A dichotomy theorem on the complexity of 3-uniform hypergraphic degree sequence graphicality

Abstract

We present a dichotomy theorem on the parameterized complexity of the 3-uniform hypergraphicality problem. Given 0<c1 c2 < 1, the parameterized 3-uniform Hypergraphic Degree Sequence problem, 3uni-HDSc1,c2, considers degree sequences D of length n such that all degrees are between c1 n-1 2 and c2 n-1 2 and it asks if there is a 3-uniform hypergraph with degree sequence D. We prove that for any 0<c2< 1, there exists a unique, polynomial-time computable c1* with the following properties. For any c1∈ (c1*,c2], 3uni-HDSc1,c2 can be solved in linear time. In fact, for any c1∈ (c1*,c2] there exists an easy-to-compute n0 such that any degree sequence D of length n n0 and all degrees between c1 n-1 2 and c2 n-1 2 has a 3-uniform hypergraph realization if and only if the sum of the degrees can be divided by 3. Further, n0 grows polynomially with the inverse of c1-c1*. On the other hand, we prove that for all c1<c1*, 3uni-HDSc1,c2 is NP-complete. Finally, we briefly consider an extension of the hypergraphicality problem to arbitrary t-uniformity. We show that the interval where degree sequences (satisfying divisibility conditions) always have t-uniform hypergraph realizations must become increasingly narrow, with interval width tending to 0 as t → ∞.

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