The ratio spectrum of Lagrange constants under linear fractional transformations

Abstract

In this note we solve a problem posed by Lagarias and Shallit concerning Lagrange constants under linear fractional transformations Mx=ax+bcx+d. For an integer matrix M with nonzero determinant and relatively prime entries, define the ratio spectrum equation* V(M)=\k(Mx)k(x):x∈Bad\, equation* where k(x) denotes the Lagrange constant of the irrational number x and Bad is the set of badly approximable numbers. Lagarias and Shallit proved that equation* V(M)⊂eq[1| M|,| M|], equation* and asked for the determination of V(M). We prove that equation* V(M)=[1| M|,| M|]. equation*