A short proof of a result of Katz and West
Abstract
We give a short proof of a result due to Katz and West: Let R be a Noetherian ring and I1,…,It ideals of R. Let M and N be finitely generated R-modules and N' ⊂eq N a submodule. For every fixed i 0, the sets AssR( ExtRi(M, N/I1n1·s Itnt N') ) and AssR( ToriR(M, N/I1n1·s Itnt N') ) are independent of (n1,…,nt) for all sufficiently large n1,…,nt.
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