非奇异正则幻方的推广

IF 0.4 Q4 MATHEMATICS Matematicki Vesnik Pub Date : 2022-12-01 DOI:10.57016/mv-aqsi1967

Phichet Jitjankarn, T. Rungratgasame

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引用次数: 0

摘要

用魔术和$\mu$概括规则魔术正方形是一个方角(或方角)魔术正方形。它是一个神奇的正方形，满足4个元素的和，相对于中心对称的正方形，等于$\frac{4\mu}{n}$。利用阶为$n$的方角幻方，导出了阶为{$n+2$}的方角幻方的构造。此外，这种构造还提供了一些非奇异的所有阶的经典方角幻方。特别地，该方法还可以构造任意奇阶的非奇异正则幻方。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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A GENERALIZATION OF NONSINGULAR REGULAR MAGIC SQUARES

A generalization of regular magic squares with magic sum $\mu$ is an sq-corner (or square corner) magic square. It is a magic square satisfying the condition that the sum of 4 entries, square symmetrically placed with respect to the center, equals $\frac{4\mu}{n}$. Using the sq-corner magic squares of order $n$, a construction of sq-corner magic squares of order {$n+2$} is derived. Moreover, this construction provides some nonsingular classical sq-corner magic squares of all orders. In particular, a nonsingular regular magic square of any odd order can be constructed under this new method, as well.

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