Minimizing Monochromatic Subgraphs of Kn,n
Abstract
Given any r-edge coloring of Kn,n, how large is the maximum (over all r colors) sized monochromatic subgraph guaranteed to be? We give answers to this problem for r ≤ 8, when r is a perfect square, and when r is one less than a perfect square all up to a constant additive term that depends on r. We give a lower bound on this quantity that holds for all r and is sharp when r is a perfect square up to a constant additive term that depends on r. Finally, we give a construction for all r which provides an upper bound on this quantity up to a constant additive term that depends on r, and which we conjecture is also a lower bound.
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