Tekijä: Giuseppe Buttazzo; Mariano Giaquinta; Stefan Hildebrandt Kustantaja: Oxford University Press (1999) Saatavuus: | Arvioimme, että tuote lähetetään meiltä noin 1-3 viikossa
Tekijä: Luigi Ambrosio; Giuseppe Buttazzo; Norman Dancer; Antonio Marino; M.K.V. Murthy Kustantaja: Springer-Verlag Berlin and Heidelberg GmbH & Co. KG (2000) Saatavuus: Noin 17-20 arkipäivää
Tekijä: Luigi Ambrosio; Luis A. Caffarelli; Sandro Salsa; Yann Brenier; Giuseppe Buttazzo; Cédric Villani Kustantaja: Springer-Verlag Berlin and Heidelberg GmbH & Co. KG (2003) Saatavuus: Noin 17-20 arkipäivää
Tekijä: Hedy Attouch; Giuseppe Buttazzo; Gerard Michaille Kustantaja: Society for Industrial & Applied Mathematics,U.S. (1987) Saatavuus: Noin 13-16 arkipäivää
Oxford University Press Sivumäärä: 270 sivua Asu: Kovakantinen kirja Painos: Hardback Julkaisuvuosi: 1999, 28.01.1999 (lisätietoa) Kieli: Englanti
One-dimensional variational problems have been somewhat neglected in the literature on calculus of variations, as authors usually treat minimal problems for multiple integrals which lead to partial differential equations and are considerably more difficult to handle. One-dimensional problems are connected with ordinary differential equations, and hence need many fewer technical prerequisites, but they exhibit the same kind of phenomena and surprises as variational problems for multiple integrals. This book provides an modern introduction to this subject, placing special emphasis on direct methods. It combines the efforts of a distinguished team of authors who are all renowned mathematicians and expositors. Since there are fewer technical details graduate students who want an overview of the modern approach to variational problems will be able to concentrate on the underlying theory and hence gain a good grounding in the subject. Except for results from the theory of measure and integration and from the theory of convex functions, the text develops all mathematical tools needed, including the basic results on one-dimensional Sobolev spaces, absolutely continuous functions, and functions of bounded variation.