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Leonardi.DB
a logical geometry project

Diagrams (3729 to 3753 of 5537)

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Diagram Source Date
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Aristotelian Family
 		B.C.
(min⁠–⁠max)
Geometric Shape
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-404_1eimmuo8n Was Lewis Carroll an Amazing Oppositional Geometer?, p. 404, by Moretti, Alessio 2014 Jacoby-Sesmat-Blanché Sigma-3 3–4 Hexagon
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-404_1eimn3ueu Was Lewis Carroll an Amazing Oppositional Geometer?, p. 404, by Moretti, Alessio 2014 Classical Sigma-7 4–5 Tetrahedron
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-404_1eimn7jjt Was Lewis Carroll an Amazing Oppositional Geometer?, p. 404, by Moretti, Alessio 2014 Classical Sigma-7 4–5 Rhombic Dodecahedron
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-398_1eimnb6ng Was Lewis Carroll an Amazing Oppositional Geometer?, p. 398, by Moretti, Alessio 2014 Classical Sigma-7 4 Tetrahedron
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-398_1eimngivl Was Lewis Carroll an Amazing Oppositional Geometer?, p. 398, by Moretti, Alessio 2014 Classical Sigma-7 4 Cube
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-398_1eimnl95m Was Lewis Carroll an Amazing Oppositional Geometer?, p. 398, by Moretti, Alessio 2014 Classical Sigma-7 4 Rhombic Dodecahedron
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-398_1eimno5ba Was Lewis Carroll an Amazing Oppositional Geometer?, p. 398, by Moretti, Alessio 2014 Classical Sigma-7 4 Rhombic Dodecahedron
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-393_1eimnse5u Was Lewis Carroll an Amazing Oppositional Geometer?, p. 393, by Moretti, Alessio 2014 Subcontrariety 4-clique 4 Triangle
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-393_1eimo01vk Was Lewis Carroll an Amazing Oppositional Geometer?, p. 393, by Moretti, Alessio 2014 Subcontrariety 4-clique 4 Triangle
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-393_1eimo3l3a Was Lewis Carroll an Amazing Oppositional Geometer?, p. 393, by Moretti, Alessio 2014 Subcontrariety 4-clique 4 Tetrahedron
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-395_1eimo6lmk Was Lewis Carroll an Amazing Oppositional Geometer?, p. 395, by Moretti, Alessio 2014 Classical Sigma-7 4–5 Tetrahedron
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-395_1eimoac6u Was Lewis Carroll an Amazing Oppositional Geometer?, p. 395, by Moretti, Alessio 2014 Classical Sigma-7 4–5 Tetrahedron
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-395_1eimodbum Was Lewis Carroll an Amazing Oppositional Geometer?, p. 395, by Moretti, Alessio 2014 Contrariety 4-clique 4–5 Tetrahedron
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-395_1eimoi58s Was Lewis Carroll an Amazing Oppositional Geometer?, p. 395, by Moretti, Alessio 2014 Subcontrariety 4-clique 4–5 Tetrahedron
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-392_1eimoo6fv Was Lewis Carroll an Amazing Oppositional Geometer?, p. 392, by Moretti, Alessio 2014 Classical Sigma-2 3 Trapezoid
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-392_1eimos4fu Was Lewis Carroll an Amazing Oppositional Geometer?, p. 392, by Moretti, Alessio 2014 Classical Sigma-2 3 Trapezoid
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-392_1eimov83j Was Lewis Carroll an Amazing Oppositional Geometer?, p. 392, by Moretti, Alessio 2014 Classical Sigma-2 3 Square
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-392_1eimp3t6l Was Lewis Carroll an Amazing Oppositional Geometer?, p. 392, by Moretti, Alessio 2014 Degenerate Sigma-2 with Unconnectedness 4 4 Trapezoid
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-392_1eimp92s7 Was Lewis Carroll an Amazing Oppositional Geometer?, p. 392, by Moretti, Alessio 2014 Degenerate Sigma-2 with Unconnectedness 4 4 Trapezoid
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-392_1eimpbo12 Was Lewis Carroll an Amazing Oppositional Geometer?, p. 392, by Moretti, Alessio 2014 Degenerate Sigma-2 with Unconnectedness 4 4 Square
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-391_1eimpgi1h Was Lewis Carroll an Amazing Oppositional Geometer?, p. 391, by Moretti, Alessio 2014 Classical Sigma-7 4 Triangle
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-391_1eimpkl91 Was Lewis Carroll an Amazing Oppositional Geometer?, p. 391, by Moretti, Alessio 2014 Classical Sigma-7 4 Triangle
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-388_1eimpq02i Was Lewis Carroll an Amazing Oppositional Geometer?, p. 388, by Moretti, Alessio 2014 Classical Sigma-7 4 Triangle
http://purl.org/lg/diagrams/moretti_2014_was-lewis-carroll-an-amazing_1dnb55618_p-388_1eimpuhmj Was Lewis Carroll an Amazing Oppositional Geometer?, p. 388, by Moretti, Alessio 2014 Classical Sigma-7 4 Triangle
http://purl.org/lg/diagrams/ciucci-et-al-_2014_the-structure-of-oppositions-in_1e4993f1e_p-156_1epl6uj9d The Structure of Oppositions in Rough Set Theory and Formal Concept Analysis - Toward a New Bridge between the Two Settings, p. 156, by Ciucci, Davide; Dubois, Didier; Prade, Henri 2014 Classical Sigma-2 3 Rectangle
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