Discrepancy of Symmetric Products of Hypergraphs
Abstract
For a hypergraph H = (V, E), its d--fold symmetric product is d H = (Vd,\Ed |E ∈ E\). We give several upper and lower bounds for the c-color discrepancy of such products. In particular, we show that the bound disc(d H,2) disc( H,2) proven for all d in [B. Doerr, A. Srivastav, and P. Wehr, Discrepancy of Cartesian products of arithmetic progressions, Electron. J. Combin. 11(2004), Research Paper 5, 16 pp.] cannot be extended to more than c = 2 colors. In fact, for any c and d such that c does not divide d!, there are hypergraphs having arbitrary large discrepancy and disc(d H,c) = d(disc( H,c)d). Apart from constant factors (depending on c and d), in these cases the symmetric product behaves no better than the general direct product Hd, which satisfies disc( Hd,c) = Oc,d(disc( H,c)d).
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