Topological Calculus: between Algebraic Topology and Electromagnetic fields

Autores/as

  • Walter Arrighetti
  • Giorgio Gerosa

DOI:

https://doi.org/10.1685/

Resumen

The Topological Calculus, based on Algebraic Topology, is introduced as a discrete Field Theory. Diagonalization of simplicial complex adjacency matrices allows to extract information about domain topology and Helmholtz equation eigenfunctions. Electromagnetic analysis of IFS fractals for Sierpinski gasket/carpet is then carried out: self-similar topology deeply influences the type of e.m. fields, as well as its finite TEM modes (as many as the domain's Euler characteristic; represented by harmonic fields) and self-similar distribution of resonating frequencies. This proves that even in such discrete model many features of guided waves depend on the topology rather than metrics. [DOI: 10.1685 / CSC06013] About DOI

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Publicado

2007-10-01

Número

Vol. 1 (2006)

Sección

Articles

Licencia

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