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Ivo M. Babuška (born March 22, 1926, in Prague) is a Czech-American mathematician, noted for his studies of the finite element method and the proof of the Babuška–Lax–Milgram theorem in partial differential equations. One of the celebrated result in the finite elements is the so-called Ladyzenskaja–Babuška–Brezzi (LBB) condition (also referred to in some literature as Banach–Necas–Babuška (BNB)), which provides sufficient conditions for a stable mixed formulation. The LBB condition has guided mathematicians and engineers to develop state-of-the-art formulations for many technologically important problems like Darcy flow, Stokes flow, incompressible Navier–Stokes, nearly incompressible elasticity.

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  • Ivo Babuška (cs)
  • Ivo Babuška (de)
  • Ivo Babuška (es)
  • Ivo Babuška (fr)
  • Ivo Babuška (en)
  • Ivo Babuška (it)
  • Ivo Babuška (pt)
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  • Ivo Babuška (* 22. března 1926, Praha) je česko-americký matematik a stavební inženýr. Narodil se v rodině architekta a stavitele Milana Babušky. Proslavil se aplikovanou numerickou matematikou. Za svůj přínos v oblasti mechaniky byl odměněn Humboldtovou cenou, udělovanou na Humboldtově univerzitě v SRN. Získal několik čestných doktorátů z různých univerzit světa. (cs)
  • Ivo M. Babuška (* 22. März 1926 in Prag) ist ein tschechischer Mathematiker, bekannt vor allem durch seine Beiträge zur Finite-Elemente-Methode und den Beweis des Babuška-Lax-Milgram-Theorems, eine Verallgemeinerung des Lemmas von Lax-Milgram. (de)
  • Ivo M. Babuška (Praga, 22 marzo 1926) è un matematico ceco naturalizzato statunitense, conosciuto per i suoi studi sul metodo degli elementi finiti e per la dimostrazione del teorema di Babuška-Lax-Milgram sulle equazioni differenziali alle derivate parziali, una generalizzazione del teorema di Lax-Milgram. Ha ricevuto il Premio Steele nel 2012 e il Premio Birkhoff nel 1994. (it)
  • Ivo M. Babuška (Praga, 22 de março de 1926) é um matemático tcheco-estadunidense. É reconhecido principalmente por contribuições ao método dos elementos finitos e pela demonstração do , uma generalização do teorema de Lax–Milgram. (pt)
  • Ivo M. Babuška (Praga, 22 de marzo de 1926 - *) es unmatemático checo-estadounidense,conocido por sus estudios en el campo del método de los elementosfinitos y por la demostración del teorema deBabuška-Lax-Milgram, en el campo de las ecuaciones en derivadasparciales. Además, es bien conocido por su trabajo sobre métodos adaptativos, así como por las versiones p y hp del método de los elementosfinitos[1].Ha desarrollado también el marco matemático para los métodos departición de la unidad. (es)
  • Ivo M. Babuška (born March 22, 1926, in Prague) is a Czech-American mathematician, noted for his studies of the finite element method and the proof of the Babuška–Lax–Milgram theorem in partial differential equations. One of the celebrated result in the finite elements is the so-called Ladyzenskaja–Babuška–Brezzi (LBB) condition (also referred to in some literature as Banach–Necas–Babuška (BNB)), which provides sufficient conditions for a stable mixed formulation. The LBB condition has guided mathematicians and engineers to develop state-of-the-art formulations for many technologically important problems like Darcy flow, Stokes flow, incompressible Navier–Stokes, nearly incompressible elasticity. (en)
  • Ivo M. Babuška (né le 22 mars 1926 à Prague) est un mathématicien tchéco-américain, connu pour ses travaux sur la méthode des éléments finis et la preuve du pour les équations aux dérivées partielles. Un de ses résultats les plus connus sur les éléments finis est la , qui donne des conditions suffisantes pour assurer une formulation faible stable. La condition BB a amené les mathématiciens et les ingénieurs à reprendre les états de l'art de la résolution numérique des problèmes technologiques comme les flux de Darcy, de Stokes, de Navier-Stokes incompressible, et le problème d'élasticité quasi incompressible. Il est également connu pour être à l'origine des travaux sur les méthodes adaptatives en p et hp de la méthode des éléments finis. Il a également développé le cadre d'étude mathémati (fr)
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