"Infinite" properties of certain local cohomology modules of determinantal rings
Abstract
For given integers m,n ≥ 2 there are examples of ideals I of complete determinantal local rings (R,m), R = m+n-1, grade I = n-1, with the canonical module ωR and the property that the socle dimensions of Hm+n-2I(ωR) and Hmm(Hn-1I(ωR)) are not finite. In the case of m = n, i.e. a Gorenstein ring, the socle dimensions provide further information about the τ-numbers as studied in MS. Moreover, the endomorphism ring of Hn-1I(ωR) is studied and shown to be an R-algebra of finite type but not finitely generated as R-module generalizing an example of Sp6.
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