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Abstract Working in a polynomial ring , where is an arbitrary commutative ring with 1, we consider the th Veronese subalgebras , as well as natural ‐submodules inside . We develop and use characteristic‐free theory of Schur functors associated to ribbon skew diagrams as a tool to construct simple ‐equivariant minimal free ‐resolutions for the quotient ring and for these modules . These also lead to elegant descriptions of for all and for any pair of these modules .
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"Perlman, Michael"
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Huang, Hang; Perlman, Michael; Polini, Claudia; Raicu, Claudiu; Sammartano, Alessio (, Advances in Mathematics)null (Ed.)
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Perlman, Michael; Raicu, Claudiu (, Selecta Mathematica)null (Ed.)
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Brown, Michael; Huang, Hang; Laudone, Robert; Perlman, Michael; Raicu, Claudiu; Sam, Steven; Santos, João (, Journal of Software for Algebra and Geometry)
