On the analytic spread and the reduction number of the ideal of maximal minors
Abstract
Let m, n, a1, ..., ar, b1, ..., br be integers with 1≤ a1<...<ar≤ m and 1≤ b1<...<br≤ n. And let x be the universal m× n matrix with the property that i-minors of first ai-1 rows and first bi-1 columns are all zero, for i=1, ..., r+1 (ar+1=m+1 and br+1=n+1). For an integer u with 1≤ u≤ m, we denote by U the u× n matrix consisting of the first u rows of x. In this paper, we consider the analytic spread and the reduction number of the ideal of maximal minors of U
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