Cut-and-paste of quadriculated disks and arithmetic properties of the adjacency matrix

Abstract

We define cut-and-paste, a construction which, given a quadriculated disk obtains a disjoint union of quadriculated disks of smaller total area. We provide two examples of the use of this procedure as a recursive step. Tilings of a disk receive a parity: we construct a perfect or near-perfect matching of tilings of opposite parities. Let B be the black-to-white adjacency matrix: we factor B = L DU, where L and U are lower and upper triangular matrices, D is obtained from a larger identity matrix by removing rows and columns and all entries of L, D and U are equal to 0, 1 or -1.