Permanent versus determinant: not via saturations
Abstract
Let Detn denote the closure of the GLn2(C)-orbit of the determinant polynomial detn with respect to linear substitution. The highest weights (partitions) of irreducible GLn2(C)-representations occurring in the coordinate ring of Detn form a finitely generated monoid S(Detn). We prove that the saturation of S(Detn) contains all partitions lambda with length at most n and size divisible by n. This implies that representation theoretic obstructions for the permanent versus determinant problem must be holes of the monoid S(Detn).
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