Bass numbers of local cohomology modules with respect a pair of ideals

Abstract

Let R be a Noetherian local ring, I and J two ideals of R, M an R-module and s and t two integers. We study the relationship between the Bass numbers of M and HiI,J(M). We show that μt(M)≤Σi=0tμt-i(HiI,J(M)) and μs(HtI,J(M))≤ Σi=0t-1μs+t+1-i(HiI,J(M))+μs+t(M)+Σi=t+1s+t-1μs+t-1-i(HiI,J(M)). As a consequence, it follows that if I is a principal ideal of R and M is a minimax R-module, then μj(HiI,J(M)) is finite for all i∈ N0 and all j∈ N0.