A note about Khoshnevisan--Xiao conjecture
Abstract
Khoshnevisan and Xiao showed in [Ann. Probab. 33 (2005) 841--878] that the statement about almost surely vanishing Bessel--Riesz capacity of the image of a Borel set G⊂R+ under a symmetric L\'evy process X in Rd is equivalent to the vanishing of a deterministic f-capacity for a particular function f defined in terms of the characteristic exponent of X. The authors conjectured that a similar statement is true for all L\'evy processes in Rd. We show that the conjecture is true provided we extend the definition of f and require certain integrability conditions which cannot be avoided in general.
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