Alexander duality for the alternative polarizations of strongly stable ideals

Abstract

We will define the Alexander duality for strongly stable ideals. More precisely, for a strongly stable ideal I ⊂ [x1, …, xn] with deg(m) d for all m ∈ G(I), its dual I* ⊂ [y1, …, yd] is a strongly stable ideal with deg(m) n for all m ∈ G(I*). This duality has been constructed by Fl et al. in a different manner, so we emphasis applications here. For example, we will describe the Hilbert serieses of the local cohomologies Hmi(S/I) using the irreducible decomposition of I (through the Betti numbers of I*).