Magic squares with all subsquares of possible orders based on extended Langford sequences

Abstract

A magic square of order n with all subsquares of possible orders (ASMS(n)) is a magic square which contains a general magic square of each order k∈\3, 4, ·s, n-2\. Since the conjecture on the existence of an ASMS was proposed in 1994, much attention has been paid but very little is known except for few sporadic examples. A k-extended Langford sequence of defect d and length m is equivalent to a partition of \1,2,·s,2m+1\\k\ into differences \d,·s,d+m-1\. In this paper, a construction of ASMS based on extended Langford sequence is established. As a result, it is shown that there exists an ASMS(n) for n318, which gives a partial answer to Abe's conjecture on ASMS.