Arithmetic on q-deformed rational numbers

Abstract

Recently, Morier-Genoud and Ovsienko introduced a q-deformation of rational numbers. More precisely, for an irreducible fraction rs>0, they constructed coprime polynomials Rrs(q),~ Srs(q) ∈ Z[q] with Rrs(1)=r,~Srs(1)=s. Their theory has a rich background and many applications. By definition, if r r' s, then Srs(q)=Sr's(q). We show that rr' -1 s implies Srs(q)=Sr's(q), and it is conjectured that the converse holds if s is prime (and r r' s). We also show that s is a multiple of 3 (resp. 4) if and only if Srs(ζ)=0 for ζ=(-1+-3)/2 (resp. ζ=i). We give applications to the representation theory of quivers of type A and the Jones polynomials of rational links.