Decompositions of Chow rings of direct sums of matroids
Abstract
We prove two dual recursive decompositions as a graded CH(M) CH(N)-module of the Chow ring CH(M N) of the direct sum of matroids. We use this to obtain a decomposition of CH(M N) into irreducible CH(M) CH(N)-modules. The result implies a new recursive formula for the Eulerian numbers. Similarly, we find a recursive decomposition of the augmented Chow ring CH(M N) into CH(M) CH(N)-modules, generalizing some of the results of arXiv:2002.03341. We prove analogous decompositions of (augmented) Chow polynomials of weakly ranked posets in the sense of arXiv:2411.04070.
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