Proper Lie automorphisms of incidence algebras
Abstract
Let X be a finite connected poset and K a field. We study the question, when all Lie automorphisms of the incidence algebra I(X,K) are proper. Without any restriction on the length of X we find only a sufficient condition involving certain equivalence relation on the set of maximal chains of X. For some classes of posets of length one, such as finite connected crownless posets (i.e., without weak crown subposets), crowns and ordinal sums of two antichains we give a complete answer.
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