Symbolic powers of the generic linkage of maximal minors
Abstract
Let I be the ideal generated by the maximal minors of a matrix of indeterminates over a field and let J denote the generic link, i.e., the most general link, of I. The generators of the ideal J are not known. We provide an explicit description of the lead terms of the generators of J using Gr\"obner degeneration. Indeed, we construct a degeneration which preserves the entire graded Betti table of J on passing to the initial ideal. We leverage this construction to establish the equality of the symbolic and ordinary powers of J. Our analysis of the initial ideal readily yields the Gorenstein property of the associated graded ring of J, and, in positive characteristic, the F-rationality of the Rees algebra of J. Using the technique of F-split filtrations, we further obtain the F-regularity of the blowup algebras of J.
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