Hardy space methods for nonlinear partial differential equations

In: Tatra Mountains Mathematical Publications, vol. 4, no. 1

Stefan Müller

Detaily:

Rok, strany: 1994, 159 - 168

O článku:

Hardy space methods have lead to remarkable progress on nonlinear partial differential equations with critical growth. The results obtained by a variety of authors include the regularity theory for weakly harmonic maps, existence results for the two-dimensional instationary Euler equations with vortex sheet initial data and the Lipschitz parametrization of $W^2,2$ surfaces. This paper gives a quick review of the basic tools needed and discusses their application.

Ako citovať:

ISO 690:

Müller, S. 1994. Hardy space methods for nonlinear partial differential equations. In Tatra Mountains Mathematical Publications, vol. 4, no.1, pp. 159-168. 1210-3195.

APA:

Müller, S. (1994). Hardy space methods for nonlinear partial differential equations. Tatra Mountains Mathematical Publications, 4(1), 159-168. 1210-3195.