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Let G be a simple graph on the vertex set \v₁, , v₍\. An algebraic object attached to G is the toric ideal IG. We say that IG is splittable if there exist subgraphs G₁ and G₂ of G such that IG=I₆䃑+I₆䃒, where both I₆䃑 and I₆䃒 are not equal to IG. We show that IG is splittable if and only if it is edge splittable. We also prove that the toric ideal of a complete bipartite graph is not splittable. In contrast, we show that the toric ideal of a complete graph Kₙ is always splittable when n 4. Additionally, we show that the toric ideal of Kₙ has a minimal splitting if and only if 4 n 5. Finally, we prove that any minimal splitting of IG is also a reduced splitting.
Katsabekis et al. (Thu,) studied this question.
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