Mareike Fischer*
Latin squares are fascinating algebraic structures that have found applications across various fields including combinatorics, cryptography, experimental design, and even Sudoku puzzles. In this article, we will delve into the depths of Latin squares, exploring their definition, properties, construction methods, and diverse applications. One fundamental property of Latin squares is that they are closed under row and column permutations. That is, if we permute the rows or columns of a Latin square, the resulting array is still a Latin square. This property forms the basis for many constructions and manipulations of Latin squares.
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