A Finiteness Property of Torus Invariants
Abstract
In this paper the invariant subring Rn of an algebraic torus T=(C×)r acting on the multi-homogenous polynomial ring S n=d=0∞ (S(d)) n, where S(d) is the dth graded piece of the polynomial ring S=C[x1,…,xk], is studied from the viewpoint of matrices whose entries sum to zero. Using these weight matrices we prove that there exists a d1 such that for all positive integers n, the relations of the invariant subring Rn are generated in multi-homogenous degree ≤ d1. Grant: 0943832
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