Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Weyls_lemma_(Laplace_equation)> ?p ?o }
Showing triples 1 to 51 of
51
with 100 triples per page.
- Weyls_lemma_(Laplace_equation) abstract "In mathematics, Weyl's lemma, named after Hermann Weyl, states that every weak solution of Laplace's equation is a smooth solution. This contrasts with the wave equation, for example, which has weak solutions that are not smooth solutions. Weyl's lemma is a special case of elliptic or hypoelliptic regularity.".
- Weyls_lemma_(Laplace_equation) wikiPageID "7852551".
- Weyls_lemma_(Laplace_equation) wikiPageLength "4324".
- Weyls_lemma_(Laplace_equation) wikiPageOutDegree "21".
- Weyls_lemma_(Laplace_equation) wikiPageRevisionID "661703230".
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Analytic_function.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Category:Harmonic_functions.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Category:Lemmas.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Category:Partial_differential_equations.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Compact_support.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Convolution.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Distribution_(mathematics).
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Elliptic_PDE.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Elliptic_operator.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Hermann_Weyl.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Hypoelliptic.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Hypoelliptic_operator.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Laplace_operator.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Laplaces_equation.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Locally_integrable.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Locally_integrable_function.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Mathematics.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Measure_zero.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Mollifier.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Null_set.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Open_set.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Smooth_function.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Smoothness.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Support_(mathematics).
- Weyls_lemma_(Laplace_equation) wikiPageWikiLink Wave_equation.
- Weyls_lemma_(Laplace_equation) wikiPageWikiLinkText "Weyl's lemma (Laplace equation)".
- Weyls_lemma_(Laplace_equation) wikiPageWikiLinkText "Weyl's lemma".
- Weyls_lemma_(Laplace_equation) hasPhotoCollection Weyls_lemma_(Laplace_equation).
- Weyls_lemma_(Laplace_equation) wikiPageUsesTemplate Template:Cite_book.
- Weyls_lemma_(Laplace_equation) wikiPageUsesTemplate Template:Reflist.
- Weyls_lemma_(Laplace_equation) subject Category:Harmonic_functions.
- Weyls_lemma_(Laplace_equation) subject Category:Lemmas.
- Weyls_lemma_(Laplace_equation) subject Category:Partial_differential_equations.
- Weyls_lemma_(Laplace_equation) hypernym Solution.
- Weyls_lemma_(Laplace_equation) type Software.
- Weyls_lemma_(Laplace_equation) comment "In mathematics, Weyl's lemma, named after Hermann Weyl, states that every weak solution of Laplace's equation is a smooth solution. This contrasts with the wave equation, for example, which has weak solutions that are not smooth solutions. Weyl's lemma is a special case of elliptic or hypoelliptic regularity.".
- Weyls_lemma_(Laplace_equation) label "Weyl's lemma (Laplace equation)".
- Weyls_lemma_(Laplace_equation) sameAs Lemma_di_Weyl.
- Weyls_lemma_(Laplace_equation) sameAs ワイルの補題_(ラプラス方程式).
- Weyls_lemma_(Laplace_equation) sameAs m.026g8tj.
- Weyls_lemma_(Laplace_equation) sameAs Weyls_lemma_(Laplaces_ekvation).
- Weyls_lemma_(Laplace_equation) sameAs Q7990327.
- Weyls_lemma_(Laplace_equation) sameAs Q7990327.
- Weyls_lemma_(Laplace_equation) sameAs 外尔引理.
- Weyls_lemma_(Laplace_equation) wasDerivedFrom Weyls_lemma_(Laplace_equation)oldid=661703230.
- Weyls_lemma_(Laplace_equation) isPrimaryTopicOf Weyls_lemma_(Laplace_equation).