Asymptotic v-numbers of graded (co)homology modules involving powers of an ideal
Abstract
Let R be a Noetherian N-graded ring. Let L, M and N be finitely generated graded R-modules with N ⊂eq M. For a homogeneous ideal I, and for each fixed k ∈ N, we show the asymptotic linearity of v-numbers of the graded modules ExtRk(L,InM/InN) and TorkR(L,InM/InN) as functions of n. Moreover, under some conditions on ExtRk(L,M) and TorkR(L,M) respectively, we prove similar behaviour for v-numbers of ExtRk(L,M/InN) and TorkR(L,M/InN). The last result is obtained by proving the asymptotic linearity of v-number of (U+InV)/InW, where U, V and W are graded submodules of a finitely generated graded R-module such that W ⊂eq V and (0:UI) = 0.
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