On hyperholomorphic Bergman type spaces in domains of C2

Abstract

Quaternionic analysis is regarded as a broadly accepted branch of classical analysis referring to many different types of extensions of the Cauchy-Riemann equations to the quaternion skew field H. In this work we deals with a well-known (θ, u)-hyperholomorphic H-valued functions class related to elements of the kernel of the Helmholtz operator with a parameter u ∈ H, just in the same way as the usual quaternionic analysis is related to the set of the harmonic functions. Given a domain ⊂ H C2, we define and study a Bergman spaces theory for (θ, u)- hyperholomorphic quaternion-valued functions introduced as elements of the kernel of θu D [f]= θ D [f] + u f with u∈ H defined in C1(, H), where \[ θ D:= ∂∂ z1 + ieiθ∂∂ z2j = ∂∂ z1 + ieiθj∂∂ z2,0.5cm θ∈[0,2π). \] Using as a guiding fact that (θ, u)-hyperholomorphic functions includes, as a proper subset, all complex valued holomorphic functions of two complex variables we obtain some assertions for the theory of Bergman spaces and Bergman operators in domains of C2, in particular, existence of a reproducing kernel, its projection and their covariant and invariant properties of certain objects.