About: Walsh–Lebesgue theorem

An Entity of Type: Thing, from Named Graph: http://dbpedia.org, within Data Space: dbpedia.org

The Walsh–Lebesgue theorem is a famous result from harmonic analysis proved by the American mathematician Joseph L. Walsh in 1929, using results proved by Lebesgue in 1907. The theorem states the following: Let K be a compact subset of the Euclidean plane ℝ2 such the relative complement of with respect to ℝ2 is connected. Then, every real-valued continuous function on (i.e. the boundary of K) can be approximated uniformly on by (real-valued) harmonic polynomials in the real variables x and y.

Property	Value
dbo:abstract	The Walsh–Lebesgue theorem is a famous result from harmonic analysis proved by the American mathematician Joseph L. Walsh in 1929, using results proved by Lebesgue in 1907. The theorem states the following: Let K be a compact subset of the Euclidean plane ℝ2 such the relative complement of with respect to ℝ2 is connected. Then, every real-valued continuous function on (i.e. the boundary of K) can be approximated uniformly on by (real-valued) harmonic polynomials in the real variables x and y. (en)
dbo:wikiPageID	58248385 (xsd:integer)
dbo:wikiPageLength	4425 (xsd:nonNegativeInteger)
dbo:wikiPageRevisionID	1013817000 (xsd:integer)
dbo:wikiPageWikiLink	dbc:Theorems_in_approximation_theory dbr:Joseph_L._Walsh dbr:Riemann_surface dbr:Complement_(set_theory) dbr:Continuous_function dbr:Boundary_(topology) dbr:Harmonic_analysis dbr:Harmonic_polynomial dbr:Dirichlet_algebra dbr:Uniform_convergence dbr:Henri_Lebesgue dbc:Theorems_in_harmonic_analysis dbr:Real_coordinate_space dbr:Euclidean_plane dbr:Function_algebra dbr:Connected_set dbr:Compact_set
dbp:wikiPageUsesTemplate	dbt:Blockquote dbt:Math
dcterms:subject	dbc:Theorems_in_approximation_theory dbc:Theorems_in_harmonic_analysis
rdfs:comment	The Walsh–Lebesgue theorem is a famous result from harmonic analysis proved by the American mathematician Joseph L. Walsh in 1929, using results proved by Lebesgue in 1907. The theorem states the following: Let K be a compact subset of the Euclidean plane ℝ2 such the relative complement of with respect to ℝ2 is connected. Then, every real-valued continuous function on (i.e. the boundary of K) can be approximated uniformly on by (real-valued) harmonic polynomials in the real variables x and y. (en)
rdfs:label	Walsh–Lebesgue theorem (en)
owl:sameAs	wikidata:Walsh–Lebesgue theorem https://global.dbpedia.org/id/5anPp
prov:wasDerivedFrom	wikipedia-en:Walsh–Lebesgue_theorem?oldid=1013817000&ns=0
foaf:isPrimaryTopicOf	wikipedia-en:Walsh–Lebesgue_theorem
is dbo:knownFor of	dbr:Joseph_L._Walsh
is dbo:wikiPageRedirects of	dbr:Walsh-Lebesgue_theorem
is dbo:wikiPageWikiLink of	dbr:Joseph_L._Walsh dbr:Walsh-Lebesgue_theorem dbr:Henri_Lebesgue dbr:List_of_things_named_after_Henri_Lebesgue
is dbp:knownFor of	dbr:Joseph_L._Walsh
is foaf:primaryTopic of	wikipedia-en:Walsh–Lebesgue_theorem