论文信息 - On Zero-Sum and Almost Zero-Sum Subgraphs Over $${\mathbb {Z}}$$Z

On Zero-Sum and Almost Zero-Sum Subgraphs Over $${\mathbb {Z}}$$Z

For a graph $$H$$H with at most $$n$$n vertices and a weighing of the edges of $$K_n$$Kn with integers, we seek a copy of $$H$$H in $$K_n$$Kn whose weight is minimal, possibly even zero. Of a particular interest are the cases where $$H$$H is a spanning subgraph (or an almost spanning subgraph) and the case where $$H$$H is a fixed graph. In particular, we show that relatively balanced weighings of $$K_n$$Kn with $$\{-r,\ldots ,r\}$${-r,…,r} guarantee almost zero-sum copies of spanning graphs with small maximum degree, guarantee zero-sum almost $$H$$H-factors, and guarantee zero-sum copies of certain fixed graphs.

Raphael Yuster | Yair Caro | R. Yuster | Y. Caro

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