About semilinear low dimension Bessel PDEs
Abstract
We prove existence and uniqueness of solutions of a semilinear PDE driven by a Bessel type generatorLδ with low dimension 0 < δ < 1. Lδ is a local operator, whose drift is thederivative of x ( x):in particular it is a Schwartz distribution, whichis not the derivative of a continuous function.The solutions are intended in a duality (''weak'') sensewith respect to state spaceL2(R+, dμ), μ being an invariant measure for the Bessel semigroup.
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