Abstract:
A triangulation of a circle bundle $E \xrightarrow{\pi} B$
is a triangulation of the total space $E$ and the base $B$
such that the projection $\pi$ is a simplicial map.
In the paper, we address the following questions. Which circle
bundles can be triangulated over a given triangulation of the base?
What are the minimal triangulations of a bundle?
A complete solution for semisimplicial triangulations was given
by N. Mnëv. Our results deal with classical triangulations,
i.e., simplicial complexes. We give an exact answer for an infinite
family of triangulated spheres (including the boundary of the $3$-simplex,
the boundary of the octahedron, the suspension over an $n$-gon,
the icosahedron). For the general case, we present a sufficient condition
for the existence of a triangulation. Some minimality results
follow straightforwadly.
Keywords:simplicial complex, Euler class, local combinatorial formula.
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