Multifractality and intermittency in the limit evolution of polygonal vortex filaments

Abstract

With the aim of quantifying turbulent behaviors of vortex filaments, we study the multifractality and intermittency of the family of generalized Riemann's non-differentiable functions equation Rx0(t) = Σn ≠ 0 e2π i ( n2 t + n x0 ) n2, x0 ∈ [0,1]. equation These functions represent, in a certain limit, the trajectory of regular polygonal vortex filaments that evolve according to the binormal flow. When x0 is rational, we show that Rx0 is multifractal and intermittent by completely determining the spectrum of singularities of Rx0 and computing the Lp norms of its Fourier high-pass filters, which are analogues of structure functions. We prove that Rx0 has a multifractal behavior also when x0 is irrational. The proofs rely on a careful design of Diophantine sets that depend on x0, which we study by crucially using the Duffin-Schaeffer theorem and the Mass Transference Principle.