-487_1j20dv7qu Béziau's Contributions to the Logical Geometry of Modalities and Quantifiers, p. 487, by Smessaert, Hans; Demey, Lorenz 2015
http://purl.org/lg/diagrams/smessaert-et-al-_2015_beziau-s-contributions-to_1dvehlp8g_p-487_1j20e4kdl Béziau's Contributions to the Logical Geometry of Modalities and Quantifiers, p. 487, by Smessaert, Hans; Demey, Lorenz 2015
http://purl.org/lg/diagrams/smessaert-et-al-_2015_beziau-s-contributions-to_1dvehlp8g_p-490_1j20e8bbf Béziau's Contributions to the Logical Geometry of Modalities and Quantifiers, p. 490, by Smessaert, Hans; Demey, Lorenz 2015
http://purl.org/lg/diagrams/smessaert-et-al-_2015_beziau-s-contributions-to_1dvehlp8g_p-490_1j20ecgjp Béziau's Contributions to the Logical Geometry of Modalities and Quantifiers, p. 490, by Smessaert, Hans; Demey, Lorenz 2015
http://purl.org/lg/diagrams/smessaert-et-al-_2015_beziau-s-contributions-to_1dvehlp8g_p-491_1j20ejk8j Béziau's Contributions to the Logical Geometry of Modalities and Quantifiers, p. 491, by Smessaert, Hans; Demey, Lorenz 2015 Octagon
http://purl.org/lg/diagrams/smessaert-et-al-_2015_beziau-s-contributions-to_1dvehlp8g_p-491_1j20ep2b9 Béziau's Contributions to the Logical Geometry of Modalities and Quantifiers, p. 491, by Smessaert, Hans; Demey, Lorenz 2015 Octagon
http://purl.org/lg/diagrams/smessaert-et-al-_2015_beziau-s-contributions-to_1dvehlp8g_p-491_1j20etvjo Béziau's Contributions to the Logical Geometry of Modalities and Quantifiers, p. 491, by Smessaert, Hans; Demey, Lorenz 2015
http://purl.org/lg/diagrams/smessaert-et-al-_2015_beziau-s-contributions-to_1dvehlp8g_p-491_1j20f1o81 Béziau's Contributions to the Logical Geometry of Modalities and Quantifiers, p. 491, by Smessaert, Hans; Demey, Lorenz 2015
http://purl.org/lg/diagrams/smessaert-et-al-_2015_beziau-s-contributions-to_1dvehlp8g_p-491_1j20fck06 Béziau's Contributions to the Logical Geometry of Modalities and Quantifiers, p. 491, by Smessaert, Hans; Demey, Lorenz 2015
http://purl.org/lg/diagrams/jaspers_2015_the-english-tenses-blanche-and-the_1dvegptur_p-323_1j2rm1o5k The English Tenses, Blanché and the Logical Kite, p. 323, by Jaspers, Dany 2015 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/jaspers_2015_the-english-tenses-blanche-and-the_1dvegptur_p-324_1j2rm8h8k The English Tenses, Blanché and the Logical Kite, p. 324, by Jaspers, Dany 2015 Pentagon
http://purl.org/lg/diagrams/jaspers_2015_the-english-tenses-blanche-and-the_1dvegptur_p-325_1j2rmcn06 The English Tenses, Blanché and the Logical Kite, p. 325, by Jaspers, Dany 2015 Hexagon
http://purl.org/lg/diagrams/jaspers_2015_the-english-tenses-blanche-and-the_1dvegptur_p-327_1j2rmiel3 The English Tenses, Blanché and the Logical Kite, p. 327, by Jaspers, Dany 2015 Hexagon
http://purl.org/lg/diagrams/jaspers_2015_the-english-tenses-blanche-and-the_1dvegptur_p-327_1j2rmp3uu The English Tenses, Blanché and the Logical Kite, p. 327, by Jaspers, Dany 2015 Hexagon
http://purl.org/lg/diagrams/jaspers_2015_the-english-tenses-blanche-and-the_1dvegptur_p-334_1j2rmtb7j The English Tenses, Blanché and the Logical Kite, p. 334, by Jaspers, Dany 2015 Hexagon
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