Bernhard Riemann 1826–1866: Turning Points in the Conception of MathematicsSpringer Science & Business Media, 8 de juny 2009 - 357 pàgines The name of Bernard Riemann is well known to mathematicians and physicists around the world. His name is indelibly stamped on the literature of mathematics and physics. This remarkable work, rich in insight and scholarship, is addressed to mathematicians, physicists, and philosophers interested in mathematics. It seeks to draw those readers closer to the underlying ideas of Riemann’s work and to the development of them in their historical context. This illuminating English-language version of the original German edition will be an important contribution to the literature of the history of mathematics. |
Continguts
Riemann between Germany and Italy | 39 |
Complex Analysis | 64 |
Real Analysis | 181 |
Geometry Physics Philosophy | 219 |
2 | 296 |
6 | 329 |
341 | |
Altres edicions - Mostra-ho tot
Bernhard Riemann 1826-1866: Turning Points in the Conception of Mathematics Detlef Laugwitz Previsualització limitada - 2008 |
Bernhard Riemann 1826–1866: Turning Points in the Conception of Mathematics Detlef Laugwitz Previsualització no disponible - 1999 |
Bernhard Riemann 1826-1866: Turning Points in the Conception of Mathematics Detlef Laugwitz Previsualització no disponible - 2008 |
Frases i termes més freqüents
19th century Abelian Abelian integrals algebraic functions analytic Begriff Berlin calculus Cantor Cauchy Cauchy's coefficients complex analysis complex numbers computation concept connection continuous functions convergence coordinates curvature curve Dedekind definition determination Dirichlet principle discussed dissertation epsilontics Euclidean Euler expression Felix Klein finite Fläche formula Fourier series function theory fundamental Funktionen Gauss geometry given Göttingen Grössen habilitation habilitation lecture habilitation paper Herbart Hilbert holomorphic idea infinitely small infinitesimal integral investigations Jacobi Klein Lagrange later Laugwitz Leibniz linear mapping mathematicians Mathematik mentioned method metric Nachlass Neuenschwander non-Euclidean geometry notes number theory obtained partial differential equations philosophy plane polynomial power series problem proof published quantities real analysis real numbers representation Riemann surface Riemann's lectures Riemann's paper Riemannian Section solution space student tensor theorem thought tion topological trigonometric series unendlich variable vector Weber Weierstrass Werth Weyl zeros