On Karnaugh maps and magic squares

In this paper, we collect 23 unsolved problems or conjectures on magic squares, and some updated results related to these problems are mentioned. ## 1. Preliminaries In this paper we collect 23 unsolved problems or conjectures on magic squares, which come from recent research. We shall propose the

Four theorems are given on the construction of magic squares. Theorem Iproves that substituting the number k in a N x N magic square by the kth incremental square of a m x m magic square, the resultant mN x mN square is a magic square. Theorem il shows that dividing an even rank N x N magic square i

In thejrst part of the paper, a systematic procedure for constructing high-order magic squares as an extension of the lower-order basic magic squares is developed and demonstrated. For a 2N x 2N magic square, one can start with a basic N x N magic square,