Anniversary Volume EXTREMUM PROBLEMS WITH INEQUALITIES AS SUBSIDIARY CONDITIONS Fritz John This paper deals with an extension of. [John ] F. John, “Extremum problems with inequalities as subsidiary conditions”, pp. – in Studies and essays presented to R. Courant on his 60 th. In his seminal paper Extremum problems with inequalities as subsidiary con- ditions  .. They give necessary and sufficient conditions when a convex body.
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CiteULike: Extremum Problems with Inequalities as Subsidiary Conditions
Applications [ edit ] Obstacle Collision Detection  Portfolio Policy Approximation  See also [ edit ] Steiner inellipsethe special case of the John ellipsoid for a triangle.
In Studies and Essays: This page was last edited on 24 Novemberat Groups Connections Recommendations Neighbours Watchlist. People studying for PhDs or in postdoctoral postdoc positions. inequaliteis
From Wikipedia, the free encyclopedia. Languages Deutsch Polski Edit links. Some citation styles add the source URL, which you may not want. InFritz John proved  that each convex body in R n contains a unique ellipsoid of maximal volume. CiteULike is a free online bibliography manager.
Brought inequalitiew you by AQnowledgeprecision products for scientists. Courant Anniversary Volumepp. The service is similar in scope to EndNote or RefWorks or any other reference manager like BibTeX, but it is a social bookmarking service for scientists and humanities researchers.
Fat objectrelated to radius of largest contained ball. There are no reviews of this article. Courant on his 60th BirthdayJanuary 8,— You can help Wikipedia by expanding it.
By clicking “OK” you acknowledge that you have the right to distribute this file. Retrieved from ” https: The following refinement of John’s original theorem, due to Keith Ball,  gives necessary and sufficient conditions for the John ellipsoid of K to be a closed unit ball B in R n:. You may hide this message. He also gave necessary and sufficient conditions for this ellipsoid to be a ball.
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It helps undergraduates and postgraduates. Likes beta This copy of the article hasn’t been liked by anyone yet. Convex geometry Multi-dimensional geometry Geometry stubs. Studies and Essays Presented to R. Thus, each convex body has an affine image whose ellipsoid of maximal volume is the Euclidean unit ball.
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Search all the public and authenticated articles in CiteULike. The following refinement of John’s original theorem, due to Keith Ball,  gives necessary and sufficient conditions for the John ellipsoid of K to be a closed unit ball B in R n: