On the Gauss algebra of toric algebras
Abstract
Let A be a K-subalgebra of the polynomial ring S=K[x1,…,xd] of dimension d, generated by finitely many monomials of degree r. Then the Gauss algebra (A) of A is generated by monomials of degree (r-1)d in S. We describe the generators and the structure of (A), when A is a Borel fixed algebra, a squarefree Veronese algebra, generated in degree 2, or the edge ring of a bipartite graph with at least one loop. For a bipartite graph G with one loop, the embedding dimension of (A) is bounded by the complexity of the graph G.
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