The First Hitting Distribution of a Sphere for Symmetric Stable Processes
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Publication:5611472
DOI10.2307/1995006zbMath0209.49303OpenAlexW4232566600MaRDI QIDQ5611472
Publication date: 1969
Full work available at URL: https://doi.org/10.2307/1995006
Related Items (8)
Analytical estimation for the impulse response of an n-dimensional diffusion channel with an absorbing receiver ⋮ Boundary behavior of \(\alpha \)-harmonic functions on the complement of the sphere and hyperplane ⋮ Explicit identities for Lévy processes associated to symmetric stable processes ⋮ Hitting of a line or a half-line in the plane by two-dimensional symmetric stable Lévy processes ⋮ \(L^p\)-independence of spectral bounds of Feynman-Kac semigroups by continuous additive functionals ⋮ Kato class measures of symmetric Markov processes under heat kernel estimates ⋮ Oscillatory attraction and repulsion from a subset of the unit sphere or hyperplane for isotropic stable Lévy processes ⋮ Unnamed Item
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