Non-archimedean pseudo-differential operators have gained
popularity in recent years due to their utility in studying certain equations
associated with new physical models in physical form. Main aim of this paper is
to define non-archimedean pseudo-differential operator associted with
fractional Fourier transform in this manuscript. In this manuscript, we discuss
some classes of p-adic complete inner product spaces, Bϕ, k(Qp), 0 ≤ k < ∞,
connected to negative definite, radial and continuous functions ϕ : Qp → C. In
this article, we also introduce the non-archimedean pseudo-differential
operator Aϕ,k involving fractional Fourier transform connected to negative
definite functions. We find the convolution Kernel Kk of these operators and
the Green function related to fractional Fourier transform.
Author(s) Details
Abhisekh Shekhar
Department of Mathematics, C.M.Science College, Darbhanga-846004, Bihar,
India.
Please see the book here :- https://doi.org/10.9734/bpi/mcsru/v7/6452
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