On Universal Cycles for Multisets

Abstract

A Universal Cycle for t-multisets of [n]=1,...,n is a cyclic sequence of n+t-1t integers from [n] with the property that each t-multiset of [n] appears exactly once consecutively in the sequence. For such a sequence to exist it is necessary that n divides n+t-1t, and it is reasonable to conjecture that this condition is sufficient for large enough n in terms of t. We prove the conjecture completely for t in 2,3 and partially for t in 4,6. These results also support a positive answer to a question of Knuth.

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