Markov complexity of monomial curves
Abstract
Let A=\ a1,…, an\⊂Nm. We give an algebraic characterization of the universal Markov basis of the toric ideal IA. We show that the Markov complexity of A=\n1,n2,n3\ is equal to two if IA is complete intersection and equal to three otherwise, answering a question posed by Santos and Sturmfels. We prove that for any r≥ 2 there is a unique minimal Markov basis of A(r). Moreover, we prove that for any integer l there exist integers n1,n2,n3 such that the Graver complexity of A is greater than l.
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