An upper bound on the first homology of spline complexes
Abstract
Let be a connected, pure 2-dimensional simplicial complex embedded in R2 and let Cr() be the homogenized spline module of with smoothness r. To study Cr(), Schenck and Stillman developed the spline complex S/J. Schenck and Stiller conjectured that the regularity of H1(S/J) is less than 2r+1. In this article, we first consider the case when has only one totally interior edge, because it is the simplest non-trivial case. Then we may apply the formula we find here to get an upper bound on some more general cases.
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