Toward the theory on local cohomologies at the ideals given by simplicial posets

Abstract

For a simplicial poset P, Stanley assigned the face ring AP, which is the quotient of the polynomial ring S:=K[tx x ∈ P \0 \] by the ideal IP. This is a generalization of Stanley-Reisner rings, but S and AP are not standard graded in this case, and IP is not a monomial ideal. To establish the foundation of the theory on local cohomology HIpi(S) and its injective resolution, we give an explicit description of the graded injective envelope *\! ES(S/px), where pxis the prime ideal associated with x ∈ P, and analyze their behavior in the graded dualizing complex.

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