Non-symmetric L\'evy-type operators
Abstract
We present a general approach to the parametrix construction. We apply it to prove the uniqueness and existence of a weak fundamental solution for the equation ∂t =L with non-symmetric non-local operators Lf(x):= b(x)· ∇ f(x)+ ∫Rd( f(x+z)-f(x)- 1|z|<1 <z,∇ f(x)>)(x,z)J(z)\, dz\,, under certain assumptions on b, and J. The result allows more general coefficients even for J(z)=|z|-d-1.
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