{"date_updated":"2024-07-16T10:17:29Z","page":"414-422","place":"Berlin, Heidelberg","language":[{"iso":"eng"}],"type":"conference","series_title":"Lecture Notes in Computer Science","conference":{"end_date":"2000-06-15","start_date":"2000-06-11","location":"Rousse, Bulgaria","name":"Second International Conference, NAA 2000"},"publication_identifier":{"issn":["0302-9743"],"eisbn":["978-3-540-45262-1"],"isbn":["978-3-540-41814-6"]},"abstract":[{"text":"The problem of an energy dissipation optimization in a conductive electromagnetic media is considered. The domain is known a priori and is fixed throughout the optimization process. We apply a perturbed and damped interior-point Newton method for the primaldual formulation of the nonlinear programming problem. Nonnegative slack variables are added to the inequality constraints in the optimization problem. Computational results concerning a two-dimensional isotropic system are included.","lang":"eng"}],"doi":"10.1007/3-540-45262-1_48","publisher":"Springer Berlin Heidelberg","editor":[{"first_name":"Lubin","last_name":"Vulkov","full_name":"Vulkov, Lubin"},{"full_name":"Yalamov, Plamen","last_name":"Yalamov","first_name":"Plamen"},{"last_name":"Waśniewski","full_name":"Waśniewski, Jerzy","first_name":"Jerzy"}],"author":[{"full_name":"Hoppe, Ronald H. W.","last_name":"Hoppe","first_name":"Ronald H. W."},{"first_name":"Svetozara","id":"201871","full_name":"Petrova, Svetozara","last_name":"Petrova"},{"last_name":"Schulz","full_name":"Schulz, Volker H.","first_name":"Volker H."}],"_id":"4764","status":"public","title":"Topology Optimization of Conductive Media Described by Maxwell’s Equations","date_created":"2024-07-04T11:23:02Z","publication":"Numerical Analysis and Its Applications","project":[{"_id":"f432a2ee-bceb-11ed-a251-a83585c5074d","name":"Institute for Data Science Solutions"}],"citation":{"mla":"Hoppe, Ronald H. W., et al. “Topology Optimization of Conductive Media Described by Maxwell’s Equations.” Numerical Analysis and Its Applications, edited by Lubin Vulkov et al., Springer Berlin Heidelberg, 2001, pp. 414–22, doi:10.1007/3-540-45262-1_48.","ama":"Hoppe RHW, Petrova S, Schulz VH. Topology Optimization of Conductive Media Described by Maxwell’s Equations. In: Vulkov L, Yalamov P, Waśniewski J, eds. Numerical Analysis and Its Applications. Lecture Notes in Computer Science. Berlin, Heidelberg: Springer Berlin Heidelberg; 2001:414-422. doi:10.1007/3-540-45262-1_48","bibtex":"@inproceedings{Hoppe_Petrova_Schulz_2001, place={Berlin, Heidelberg}, series={Lecture Notes in Computer Science}, title={Topology Optimization of Conductive Media Described by Maxwell’s Equations}, DOI={10.1007/3-540-45262-1_48}, booktitle={Numerical Analysis and Its Applications}, publisher={Springer Berlin Heidelberg}, author={Hoppe, Ronald H. W. and Petrova, Svetozara and Schulz, Volker H.}, editor={Vulkov, Lubin and Yalamov, Plamen and Waśniewski, JerzyEditors}, year={2001}, pages={414–422}, collection={Lecture Notes in Computer Science} }","apa":"Hoppe, R. H. W., Petrova, S., & Schulz, V. H. (2001). Topology Optimization of Conductive Media Described by Maxwell’s Equations. In L. Vulkov, P. Yalamov, & J. Waśniewski (Eds.), Numerical Analysis and Its Applications (pp. 414–422). Berlin, Heidelberg: Springer Berlin Heidelberg. https://doi.org/10.1007/3-540-45262-1_48","chicago":"Hoppe, Ronald H. W., Svetozara Petrova, and Volker H. Schulz. “Topology Optimization of Conductive Media Described by Maxwell’s Equations.” In Numerical Analysis and Its Applications, edited by Lubin Vulkov, Plamen Yalamov, and Jerzy Waśniewski, 414–22. Lecture Notes in Computer Science. Berlin, Heidelberg: Springer Berlin Heidelberg, 2001. https://doi.org/10.1007/3-540-45262-1_48.","ieee":"R. H. W. Hoppe, S. Petrova, and V. H. Schulz, “Topology Optimization of Conductive Media Described by Maxwell’s Equations,” in Numerical Analysis and Its Applications, Rousse, Bulgaria, 2001, pp. 414–422.","alphadin":"Hoppe, Ronald H. W. ; Petrova, Svetozara ; Schulz, Volker H.: Topology Optimization of Conductive Media Described by Maxwell’s Equations. In: Vulkov, L. ; Yalamov, P. ; Waśniewski, J. (Hrsg.): Numerical Analysis and Its Applications, Lecture Notes in Computer Science. Berlin, Heidelberg : Springer Berlin Heidelberg, 2001, S. 414–422","short":"R.H.W. Hoppe, S. Petrova, V.H. Schulz, in: L. Vulkov, P. Yalamov, J. Waśniewski (Eds.), Numerical Analysis and Its Applications, Springer Berlin Heidelberg, Berlin, Heidelberg, 2001, pp. 414–422."},"user_id":"220548","publication_status":"published","year":"2001"}