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Since the 1950's, polyominoes (that is, shapes consisting of edge-connected unit squares) have gained significant interest both as objects of combinatorial study and as classics of recreational mathematics. There is a very natural collection of such shapes, namely the 11 distinct polyhedral nets of the unit cube. An interesting question is: how tightly can the nets fit together? It is equivalent to search for the smallest perimeter a shape built of them can have. In this article, we provide the exact lower bound as an invitation to study analogous problems for different families of polyominoes.
Piotr Pikul (Thu,) studied this question.
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