On Universal Cycles for new Classes of Combinatorial Structures

Abstract

A universal cycle (u-cycle) is a compact listing of a collection of combinatorial objects. In this paper, we use natural encodings of these objects to show the existence of u-cycles for collections of subsets, matroids, restricted multisets, chains of subsets, multichains, and lattice paths. For subsets, we show that a u-cycle exists for the k-subsets of an n-set if we let k vary in a non zero length interval. We use this result to construct a "covering" of length (1+o(1))n k for all subsets of [n] of size exactly k with a specific formula for the o(1) term. We also show that u-cycles exist for all n-length words over some alphabet , which contain all characters from R ⊂ . Using this result we provide u-cycles for encodings of Sperner families of size 2 and proper chains of subsets.