Combinatorial Seshadri stratifications on normal toric varieties
Abstract
We apply the theory of Seshadri stratifications to embedded toric varieties XP⊂eq P(V) associated with a normal lattice polytope P. The approach presented here is purely combinatorial and completely independent of CFL. In particular, we get a close connection between a certain class of triangulations of the polytope P, Seshadri stratifications of XP arising from torus orbit closures, and the associated degenerate semi-toric varieties. In the last section we show that the approach here and the one in CFL produce the same quasi-valuations and hence the same degenerations of XP.
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