Bergman spaces and reproducing kernel for the biquaternionic Vekua equation

We analyze the main properties of the Bergman spaces of weak Lₚ- solutions for a biquaternionic Vekua equation of the form \ Dw (x) -QAw (x) =0 \ on bounded domains of R³, where the operator QA involves quaternionic conjugation and multiplications, both left and right, by essentially bounded functions. Properties such as completeness, separability, and reflexivity are shown. It is demonstrated that the solutions belonging to the Bergman spaces are locally H\"older continuous and that the evaluation maps are bounded in the Lₚ-norm. Consequently, for the case p=2, we obtain a reproducing integral kernel and an explicit formula for the orthogonal projection onto the Bergman space. For 1<p<, the explicit form for the annihilator of the Bergman space in the dual L₏' is presented, along with an orthogonal decomposition for L₂.