Combinations without specified separations

Abstract

We consider the restricted subsets of Nn=\1,2,…,n\ with q≥1 being the largest member of the set Q of disallowed differences between subset elements. We obtain new results on various classes of problem involving such combinations lacking specified separations. In particular, we find recursion relations for the number of k-subsets for any Q when |Nq-Q|≤2. The results are obtained, in a quick and intuitive manner, as a consequence of a bijection we give between such subsets and the restricted-overlap tilings of an (n+q)-board (a linear array of n+q square cells of unit width) with squares (1×1 tiles) and combs. A (w1,g1,w2,g2,…,gt-1,wt)-comb is composed of t sub-tiles known as teeth. The i-th tooth in the comb has width wi and is separated from the (i+1)-th tooth by a gap of width gi. Here we only consider combs with wi,gi∈Z+. When performing a restricted-overlap tiling of a board with such combs and squares, the leftmost cell of a tile must be placed in an empty cell whereas the remaining cells in the tile are permitted to overlap other non-leftmost filled cells of tiles already on the board.