Matches in DBpedia 2016-04 for { <http://dbpedia.org/resource/Funk_transform> ?p ?o }
Showing triples 1 to 46 of
46
with 100 triples per page.
- Funk_transform abstract "In the mathematical field of integral geometry, the Funk transform (also called Minkowski–Funk transform, Funk–Radon transform or spherical Radon transform) is an integral transform defined by integrating a function on great circles of the sphere. It was introduced by Paul Funk in 1916, based on the work of Minkowski (1904). It is closely related to the Radon transform. The original motivation for studying the Funk transform was to describe Zoll metrics on the sphere.".
- Funk_transform wikiPageExternalLink 980815.pdf.
- Funk_transform wikiPageID "23253927".
- Funk_transform wikiPageLength "6284".
- Funk_transform wikiPageOutDegree "28".
- Funk_transform wikiPageRevisionID "692822651".
- Funk_transform wikiPageWikiLink Category:Integral_geometry.
- Funk_transform wikiPageWikiLink Category:Integral_transforms.
- Funk_transform wikiPageWikiLink Closed_and_exact_differential_forms.
- Funk_transform wikiPageWikiLink Continuous_function.
- Funk_transform wikiPageWikiLink Differential_form.
- Funk_transform wikiPageWikiLink Even_and_odd_functions.
- Funk_transform wikiPageWikiLink Exterior_algebra.
- Funk_transform wikiPageWikiLink Function_(mathematics).
- Funk_transform wikiPageWikiLink Great_circle.
- Funk_transform wikiPageWikiLink Homogeneous_function.
- Funk_transform wikiPageWikiLink Integral_geometry.
- Funk_transform wikiPageWikiLink Integral_transform.
- Funk_transform wikiPageWikiLink Integration_by_substitution.
- Funk_transform wikiPageWikiLink Line_integral.
- Funk_transform wikiPageWikiLink Linear_independence.
- Funk_transform wikiPageWikiLink Mathematics.
- Funk_transform wikiPageWikiLink Mathematische_Annalen.
- Funk_transform wikiPageWikiLink Paul_Funk.
- Funk_transform wikiPageWikiLink Radon_transform.
- Funk_transform wikiPageWikiLink Rotation_group_SO(3).
- Funk_transform wikiPageWikiLink Special_linear_group.
- Funk_transform wikiPageWikiLink Sphere.
- Funk_transform wikiPageWikiLink Spherical_harmonics.
- Funk_transform wikiPageWikiLink Spherical_mean.
- Funk_transform wikiPageWikiLink Unit_vector.
- Funk_transform wikiPageWikiLink Zoll_surface.
- Funk_transform wikiPageWikiLinkText "Funk transform".
- Funk_transform wikiPageUsesTemplate Template:Citation.
- Funk_transform wikiPageUsesTemplate Template:Harv.
- Funk_transform wikiPageUsesTemplate Template:Harvtxt.
- Funk_transform subject Category:Integral_geometry.
- Funk_transform subject Category:Integral_transforms.
- Funk_transform type Transform.
- Funk_transform comment "In the mathematical field of integral geometry, the Funk transform (also called Minkowski–Funk transform, Funk–Radon transform or spherical Radon transform) is an integral transform defined by integrating a function on great circles of the sphere. It was introduced by Paul Funk in 1916, based on the work of Minkowski (1904). It is closely related to the Radon transform. The original motivation for studying the Funk transform was to describe Zoll metrics on the sphere.".
- Funk_transform label "Funk transform".
- Funk_transform sameAs Q5509245.
- Funk_transform sameAs m.0660tl4.
- Funk_transform sameAs Q5509245.
- Funk_transform wasDerivedFrom Funk_transform?oldid=692822651.
- Funk_transform isPrimaryTopicOf Funk_transform.