Precise Asymptotics and Exact Formulas for Tensor Product Energies of Fibonacci Lattices

Abstract

We consider the asymptotics of sums of the form 1Fnσ Σm = 1Fn-1 f(m/Fn)|(πm/Fn)|σ f(Fn-1m/Fn)|(πFn-1m/Fn)|σ where (Fn)n ∈ N = (1, 1, 2, 3, 5, 8, 13, …) are the Fibonacci numbers. Such sums appear, for example, in the context of discrepancy theory and numerical integration methods reformulated as energy minimization problems. We show that for parameters σ> 1 and a large class of functions f the above sum behaves asymptotically like C n + D + O((1-)n) for some constants C and D. These constants can be given via infinite series connected to the Dedekind zeta function over the algebraic number field Q(5). In special cases we even observe simple closed-form expressions for such sums as above, explicitly proving that Σm=1Fn-1 1(πm/Fn)2 1(πFn-1 m/Fn)2 = 4n75 F2n - 17225Fn2 - (-1)n 215 - 19.