Q-linear dependence of certain Bessel moments

Abstract

Let I0 and K0 be modified Bessel functions of the zeroth order. We use Vanhove's differential operators for Feynman integrals to derive upper bounds for dimensions of the Q-vector space spanned by certain sequences of Bessel moments \[ \.∫0∞ [I0(t)]a[K0(t)]b t2k+1d\, t|k∈ Z≥0\,\]where a and b are fixed non-negative integers. For a∈ Z[1,b), our upper bound for the Q-linear dimension is (a+b-1)/2, which improves the Borwein-Salvy bound (a+b+1)/2. Our new upper bound (a+b-1)/2 is not sharp for a=2,b=6, due to an exceptional Q-linear relation ∫0∞ [I0(t)]2[K0(t)]6 td\, t=72∫0∞ [I0(t)]2[K0(t)]6 t3d\, t, which is provable by integrating modular forms.