Oct 22, 2024 · We characterizeC2.c-geometries that are truncations of almost-thinCn-geometries andC2.c-geometries covered by truncated almost-thin ...
We characterizeC2.c-geometries that are truncations of almost-thinCn-geometries andC2.c-geometries covered by truncated almost-thin buildings of typeCn.
Missing: C2. | Show results with:C2.
We characterize C2.c-geometries that are truncations of almost-thin Cn-geometries and C2.c-geometries covered by truncated almost-thin buildings of type Cn.
Feb 1, 1998 · We characterizeC2.c-geometries that are truncations of almost-thinCn-geometries andC2.c-geometries covered by truncated almost-thin buildings of typeCn.
Indeed, in. Lemma 1 of [2] it is claimed that, for a certain class of diagrams, including Cn, quotients of truncations are truncations of quotients; but this is ...
Parallelism and cubes in C2 • c-geometries (errata) · Contents. European Journal of Combinatorics. Volume 19, Issue 9 · PREVIOUS ARTICLE. Distance-regular ...
Related papers ; Parallelism and Cubes inC2.c-Geometries · European Journal of Combinatorics, 1998 ; Local parallelisms, shrinkings and geometries at infinity.
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Missing: C2. | Show results with:C2.
Feb 10, 2012 · A cube (the one with sides parallel to coordinate axes) centered at the point P=(x0,y0,z0) of "radius" r (and edge length d=2r) has vertices ...
Jun 30, 2012 · A parallelepiped is a convex three-dimensional shape with straight edges and flat faces (ie a polyhedron). The parallelepiped has six (6) faces.