Algebraic and analytic structure of Morikawa's sangaku problem

Abstract

Let μ(r) denote the minimal side length of a square inscribed in the curvilinear triangular region formed by two tangent circles of radii 1 and r 1 together with their common tangent line. The problem of finding a closed-form expression for μ(r) was posed in early nineteenth-century Japan by Morikawa. It was proved by Holly and Krumm (2021) that no expression in radicals exists for μ(r). In this article we show that μ is an algebraic function, and consequently real-analytic on [1,∞) outside a finite explicitly computable set. In particular, although no expression in radicals exists, the function admits convergent Taylor expansions at all non-exceptional values of r, whose coefficients may be computed by Newton iteration from the defining algebraic equation. We illustrate the method by explicitly computing the Taylor expansion of μ(r) centered at r=1.