Abstract
A transeunt triangle of size n consists of ( n+1)×( n+1)×( n+1) 0's and 1's whose values are determined by the sum modulo 2 of two other local values. For a given n, two transeunt triangles of size n can be combined using the element-by-element modulo 2 sum to generate a third transeunt triangle. We show that, for large n, the 1 3 2 n+1 transeunt triangles of size n can be generated from a set of only n 3 generator transeunt triangles.
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