Primary Decompositions of Regular Sequences
Abstract
Let R be a Noetherian ring and x1,…,xt a permutable regular sequence of elements in R. Then there exists a finite set of primes and natural number C so that for all n1,…,nt there exists a primary decomposition (x1n1,…,xtnt)=Q1 ·s Q so that Qi∈ and QiC(n1+·s + nt)⊂eq Qi for all 1≤ i≤ .
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