无穷符号情况下克利福德单原函数的共形不变性

Pub Date : 2024-04-29 DOI:10.1007/s11785-024-01528-y
Chen Liang, Matvei Libine
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引用次数: 0

摘要

我们将经典克利福德分析的构造扩展到不定非退化二次型的情况。复全形函数的克利福德类似物--即所谓的单原函数--是通过对某个波算子进行因式分解的狄拉克算子定义的。四元分析的基本特征之一是全形函数的四元类似物在保角(或莫比乌斯)变换下的不变性。已知在与正定二次型相关的克利福德代数中也有类似的不变性。我们将这些结果推广到与所有非退化二次型相关联的克利福德布拉斯。这一结果使不定签名情况与经典的正定情况具有相同的基础。
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Conformal Invariance of Clifford Monogenic Functions in the Indefinite Signature Case

We extend constructions of classical Clifford analysis to the case of indefinite non-degenerate quadratic forms. Clifford analogues of complex holomorphic functions—called monogenic functions—are defined by means of the Dirac operators that factor a certain wave operator. One of the fundamental features of quaternionic analysis is the invariance of quaternionic analogues of holomorphic function under conformal (or Möbius) transformations. A similar invariance property is known to hold in the context of Clifford algebras associated to positive definite quadratic forms. We generalize these results to the case of Clifford algebras associated to all non-degenerate quadratic forms. This result puts the indefinite signature case on the same footing as the classical positive definite case.

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