Fundamental domain for the Markoff-Hurwitz equation

Abstract

For integers a≠0, k, and n≥3, we consider the Markoff-Hurwitz equation given by x11+·s+xn2-ax1·s xn=k. By defining graphs associated with a height function and by using their properties, we find an exact fundamental domain for a symmetric group generated by involution maps sending (x1,…,xn) to (x1,…,ax1·s xi-1xi+1·s xn-xi,…,xn), permutations, and double sign changes on the set of integral solutions for the Markoff-Hurwitz equation.

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