Abstract: The proposed media analysis relates to the interaction of forces between sources in physical media defined with respect to connecting lines. The mathematical basis is a countable dense subspace A of R³ whose elements have finite distances. A constructive induction proof of the non-regularity of the Zeeman topology Zpl [1] by St. Popvassilev [2] provides the modeling for A. The autohomeomorphism group H(Zpl) with respect to the Zeeman like topology Zpl shows the immediate mobility of sources. The Superposition principle of Standard Analysis has to be specified.
Keywords: invariant properties, Zeeman like topologies and applications, Permeability of membranes
Cite this paper
Otto Laback. (2026) The Treatment of the Permeability of Material Layers Using the Zeeman Topology Zpl. International Journal of Mathematical and Computational Methods, 11, 69-72

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