On the Gr\"obner complexity of matrices

Abstract

In this paper we show that if for an integer matrix A the universal Gr\"obner basis of the associated toric ideal A coincides with the Graver basis of A, then the Gr\"obner complexity u(A) and the Graver complexity g(A) of its higher Lawrence liftings agree, too. We conclude that for the matrices A3× 3 and A3× 4, defining the 3× 3 and 3× 4 transportation problems, we have u(A3× 3)=g(A3× 3)=9 and u(A3× 4)=g(A3× 4)≥ 27. Moreover, we prove u(Aa,b)=g(Aa,b)=2(a+b)/(a,b) for positive integers a,b and Aa,b=(smallmatrix 1 & 1 & 1 & 1 0 & a & b & a+b smallmatrix).