On Decompositions of H-holomorphic functions into quaternionic power series

Michael Parfenov
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Abstract

Based on the full similarity in algebraic properties and differentiation rules between quaternionic (H-) holomorphic and complex (C-) holomorphic functions, we assume that there exists one holistic notion of a holomorphic function that has a H-representation in the case of quaternions and a C-representation in the case of complex variables. We get the essential definitions and criteria for a quaternionic power series convergence, adapting complex analogues to the quaternion case. It is established that the power series expansions of any holomorphic function in C- and H-representations are similar and converge with identical convergence radiuses. We define a H-analytic function and prove that every H-holomorphic function is H-analytic. Some examples of power series expansions are given.
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论将 H-holomorphic 函数分解为四元数幂级数
基于四元(H-)全态函数和复元(C-)全态函数在代数性质和微分规则上的完全相似性,我们假定存在一个全态函数的整体概念,它在四元情况下有 H 表示,在复变情况下有 C 表示。我们得到了四元幂级数收敛的基本定义和标准,并将复变类比于四元的情况。我们确定,任何全形函数在 C- 表示和 H- 表示中的幂级数展开都是相似的,并以相同的收敛半径收敛。我们定义了 H- 解析函数,并证明了每个 H-holomorphic 函数都是 H- 解析函数。
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