Shortcuts
Top of page (Alt+0)
Page content (Alt+9)
Page menu (Alt+8)
Your browser does not support javascript, some WebOpac functionallity will not be available.
.
Default
.
PageMenu
-
Main Menu
-
Simple Search
.
Advanced Search
.
Journal Search
.
Refine Search Results
.
Preferences
.
Search Menu
Simple Search
.
Advanced Search
.
New Items Search
.
Journal Search
.
Refine Search Results
.
Bottom Menu
Help
Italian
.
English
.
German
.
New Item Menu
New Items Search
.
New Items List
.
Links
SISSA Library
.
ICTP library
.
Italian National web catalog (SBN)
.
Trieste University web catalog
.
Udine University web catalog
.
© LIBERO v6.4.1sp220816
Page content
You are here
:
Catalogue Tag Display
Catalogue Tag Display
MARC 21
Minimal Surfaces and Functions of Bounded Variation
Tag
Description
020
$a9781468494860
082
$a516
099
$aOnline resource : Birkhäuser
100
$aGiusti, Enrico.$d1940-
245
$aMinimal Surfaces and Functions of Bounded Variation$h[EBook]$cby Enrico Giusti.
260
$aBoston, MA$bBirkhäuser$c1984.
300
$aXII, 240 pages$bonline resource.
336
$atext
338
$aonline resource
440
$aMonographs in Mathematics ;$v80
505
$a
I: Parametric Minimal Surfaces -- 1. Functions of Bounded Variation and Caccioppoli Sets -- 2. Traces of BV Functions -- 3. The Reduced Boundary -- 4. Regularity of the Reduced Boundary -- 5. Some Inequalities -- 6. Approximation of Minimal Sets (I) -- 7. Approximation of Minimal Sets (II) -- 8. Regularity of Minimal Surfaces -- 9. Minimal Cones -- 10. The First and Second Variation of the Area -- 11. The Dimension of the Singular Set -- II: Non-Parametric Minimal Surfaces -- 12. Classical Solutions of the Minimal Surface Equation -- 13. The a priori Estimate of the Gradient -- 14. Direct Methods -- 15. Boundary Regularity -- 16. A Further Extension of the Notion of Non-Parametric Minimal Surface -- 17. The Bernstein Problem -- Appendix A -- Appendix B -- Appendix C.
520
$a
The problem of finding minimal surfaces, i. e. of finding the surface of least area among those bounded by a given curve, was one of the first considered after the foundation of the calculus of variations, and is one which received a satis factory solution only in recent years. Called the problem of Plateau, after the blind physicist who did beautiful experiments with soap films and bubbles, it has resisted the efforts of many mathematicians for more than a century. It was only in the thirties that a solution was given to the problem of Plateau in 3-dimensional Euclidean space, with the papers of Douglas [DJ] and Rado [R T1, 2]. The methods of Douglas and Rado were developed and extended in 3-dimensions by several authors, but none of the results was shown to hold even for minimal hypersurfaces in higher dimension, let alone surfaces of higher dimension and codimension. It was not until thirty years later that the problem of Plateau was successfully attacked in its full generality, by several authors using measure-theoretic methods; in particular see De Giorgi [DG1, 2, 4, 5], Reifenberg [RE], Federer and Fleming [FF] and Almgren [AF1, 2]. Federer and Fleming defined a k-dimensional surface in IR" as a k-current, i. e. a continuous linear functional on k-forms. Their method is treated in full detail in the splendid book of Federer [FH 1].
538
$aOnline access to this digital book is restricted to subscription institutions through IP address (only for SISSA internal users)
710
$aSpringerLink (Online service)
830
$aMonographs in Mathematics ;$v80
856
$u
http://dx.doi.org/10.1007/978-1-4684-9486-0
Quick Search
Search for