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Leonardi.DB
a logical geometry project

Diagrams (4325 to 4349 of 5537)

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http://purl.org/lg/diagrams/garcia-cruz_2017_from-the-square-to-octahedra_1dvi37imm_p-264_1g7clmi45 From the Square to Octahedra, p. 264, by García-Cruz, José David 2017 Classical Sigma-2 3 Rectangle
http://purl.org/lg/diagrams/garcia-cruz_2017_from-the-square-to-octahedra_1dvi37imm_p-264_1g7clpq67 From the Square to Octahedra, p. 264, by García-Cruz, José David 2017 Jacoby-Sesmat-Blanché Sigma-3 4 Hexagon
http://purl.org/lg/diagrams/schang_2017_an-arithmetization-of-logical_1dvi328js_p-232_1g7f0t541 An Arithmetization of Logical Oppositions, p. 232, by Schang, Fabien 2017 Classical Sigma-2 3 Square
http://purl.org/lg/diagrams/schang_2017_an-arithmetization-of-logical_1dvi328js_p-232_1g7f11kgr An Arithmetization of Logical Oppositions, p. 232, by Schang, Fabien 2017 Non-Sigma 3 Triangle
http://purl.org/lg/diagrams/schang_2017_an-arithmetization-of-logical_1dvi328js_p-232_1g7f15176 An Arithmetization of Logical Oppositions, p. 232, by Schang, Fabien 2017 Non-Sigma 3 Triangle
http://purl.org/lg/diagrams/garcia-cruz_2017_from-the-square-to-octahedra_1dvi37imm_p-265_1g7f1e2sq From the Square to Octahedra, p. 265, by García-Cruz, José David 2017 Moretti-Pellissier Sigma-4 4 Hexagonal Bipyramid
http://purl.org/lg/diagrams/garcia-cruz_2017_from-the-square-to-octahedra_1dvi37imm_p-268_1g7f1k1v9 From the Square to Octahedra, p. 268, by García-Cruz, José David 2017 Classical Sigma-2 3 Square
http://purl.org/lg/diagrams/garcia-cruz_2017_from-the-square-to-octahedra_1dvi37imm_p-268_1g7f1nnf4 From the Square to Octahedra, p. 268, by García-Cruz, José David 2017 Classical Sigma-2 3 Square
http://purl.org/lg/diagrams/garcia-cruz_2017_from-the-square-to-octahedra_1dvi37imm_p-269_1g7f20t0a From the Square to Octahedra, p. 269, by García-Cruz, José David 2017 Keynes-Johnson Sigma-4 7 Hexagonal Bipyramid
http://purl.org/lg/diagrams/garcia-cruz_2017_from-the-square-to-octahedra_1dvi37imm_p-270_1g7f2aue2 From the Square to Octahedra, p. 270, by García-Cruz, José David 2017 Moretti-Pellissier Sigma-4 4 Cube
http://purl.org/lg/diagrams/garcia-cruz_2017_from-the-square-to-octahedra_1dvi37imm_p-270_1g7f2f7ca From the Square to Octahedra, p. 270, by García-Cruz, José David 2017 Moretti-Pellissier Sigma-4 4 Octagon
http://purl.org/lg/diagrams/garcia-cruz_2017_from-the-square-to-octahedra_1dvi37imm_p-271_1g7f2lps3 From the Square to Octahedra, p. 271, by García-Cruz, José David 2017 Keynes-Johnson Sigma-4 7 Octagon
http://purl.org/lg/diagrams/cavaliere_2017_iconic-and-dynamic-models-to_1dvi3a0f7_p-274_1g7f3fct8 Iconic and Dynamic Models to Represent "Distinctive" Predicates: The Octagonal Prism and the Complex Tetrahedron of Opposition, p. 274, by Cavaliere, Ferdinando 2017 Jacoby-Sesmat-Blanché Sigma-3 3 Hexagon
http://purl.org/lg/diagrams/cavaliere_2017_iconic-and-dynamic-models-to_1dvi3a0f7_p-274_1g7f3mnvs Iconic and Dynamic Models to Represent "Distinctive" Predicates: The Octagonal Prism and the Complex Tetrahedron of Opposition, p. 274, by Cavaliere, Ferdinando 2017 Jacoby-Sesmat-Blanché Sigma-3 3 Hexagon
