Parity of transversals of Latin squares

Abstract

We introduce a notion of parity for transversals, and use it to show that in Latin squares of order 2 4, the number of transversals is a multiple of 4. We also demonstrate a number of relationships (mostly congruences modulo 4) involving E1,…, En, where Ei is the number of diagonals of a given Latin square that contain exactly i different symbols. Let A(i j) denote the matrix obtained by deleting row i and column j from a parent matrix A. Define tij to be the number of transversals in L(i j), for some fixed Latin square L. We show that tab tcd2 for all a,b,c,d and L. Also, if L has odd order then the number of transversals of L equals tab mod 2. We conjecture that tac + tbc + tad + tbd 0 4 for all a,b,c,d. In the course of our investigations we prove several results that could be of interest in other contexts. For example, we show that the number of perfect matchings in a k-regular bipartite graph on 2n vertices is divisible by 4 when n is odd and k0 4. We also show that per\, A(a c)+ per\, A(b c)+ per\, A(a d)+ per\, A(b d) 0 4 for all a,b,c,d, when A is an integer matrix of odd order with all row and columns sums equal to k24.