Electromagnetic field objects in terms of Balance of Geometric flows

TL;DR

This paper explores a geometric flow-based framework for understanding electromagnetic field objects as finite entities with internal structure, emphasizing their stress-energy-momentum balance and dynamic adaptation.

Contribution

It introduces a formal approach to model electromagnetic field objects using geometric flows and stress-energy-momentum balance, highlighting their internal dynamical structure and interactions.

Findings

EMFO are spatially finite entities with internal structure.

Balance relations are represented by tensor-field quantities.

The framework emphasizes internal and external dynamical adaptation.

Abstract

This paper reviews our physical motivation for choosing appropriate formal presentation of electromagnetic field objects (EMFO). Our view is based on the understanding that EMFO are spatially finite entities carrying internal dynamical structure, so, their available integral time stability should be represented by appropriate adaptation of their internal dynamical structure to corresponding local stress-energy-momentum balance relations with other physical objects. This adaptation process has two aspects: internal and external. Clearly, finding adequate internal dynamical structure giving appropriate integral characteristics of the object, will bring also appropriate behavior of EMFO as a whole. Therefore, the internal local stress-energy-momentum balance among the subsystems of EMFO should formally be presented by appropriately defined tensor-field quantities, which are meant to suggest a dynamical understanding of the abilities of EMFO to successfully communicate with all the rest physical world.