Higher-Order Multifractional Stable Motion: Definition and Fundamental Properties

Abstract

This paper introduces the n-th order multifractional stable motion (n-MFSM), a novel stochastic process that simultaneously unifies three key modelling features: heavy-tailed distributions (α-stable with α∈(1,2]), time-varying local regularity via a functional Hurst parameter H(t)∈(n-1,n), and extended scaling behaviour of order n≥1. No existing framework combines all three. We establish rigorous existence via Lα-integrability analysis, derive both moving-average and harmonizable representations with explicit constants, prove local asymptotic self-similarity with complete identification of the limit process, determine the exact pointwise Hölder regularity αX(t)=H(t)-1/α, and characterize long-range dependence through codifference asymptotics. In particular, we obtain the precise decay exponent (α-1)H+ + H(s)-n and the LRD criterion (α-1)H++H(s)<n, which generalizes the classical condition H(s)+H+<1 for first-order Gaussian multifractional processes and reduces to αH-1 for LFSM with constant H.