The tautological ring of Mg,n is rarely Gorenstein
Abstract
We prove that the tautological rings R*(Mg,n) and RH*(Mg,n) are not Gorenstein when g≥ 2 and 2g+n≥ 24, extending results of Petersen and Tommasi in genus 2. The proof uses the intersection of tautological classes with non-tautological bielliptic cycles. We conjecture the converse: the tautological rings should be Gorenstein when g=0,1 or g≥ 2 and 2g+n<24. The conjecture is known for g=0,1 by work of Keel and Petersen, and we prove several new cases of this conjecture for RH*(Mg,n) when g≥ 2.
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