Matches in DBpedia 2016-04 for { <http://dbpedia.org/resource/Analytical_regularization> ?p ?o }
Showing triples 1 to 45 of
45
with 100 triples per page.
- Analytical_regularization abstract "In physics and applied mathematics, analytical regularization is a technique used to convert boundary value problems which can be written as Fredholm integral equations of the first kind involving singular operators into equivalent Fredholm integral equations of the second kind. The latter may be easier to solve analytically and can be studied with discretization schemes like the finite element method or the finite difference method because they are pointwise convergent. In computational electromagnetics, it is known as the method of analytical regularization. It was first used in mathematics during the development of operator theory before acquiring a name.".
- Analytical_regularization wikiPageExternalLink S73.
- Analytical_regularization wikiPageExternalLink ?p=booklist&details=6.
- Analytical_regularization wikiPageExternalLink electromagnetics.html.
- Analytical_regularization wikiPageExternalLink content~content=a907381504~db=all~jumptype=rss.
- Analytical_regularization wikiPageExternalLink q6hj6637nv0815r5.
- Analytical_regularization wikiPageID "22616176".
- Analytical_regularization wikiPageLength "3617".
- Analytical_regularization wikiPageOutDegree "18".
- Analytical_regularization wikiPageRevisionID "705472334".
- Analytical_regularization wikiPageWikiLink Applied_mathematics.
- Analytical_regularization wikiPageWikiLink Boundary_value_problem.
- Analytical_regularization wikiPageWikiLink Category:Applied_mathematics.
- Analytical_regularization wikiPageWikiLink Category:Diffraction.
- Analytical_regularization wikiPageWikiLink Category:Electromagnetism.
- Analytical_regularization wikiPageWikiLink Compact_operator.
- Analytical_regularization wikiPageWikiLink Computational_electromagnetics.
- Analytical_regularization wikiPageWikiLink Discretization.
- Analytical_regularization wikiPageWikiLink Finite_difference_method.
- Analytical_regularization wikiPageWikiLink Finite_element_method.
- Analytical_regularization wikiPageWikiLink Fredholm_integral_equation.
- Analytical_regularization wikiPageWikiLink Hagen_Kleinert.
- Analytical_regularization wikiPageWikiLink Hilbert_space.
- Analytical_regularization wikiPageWikiLink Operator_theory.
- Analytical_regularization wikiPageWikiLink Ordinary_differential_equation.
- Analytical_regularization wikiPageWikiLink Physics.
- Analytical_regularization wikiPageWikiLink Pointwise_convergence.
- Analytical_regularization wikiPageWikiLink Singular_integral.
- Analytical_regularization wikiPageWikiLinkText "Analytical regularization".
- Analytical_regularization wikiPageUsesTemplate Template:Citation.
- Analytical_regularization wikiPageUsesTemplate Template:Reflist.
- Analytical_regularization subject Category:Applied_mathematics.
- Analytical_regularization subject Category:Diffraction.
- Analytical_regularization subject Category:Electromagnetism.
- Analytical_regularization hypernym Technique.
- Analytical_regularization type TopicalConcept.
- Analytical_regularization type Mechanic.
- Analytical_regularization type Physic.
- Analytical_regularization comment "In physics and applied mathematics, analytical regularization is a technique used to convert boundary value problems which can be written as Fredholm integral equations of the first kind involving singular operators into equivalent Fredholm integral equations of the second kind. The latter may be easier to solve analytically and can be studied with discretization schemes like the finite element method or the finite difference method because they are pointwise convergent.".
- Analytical_regularization label "Analytical regularization".
- Analytical_regularization sameAs Q4751157.
- Analytical_regularization sameAs m.05zj28z.
- Analytical_regularization sameAs Q4751157.
- Analytical_regularization wasDerivedFrom Analytical_regularization?oldid=705472334.
- Analytical_regularization isPrimaryTopicOf Analytical_regularization.