Bounds on Sweep-Covers by Raney Numbers

Abstract

In this work, we introduce a vertex separator in trees known as a sweep-cover that is defined by an ancestor-descendent relationship with all nodes in the tree. We prove the recurrence relation of sweep-covers with n subcovers P, γ(n) on a class of infinite -ary trees with constant path lengths γ between the -star internal nodes. Then, we provide recurrence relations for Raney numbers over integer compositions and show that they provide a lower-bound for sweep-covers such that P, γ(n) = ( 2 π n n + + 32en ((-1)n++1)!(n+1)! γ ).