Dilated floor functions having nonnegative commutator II. Negative dilations

Abstract

This paper completes the classification of the set S of all real parameter pairs (α,β) such that the dilated floor functions fα(x) = α x, fβ(x) = β x have a nonnegative commutator, i.e. [ fα, fβ](x) = α β x - β α x ≥ 0 for all real x. This paper treats the case where both dilation parameters α, β are negative. This result is equivalent to classifying all positive α, β satisfying α β x - β α x ≥ 0 for all real x. The classification analysis is connected with the theory of Beatty sequences and with the Diophantine Frobenius problem in two generators.