Thin circulant matrices and lower bounds on the complexity of some Boolean operators

Abstract

We prove a lower bound (k+lk2l2N2-k+l+2kl) on the maximal possible weight of a (k,l)-free (that is, free of all-ones k× l submatrices) Boolean circulant N × N matrix. The bound is close to the known bound for the class of all (k,l)-free matrices. As a consequence, we obtain new bounds for several complexity measures of Boolean sums' systems and a lower bound (N2-6 N) on the monotone complexity of the Boolean convolution of order N.