Christos Tatakis scite author profile

The universal Gröbner basis of an ideal is a Gröbner basis with respect to all term orders simultaneously. We characterize in graph theoretical terms the elements of the universal Gröbner basis of the toric ideal of a graph. We also provide a new degree bound. Finally, we give examples of graphs for which the true degrees of their circuits are less than the degrees of some elements of the Graver basis.

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On complete intersection toric ideals of graphs

Tatakis

Thoma

2012

J Algebr Comb

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We characterize the graphs G for which their toric ideals I G are complete intersections. In particular we prove that for a connected graph G such that I G is complete intersection all of its blocks are bipartite except of at most two. We prove that toric ideals of graphs which are complete intersections are circuit ideals. The generators of the toric ideal correspond to even cycles of G except of at most one generator, which corresponds to two edge disjoint odd cycles joint at a vertex or with a path. We prove that the blocks of the graph satisfy the odd cycle condition. Finally we characterize all complete intersection toric ideals of graphs which are normal.

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Minimal generators of toric ideals of graphs

Reyes¹,

Tatakis²,

Thoma³

2010

Preprint

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Graver degrees are not polynomially bounded by true circuit degrees

Tatakis¹,

Thoma

2015

Journal of Pure and Applied Algebra

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