Complete latin squares of order 2k

A construction for a row-complete latin square of order n, where n is any odd composite number other than 9, is given in this article. Since row-complete latin squares of order 9 and of even order have previously been constructed, this proves that row-complete latin squares of every composite order

## Abstract A Latin square is __pan‐Hamiltonian__ if the permutation which defines row __i__ relative to row __j__ consists of a single cycle for every __i__ ≠ __j__. A Latin square is __atomic__ if all of its conjugates are pan‐Hamiltonian. We give a complete enumeration of atomic squares for orde

Let N ( n ) denote the maximum number of mutually orthogonal Latin squares of order n. It is shown that N(35) 2 5.

A direct construction of six mutually orthogonal Latin squares of order 48 is given.