Hexadecachoric tetracomb pentacomb

The hexadecachoric tetracomb pentacomb is a paracompact regular tiling of 5D hyperbolic space. It is paracompact because it has infinite Euclidean vertex figures, with all vertices as ideal points. 3 hexadecachoric tetracombs meet at each cell, and infinitely many meet at each vertex, forming an icositetrachoric tetracomb as the vertex figure. It is self-dual.

Representations
A hexadecachoric tetracomb pentacomb has the following Coxeter diagrams:


 * x3o3o4o3o3o (full symmetry)
 * x3o3o *b3o4o3o (rectified hexadecachoric tetracomb verf)
 * o4o3o3o4o *b3x (birectified tesseractic tetracomb vef)
 * x3o3o *b3o *b3o4o (rectified demitesseractic tetracomb verf)
 * x3o3o *b3o *b3o *b3o (rectified quartertesseractic tetracomb verf)