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27 de fev. de 2012 · M H A Newman and G Kreisel, Luitzen Egbertus Jan Brouwer, Biographical Memoirs of Fellows of the Royal Society of London 15 (1969), 39-68. Obituary, Yearbook of the Royal Society of Edinburgh Session 1966-67 (1968), 10-27.
Luitzen Egbertus Jan (Bertus) Brouwer (Overschie, 27 februari 1881 – Blaricum, 2 december 1966) was een Nederlandse wiskundige en filosoof. Hij is de grondlegger van de intuïtionistische wiskunde en van de moderne topologie .
Luitzen Egbertus Jan Brouwer (born February 27, 1881, Overschie, Netherlands—died December 2, 1966, Blaricum) was a Dutch mathematician who founded mathematical intuitionism (a doctrine that views the nature of mathematics as mental constructions governed by self-evident laws) and whose work completely transformed topology, the study of the most basic properties of geometric surfaces and ...
Luitzen Egbertus Jan Brouwer (ur. 27 lutego 1881 w Overschie, zm. 2 grudnia 1966 w Blaricum) – holenderski matematyk pracujący w dziedzinach topologii, teorii mnogości, teorii miary i analizy zespolonej. Upamiętnia go twierdzenie o punkcie stałym, mówiące: każde odwzorowanie ciągłe n-wymiarowej kuli domkniętej w siebie ma punkt stały.
Luitzen Egbertus Jan Brouwer41 of the ‘unreliability’ of this law as early as 1908 (67). However, much later he obtained a refutation (for hisinterpretation of the logical operations) after the theory of constructivity was developed to include propositions about sufficiently ‘sophisticated’ concepts.
Luitzen Egbertus Jan Brouwer ( Overschie, Hollandia, 1881. február 27. – Blaricum, Hollandia, 1966. december 2.) holland matematikus és filozófus, a matematikai intuicionizmus megalapítója; a matematikában a topológia, a halmazelmélet, a mértékelmélet és a komplex analízis terén ért el jelentősebb eredményeket, ezenfelül a ...
This dissertation has as its aim the philosophical presentation and discussion of the nature of the intuitionist continuum of Luitzen Egbertus Jan Brouwer (1881-1966) and of its philosophical bases. This conception of the nature of the intuitionist continuum led to the development of the notion of “real numbers” distinct from classical analysis.
