Improved Encoding and Counting of Uniform Hypertrees
Abstract
We consider labeled r-uniform hypertrees having n r 2 vertices. The number of hyperedges in such a hypertree is m = (n - 1)/(r - 1). We show that there are exactly f(n, r) = (n-1)! nm-1(r-1)!m m! r-uniform hypertrees with n vertices labeled with distinct integers. We also give an encoding scheme that encodes such hypertrees using, on an average, at most 1 + 2 e bits more than 2(f(n, r)).
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