Resolutions of symmetric ideals via stratifications of derived categories
Abstract
We propose a method to unify various stability results about symmetric ideals in polynomial rings by stratifying related derived categories. We execute this idea for chains of GLn-equivariant modules over an infinite field k of positive characteristic. We prove the Le--Nagel--Nguyen--R\"omer conjectures for such sequences and obtain stability patterns in their resolutions as corollaries of our main result, which is a semiorthogonal decomposition for the bounded derived category of GL∞-equivariant modules over S = k[x1, x2, …, xn, …]. Our method relies on finite generation results for certain local cohomology modules. We also outline approaches (i) to investigate Koszul duality for S-modules taking the Frobenius homomorphism (of GL∞) into account, and (ii) to recover and extend Murai's results about free resolutions of symmetric monomial ideals.
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