On convertible (0,1) matrices

A square matrix A with per A≠0 is called convertible if there exists a (1, -1) matrix H such that per A=det(H o A) where H o A denote the Hadamard product of H and A In this paper, an upper bound of permanents of maximal convertible (0,1) matrices A with π(A)≥4(n-1) is obtained.