Canonical Rough Path over Tempered Fractional Brownian Motion: Existence, Construction, and Applications

Abstract

We construct a canonical geometric rough path over d-dimensional tempered fractional Brownian motion (tfBm) for any Hurst parameter H > 1/4 and tempering parameter λ > 0. The main challenge stems from the non-homogeneous nature of the tfBm covariance, which exhibits a power-law structure at small scales and exponential decay at large scales. Our primary contribution is a detailed analysis of this covariance, proving it has finite 2D -variation for = 1/(2H). This verifies the criterion of Friz and Victoir, guaranteeing the existence of a rough path lift. We provide an explicit construction of the rough path BH,λ = (BH,λ, BH,λ) via L2-limits, establishing its basic properties with explicit constants C(H,λ,T). As direct consequences, we obtain: (i)~a complete characterisation of integration regimes, with Young integration applicable for H > 1/2 and rough path theory necessary and sufficient for H ∈ (1/4, 1/2]; (ii)~the well-posedness of rough differential equations driven by tfBm, together with a Milstein-type numerical scheme of optimal strong convergence rate (n-H); and (iii)~the foundation for signature calculus for tfBm, including the existence and factorial decay of the signature. The boundary case H = 1/2 is treated explicitly, recovering the Stratonovich lift of the Ornstein--Uhlenbeck process and, as λ 0+, classical It\o calculus. Numerical experiments confirm the theoretical convergence rates (N-2H) for the L\'evy area approximation and (n-H) for the Milstein scheme. This work provides the first comprehensive pathwise framework for stochastic calculus with tfBm.

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