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On the complexifications of the Euclidean $R^n$ spaces and the n-dimensional generalization of Pithagore theorem
We will discuss the following results C_n complexification of R(n) spaces, C_n structure and the invariant surfaces C_n holomorphicity and harmonicity. We also consider the link between C_n holomorphicity and the origin of spin 1/n. In our approach appears a new geometry and N-ary algebras/symmetrie...
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Lenguaje: | eng |
Publicado: |
2010
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Materias: | |
Acceso en línea: | http://cds.cern.ch/record/1275012 |
Sumario: | We will discuss the following results C_n complexification of R(n) spaces, C_n structure and the invariant surfaces C_n holomorphicity and harmonicity. We also consider the link between C_n holomorphicity and the origin of spin 1/n. In our approach appears a new geometry and N-ary algebras/symmetries. |
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