A Pair of Multiplication-Type Operators in Quaternionic Analysis and the 2-Cauchy-Fueter Equation
Abstract
In this paper, we introduce a pair of multiplication-like operations, L0 and L1, which derive k-regular functions from (k+1)-regular functions. The investigation of the inverse problem naturally leads to a deeper study of the 2-Cauchy-Fueter equation. In doing so, we provide a new acyclic resolution for the sheaf of 2-regular functions R(2). Furthermore, a complete topological characterization for the solvability of the 2-Cauchy-Fueter equation is established. Specifically, we prove that the 2-Cauchy-Fueter equation D(2)f=g is solvable for any g satisfying D1(2)g=0 on a domain ⊂R4 if and only if H3(, R) = 0, or equivalently, if and only if every real-valued harmonic function on can be represented as the real part of a quaternionic regular function.
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