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Selecta de Edmund Hlawka

Selecta: Springer Collected Works in Mathematics

Autor Edmund Hlawka Editat de Peter M. Gruber, Wolfgang M. Schmidt
en Limba Engleză Paperback – 7 feb 2013
Edmund Hlawka is a leading number theorist whose work has had a lasting influence on modern number theory and other branches of mathematics. He has contributed to diophantine approximation, the geometry of numbers, uniform distributions, analytic number theory, discrete geometry, convexity, numerical integration, inequalities, differential equations and gas dynamics. Of particular importance are his findings in the geometry of numbers (especially the Minkowski-Hlawka theorem) and uniform distribution. This Selecta volume collects his most important articles, many of which were previously hard to find. It will provide a useful tool for researchers and graduate students working in the areas covered, and includes a general introduction by E. Hlawka.
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Specificații

ISBN-13: 9783642346224
ISBN-10: 3642346227
Pagini: 560
Ilustrații: VIII, 551 p. 1 illus. With 2013. Reprint of the 1990 edition..
Dimensiuni: 155 x 235 x 29 mm
Greutate: 0.78 kg
Ediția:1990
Editura: Springer Berlin, Heidelberg
Colecția Springer
Seria Springer Collected Works in Mathematics

Locul publicării:Berlin, Heidelberg, Germany

Public țintă

Research

Cuprins

Notes on the papers on geometry of numbers and on Diophantine approximations.- Über die Approximation von zwei komplexen inhomogenen Linearformen [3]*.- Über die Approximation von inhomogenen Linearformen [4].- Über komplexe homogene Linearformen [5].- Eine Ungleichung für Vektorlängen [6].- Zur Geometrie der Zahlen [7].- Ausfüllung und Überdeckung konvexer Körper durch konvexe Körper [16].- Über Gitterpunkte in Parallelepipeden [18].- Über Integrale auf konvexen Körpern I [19].- Über eine Klasse von mehrfachen Integralen [26].- Das inhomogene Problem in der Geometrie der Zahlen [30].- Über einen Satz von van der Corput [31].- Zur formalen Theorie der Gleichverteilung in kompakten Gruppen [32].- Folgen auf kompakten Räumen [33].- Zur Überdeckung der Ebene durch konvexe Scheiben [34].- Zum Hauptsatz der Theorie der Gleichverteilung [36].- Erbliche Eigenschaften in der Theorie der Gleichverteilung [40].- Funktionen von beschränkter Variation in der Theorie der Gleichverteilung [43].- Zur angenäherten Berechnung mehrfacher Integrale [45].- Rhythmische Folgen auf kompakten Gruppen I [46].- Zur Geometrie der Zahlen [49].- Discrepancy and uniform distribution of sequences [52].- Uniform distribution modulo 1 and numerical analysis [53].- Interpolation analytischer Funktionen auf dem Einheitskreis [60].- Ein metrischer Satz in der Theorie der C-Gleichverteilung [67].- Discrepancy and Riemann Integration [69].- Über eine Methode von E. Hecke in der Theorie der Gleichverteilung [74].- Mathematische Modelle der kinetischen Gastheorie [75].- Anwendung zahlentheoretischer Methoden auf Probleme der numerischen Mathematik I [80].- Über die Gleichverteilung gewisser Folgen, welche mit den Nullstellen der Zetafunktion zusammenhängen [83].- 90 Jahre Geometrie derZahlen [92].- Approximation von Irrationalzahlen und pythagoräische Tripel [94].- Gleichverteilung auf Produkten von Sphären [102].- Eine Bemerkung zur Theorie der Gleichverteilung [109].- Carl Ludwig Siegel (31. 12. 1896–4.4. 1981) [117].- List of publications.- Acknowledgements.

Textul de pe ultima copertă

Edmund Hlawka is a leading number theorist whose work has had a lasting influence on modern number theory and other branches of mathematics. He has contributed to diophantine approximation, the geometry of numbers, uniform distributions, analytic number theory, discrete geometry, convexity, numerical integration, inequalities, differential equations and gas dynamics. Of particular importance are his results in the geometry of numbers (especially the Minkowski-Hlawka theorem) and uniform distribution. This Selecta volume contains his most important articles, many of which had not been easily accessible. It will provide a useful tool for researchers and graduate students working in the areas covered. E. Hlawka has contributed a general introduction.

Caracteristici

Provides a clear overview of the works of Edmund Hlawka Useful as a self-study guide Historical significance