A biorthogonal approach to the infinite dimensional fractional Poisson measure
Abstract
In this paper we use a biorthogonal approach to the analysis of the infinite dimensional fractional Poisson measure πσβ, 0<β≤1, on the dual of Schwartz test function space D'. The Hilbert space L2(πσβ) of complex-valued functions is described in terms of a system of generalized Appell polynomials Pσ,β,α associated to the measure πσβ. The kernels Cnσ,β(·), n∈N0, of the monomials may be expressed in terms of the Stirling operators of the first and second kind as well as the falling factorials in infinite dimensions. Associated to the system Pσ,β,α, there is a generalized dual Appell system Qσ,β,α that is biorthogonal to Pσ,β,α. The test and generalized function spaces associated to the measure πσβ are completely characterized using an integral transform as entire functions.
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