Let G be a bipartite graph, with k | e(G). The zero-sum bipartite Ramsey number B(G,Zk) is the smallest integer t such that in every Zk-coloring of the edges of Kt,t, there is a zero-sum mod k copy of G in Kt,t. In this paper we give the first proof which determines B(G,Z2) for all possible bipartite graphs G. In fact, we prove a much more general result from which B(G,Z2) can be deduced: Let G be a (not necessarily connected) bipartite graph, which can be embedded in Kn,n, and let F be a field. A function f : E(Kn,n)→ F is called G-stable if every copy of G in Kn,n has the same weight (the weight of a copy is the sum of the values of f on its edges). The set of all G-stable functions, denoted by U(G,Kn,n, F ) is a linear space which is called the Kn,n uniformity space of G over F . We determine U(G,Kn,n, F ) and its dimension, for all G, n and F . Utilizing this result in the case F = Z2, we can compute B(G,Z2), for all bipartite graphs G.
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