Relating multiway discrepancy and singular values of graphs and contingency tables

Abstract

The k-way discrepancy k () of a rectangular array of nonnegative entries is the minimum of the maxima of the within- and between-cluster discrepancies that can be obtained by simultaneous k-clusterings (proper partitions) of its rows and columns. In the main theorem, irrespective of the size of , we give the following estimate for the kth largest non-trivial singular value of the normalized table: sk 9k ( ) (k+2 -9k k ( )), provided k ( ) <1 and k ( ). This statement is the converse of Theorem 7 of Bolla Bolla14, and the proof uses some lemmas and ideas of Butler Butler, where only the k=1 case is treated, in which case our upper bound is the tighter. The result naturally extends to the singular values of the normalized adjacency matrix of a weighted undirected or directed graph.