Euclid meets Popeye: The Euclidean Algorithm for 2× 2 matrices
Abstract
An analogue of the Euclidean algorithm for square matrices of size 2 with integral non-negative entries and strictly positive determinant n defines a finite set R(n) of Euclid-reduced matrices corresponding to elements of \(a, b, c, d) ∈ N4 | n = ab - cd,\ 0 c, d < a, b\. With Popeye's help[2] on the use of sails of lattices we show that R(n) contains Σd|n, d2 n (d + 1 - n/d) elements.
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