Connections Between Combinations Without Specified Separations and Strongly Restricted Permutations, Compositions, and Bit Strings

Abstract

Let Sn and Sn,k be, respectively, the number of subsets and k-subsets of Nn=\1,…,n\ such that no two subset elements differ by an element of the set Q, the largest element of which is q. We prove a bijection between such k-subsets when Q=\m,2m,…,jm\ with j,m>0 and permutations π of Nn+jm with k excedances satisfying π(i)-i∈\-m,0,jm\ for all i∈Nn+jm. We also identify a bijection between another class of restricted permutation and the cases Q=\1,q\ and derive the generating function for Sn when q=4,5,6. We give some classes of Q for which Sn is also the number of compositions of n+q into a given set of allowed parts. We also prove a bijection between k-subsets for a class of Q and the set representations of size k of equivalence classes for the occurrence of a given length-(q+1) subword within bit strings. We then formulate a straightforward procedure for obtaining the generating function for the number of such equivalence classes.