Abstract
We are interested in a notion of elementary change between triangulations of a point configuration, the so-called bistellar flips , introduced by Gel'fand, Kapranov, and Zelevinski. We construct sequences of triangulations of point configurations in dimension 3 with n 2 +2n+2 vertices and only 4n-3 geometric bistellar flips (for every even integer n ), and of point configurations in dimension 4 with arbitrarily many vertices and a bounded number of flips. This drastically improves previous examples and seems to be evidence against the conjecture that any two triangulations of a point configuration can be joined by a sequence of flips.
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