洛伦兹曲面的Weierstrass表示定理

Complex Variables, Theory and Application: An International Journal Pub Date : 2005-04-15 DOI:10.1080/02781070500032895

J. Konderak

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引用次数: 44

摘要

我们考虑在洛伦兹数代数中具有对代数结构可微的值的函数作为全纯函数的类似物。然后应用这些函数证明了空间中洛伦兹曲面的Weierstrass表示定理。在证明中，我们基本上遵循了复数的模型。我们应用我们的表示定理来构造显式最小浸入。

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A Weierstrass representation theorem for Lorentz surfaces

We consider functions with values in the algebra of Lorentz numbers which are differentiable with respect to the algebraic structure of as an analogue of holomorphic functions. Then we apply these functions to prove a Weierstrass representation theorem for Lorentz surfaces immersed in the space . In the proof we essentially follow the model of the complex numbers. We apply our representation theorem to construct explicit minimal immersions.

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Complex Variables, Theory and Application: An International Journal

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