"TITLE","AUTHORS","SUBJECT","SUBJECT_RELATED","DESCRIPTION","PUBLISHER","AVAILABILITY","RESEARCH_ORG","SPONSORING_ORG","PUBLICATION_COUNTRY","PUBLICATION_DATE","CONTRIBUTING_ORGS","LANGUAGE","RESOURCE_TYPE","TYPE_QUALIFIER","JOURNAL_ISSUE","JOURNAL_VOLUME","RELATION","COVERAGE","FORMAT","IDENTIFIER","REPORT_NUMBER","DOE_CONTRACT_NUMBER","OTHER_IDENTIFIER","DOI","RIGHTS","ENTRY_DATE","OSTI_IDENTIFIER","PURL_URL" "Numerical resolution of the time-domain three-dimensional Maxwell equations by a conform finite element approximation. Part I: theoretical formulation; Resolution des equations de Maxwell instationnaires par une methode d`elements finis conformes 3D. 1ere partie: formulation theorique","Heintze, E","71 CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS; MAXWELL EQUATIONS; NUMERICAL SOLUTION; THREE-DIMENSIONAL CALCULATIONS; BOLTZMANN-VLASOV EQUATION; ELECTRON GUNS; FINITE ELEMENT METHOD; VARIATIONAL METHODS; 661100; 661220; CLASSICAL AND QUANTUM MECHANICS; PARTICLE BEAM PRODUCTION AND HANDLING; TARGETS","","The aim of this report is to present a method for solving the time-domain three-dimensional Maxwell equations. This method is based on a variational formulation and can be easily coupled with a particle solver for the Vlasov equation. The necessity to take into account complex three-dimensional geometries and to have a spatial resolution fitted to the various computation zones, leads to choose a finite element method built on tetrahedral unstructured meshes. 12 refs.","","OSTI; NTIS (US Sales Only); INIS","CEA Centre d`Etudes de Limeil, 94 - Villeneuve-Saint-Georges (France)","","France","1994-12-31","","French","Technical Report","","","","Other Information: PBD: 1993","","Medium: X; Size: 52 p.","ON: DE95611429","CEA-N-2714","","Other: ON: DE95611429; TRN: FR9402618008886","https://doi.org/","","2008-02-12","10103969",""