The Cauchy‐Kowalewski product for bicomplex holomorphic functions

Abstract: In this paper we study the Cauchy-Kowalewski extension of real analytic functions satisfying a system of differential equations connected to bicomplex analysis, and we use this extension to study the product in the space of bicomplex holomorphic functions. We also show how these ideas can be used to define a Fourier transform for bicomplex holomorphic functions

“…Using the idempotent decomposition, the transform F T can be seen as duplication over the two Fourier transforms with respect to complex frequencies α, β of given ψ on the real line (see for example [10,4,3]). Now, for every fixed θ ∈ {θ ∈ S 1 e + + S 1 e − ; θ = ±1, ±ij}, we define the integral transform F σ θ to be…”

Bicomplex Analogs of Segal–Bargmann and Fractional Fourier Transforms

“…Using the idempotent decomposition, the transform F T can be seen as duplication over the two Fourier transforms with respect to complex frequencies α, β of given ψ on the real line (see for example [10,4,3]). Now, for every fixed θ ∈ {θ ∈ S 1 e + + S 1 e − ; θ = ±1, ±ij}, we define the integral transform F σ θ to be…”

Bicomplex Analogs of Segal–Bargmann and Fractional Fourier Transforms

“…Recently, a lot of work is being done on bicomplex functional analysis and their applications, see, e.g., [14,15,16,17,18,19] and references therein. A systematic study of functional analysis in this setting began with the monograph [9].…”

Fixed point results in ordered bicomplex-valued metric spaces

“…The Bergman space is a classic topic in the Complex Analysis. The last years has received a strong impetus (see [2,5,6,11,12]); on the other hand, in recent years, the theory of bicomplex holomorphic functions has consolidated its development (see [1,3,4,9] and references herein). This theory shows that it is quite adequate to deal with some analogous of the classical holomorphic functions spaces on the unit complex disk, but now defined in the bidisk.…”

Bicomplex Bergman and Bloch spaces