Публікація:
A matrix electrodynamics as an analogue of the Heisenberg’s mechanics

dc.contributor.authorGritsunov, A. V.
dc.date.accessioned2019-05-31T12:53:20Z
dc.date.available2019-05-31T12:53:20Z
dc.date.issued2008
dc.description.abstractA matrix approach to solving the electrodynamic problems is suggested. The specificity of one is treatment of an electrodynamic system (ES) as an oscillating system with a finite number of the degrees of freedom. The ES is considered as a set of spatially localized so-called partial oscillators (oscillets). Matrices of unit mutual pseudoenergies and unit mutual energies of the oscillators are evaluated. The eigenfrequencies and the eigenfunctions of the ES can be calculated basing on the lumped elements oscillating system matrix theory. A matrix second-order ordinary differential equation is solved for excited potentials of the ES instead of the D’Alembert equation. The main advantage of the matrix electrodynamics is substitution of the solving the partial derivative differential equations by the less computationally intensive linear algebra problems and the ordinary differential equation integration.uk_UA
dc.identifier.citationGritsunov A. A matrix electrodynamics as an analogue of the Heisenberg’s mechanics // Proc. 8th Int. Symp. on Antennas, Propagation and EM Theory (ISAPE 2008) – Kunming, China. – 2008. – P. 471-474.uk_UA
dc.identifier.urihttp://openarchive.nure.ua/handle/document/9092
dc.language.isoen_USuk_UA
dc.subjectelectrodynamic systemuk_UA
dc.subjectpartial oscillatoruk_UA
dc.subjecteigenvalue problemuk_UA
dc.titleA matrix electrodynamics as an analogue of the Heisenberg’s mechanicsuk_UA
dc.typeConference proceedingsuk_UA
dspace.entity.typePublication

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