Reconstruction of complete interval tournaments

Abstract

Let a, b and n be nonnegative integers (b ≥ a, \ b > 0, \ n ≥ 1), Gn(a,b) be a multigraph on n vertices in which any pair of vertices is connected with at least a and at most b edges and v = (v1, v2, ..., vn) be a vector containing n nonnegative integers. We give a necessary and sufficient condition for the existence of such orientation of the edges of Gn(a,b), that the resulted out-degree vector equals to v. We describe a reconstruction algorithm. In worst case checking of v requires (n) time and the reconstruction algorithm works in O(bn3) time. Theorems of H. G. Landau (1953) and J. W. Moon (1963) on the score sequences of tournaments are special cases b = a = 1 resp. b = a ≥ 1 of our result.