http://purl.org/lg/diagrams/cavaliere_2017_iconic-and-dynamic-models-to_1dvi3a0f7_p-274_1g7f3rmpe Iconic and Dynamic Models to Represent "Distinctive" Predicates: The Octagonal Prism and the Complex Tetrahedron of Opposition, p. 274, by Cavaliere, Ferdinando 2017 Jacoby-Sesmat-Blanché Sigma-3 3 Triangular Prism
http://purl.org/lg/diagrams/cavaliere_2017_iconic-and-dynamic-models-to_1dvi3a0f7_p-275_1g7f8n06d Iconic and Dynamic Models to Represent "Distinctive" Predicates: The Octagonal Prism and the Complex Tetrahedron of Opposition, p. 275, by Cavaliere, Ferdinando 2017
http://purl.org/lg/diagrams/cavaliere_2017_iconic-and-dynamic-models-to_1dvi3a0f7_p-276_1g7f8tr07 Iconic and Dynamic Models to Represent "Distinctive" Predicates: The Octagonal Prism and the Complex Tetrahedron of Opposition, p. 276, by Cavaliere, Ferdinando 2017
http://purl.org/lg/diagrams/cavaliere_2017_iconic-and-dynamic-models-to_1dvi3a0f7_p-277_1g7f96r85 Iconic and Dynamic Models to Represent "Distinctive" Predicates: The Octagonal Prism and the Complex Tetrahedron of Opposition, p. 277, by Cavaliere, Ferdinando 2017
http://purl.org/lg/diagrams/cavaliere_2017_iconic-and-dynamic-models-to_1dvi3a0f7_p-278_1g7f9cc42 Iconic and Dynamic Models to Represent "Distinctive" Predicates: The Octagonal Prism and the Complex Tetrahedron of Opposition, p. 278, by Cavaliere, Ferdinando 2017
http://purl.org/lg/diagrams/cavaliere_2017_iconic-and-dynamic-models-to_1dvi3a0f7_p-283_1g7f9rcnk Iconic and Dynamic Models to Represent "Distinctive" Predicates: The Octagonal Prism and the Complex Tetrahedron of Opposition, p. 283, by Cavaliere, Ferdinando 2017 Tetrahedron
http://purl.org/lg/diagrams/cavaliere_2017_iconic-and-dynamic-models-to_1dvi3a0f7_p-283_1g7fa3nu3 Iconic and Dynamic Models to Represent "Distinctive" Predicates: The Octagonal Prism and the Complex Tetrahedron of Opposition, p. 283, by Cavaliere, Ferdinando 2017 Tetrahedron
http://purl.org/lg/diagrams/cavaliere_2017_iconic-and-dynamic-models-to_1dvi3a0f7_p-283_1g7h2bl46 Iconic and Dynamic Models to Represent "Distinctive" Predicates: The Octagonal Prism and the Complex Tetrahedron of Opposition, p. 283, by Cavaliere, Ferdinando 2017
http://purl.org/lg/diagrams/cavaliere_2017_iconic-and-dynamic-models-to_1dvi3a0f7_p-283_1g7h2fqtr Iconic and Dynamic Models to Represent "Distinctive" Predicates: The Octagonal Prism and the Complex Tetrahedron of Opposition, p. 283, by Cavaliere, Ferdinando 2017 Cube
http://purl.org/lg/diagrams/cavaliere_2017_iconic-and-dynamic-models-to_1dvi3a0f7_p-283_1g7h2jq7a Iconic and Dynamic Models to Represent "Distinctive" Predicates: The Octagonal Prism and the Complex Tetrahedron of Opposition, p. 283, by Cavaliere, Ferdinando 2017
http://purl.org/lg/diagrams/cavaliere_2017_iconic-and-dynamic-models-to_1dvi3a0f7_p-285_1g7h2rd4v Iconic and Dynamic Models to Represent "Distinctive" Predicates: The Octagonal Prism and the Complex Tetrahedron of Opposition, p. 285, by Cavaliere, Ferdinando 2017
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