Covering Array Bounds Using Analytical Techniques

Abstract

A t-covering array with entries from the alphabet Q=\0,1,…,q-1\ is a k× n stack, so that for any choice of t (typically non-consecutive) columns, each of the qt possible t-letter words over Q appear at least once among the rows of the selected columns. We will show how a combination of the Lov\'asz local lemma; combinatorial analysis; Stirling's formula; and Calculus enables one to find better asymptotic bounds for the minimum size of t-covering arrays, notably for t = 3, 4. Here size is measured in the number of rows, as expressed in terms of the number of columns.