Weak Well-Posedness of Multidimensional Stable Driven SDEs in the Critical Case

Abstract

We establish weak well-posedness for critical symmetric stable driven SDEs in R d with additive noise Z, d 1. Namely, we study the case where the stable index of the driving process Z is α = 1 which exactly corresponds to the order of the drift term having the coefficient b which is continuous and bounded. In particular, we cover the cylindrical case when Zt = (Z 1 t ,. .. , Z d t) and Z 1 ,. .. , Z d are independent one dimensional Cauchy processes. Our approach relies on L p-estimates for stable operators and uses perturbative arguments. 1. Statement of the problem and main results We are interested in proving well-posedness for the martingale problem associated with the following SDE: (1.1) X t = x + t 0 b(X s)ds + Z t , where (Z s) s0 stands for a symmetric d-dimensional stable process of order α = 1 defined on some filtered probability space (, F, (F t) t0 , P) (cf. [2] and the references therein) under the sole assumptions of continuity and boundedness on the vector valued coefficient b: (C) The drift b : R d → R d is continuous and bounded. 1 Above, the generator L of Z writes: L(x) = p.v. R d \0 [(x + z) -- (x)](dz), x ∈ R d , ∈ C 2 b (R d), (dz) = d 2μ (dθ), z = θ, (, θ) ∈ R * + x S d--1. (1.2) (here ×, × (or ×) and | × | denote respectively the inner product and the norm in R d). In the above equation, is the L\'evy intensity measure of Z, S d--1 is the unit sphere of R d andμ is a spherical measure on S d--1. It is well know, see e.g. [20] that the L\'evy exponent of Z writes as: (1.3) (λ) = E[exp(i λ, Z 1)] = exp -- S d--1 | λ, θ |μ(dθ) , λ ∈ R d , where μ = c 1μ , for a positive constant c 1 , is the so-called spectral measure of Z. We will assume some non-degeneracy conditions on μ. Namely we introduce assumption (ND) There exists 1 s.t. (1.4) ∀λ ∈ R d , --1 |λ| S d--1 | λ, θ |μ(dθ) |λ|. 1 The boundedness of b is here assumed for technical simplicity. Our methodology could apply, up to suitable localization arguments, to a drift b having linear growth.