The 1/2-Conjecture for q-Binomial Coefficients with Fractional Index

Abstract

For a nonnegative integer k and a rational number r∈Q+, we define the generalized Gaussian binomial coefficient r+kk = (qr+1; q)k(q; q)k. When r=a/b with a,b coprime positive integers and b≥ 2, expanding r+kk via the finite q-binomial theorem produces fractional powers of q, so that r+kk is a Puiseux series in q with nonnegative exponents; concretely it lies in Q[[q1/b]]. The notion we single out is the integer trace of this expansion, the subseries consisting of those terms cr(d)\,qd whose exponent d is an integer, with all fractional powers discarded. This projection is not standard, and there is no a~priori reason for the surviving coefficients to behave coherently as r varies. Nonetheless, ordering the family by the coefficientwise partial order leads to the 12-Conjecture: among all r∈Q+, the value r=12 maximizes the integer trace, in the sense that the coefficients of 1/2+kk dominate those of r+kk coefficientwise for every r. That so elementary a definition should single out 12 this cleanly came as a surprise to us. We prove the conjecture in several special cases and provide further computational evidence.