EUDML

We study solutions of first order partial differential relations $D u \in K$ , where $u : Ω \subset ℝ^{n} \to ℝ^{m}$ is a Lipschitz map and $K$ is a bounded set in $m \times n$ matrices, and extend Gromov’s theory of convex integration in two ways. First, we allow for additional constraints on the minors of $D u$ and second we replace Gromov’s $P$ −convex hull by the (functional) rank-one convex hull. The latter can be much larger than the former and this has important consequences for the existence of ‘wild’ solutions to elliptic systems. Our work was originally...

Hardy space methods for nonlinear partial differential equations

Müller, Stefan — 1994

Equadiff 8

Algebraic cycles on a general complete intersection of high multi-degree of a smooth projective variety

Mark Green; Stefan Müller-Stach — 1996

Compositio Mathematica

Algebraic cycles on certain Calabi-Yau threefolds.

Fabio Bardelli; Stefan Müller-Stach — 1994

Mathematische Zeitschrift

The p-harmonic system with measure-valued right hand side

Georg Dolzmann; Norbert Hungerbühler; Stefan Müller — 1997

Annales de l'I.H.P. Analyse non linéaire

A nonlinear model for inextensible rods as a low energy Γ-limit of three-dimensional nonlinear elasticity

Maria Giovanna Mora; Stefan Müller — 2004

Annales de l'I.H.P. Analyse non linéaire

Weak compactness of wave maps and harmonic maps

Stefan Müller; Michael Struwe; Alexandre Freire — 1998

Annales de l'I.H.P. Analyse non linéaire

Harmonic maps on planar lattices

Stefan Müller; Michael Struwe; Vladimir Šverák — 1997

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

A-quasiconvexity : weak-star convergence and the gap

Irene Fonseca; Giovanni Leoni; Stefan Müller — 2004

Annales de l'I.H.P. Analyse non linéaire

Differential Equations associated to Families of Algebraic Cycles

Pedro Luis del Angel; Stefan Müller-Stach — 2008

Annales de l’institut Fourier

We develop a theory of differential equations associated to families of algebraic cycles in higher Chow groups (, motivic cohomology groups). This formalism is related to inhomogenous Picard–Fuchs type differential equations. For a families of K3 surfaces the corresponding non–linear ODE turns out to be similar to Chazy’s equation.

Sufficient conditions for the validity of the Cauchy-Born rule close to $SO (n)$

Sergio Conti; Georg Dolzmann; Bernd Kirchheim; Stefan Müller — 2006

Journal of the European Mathematical Society

The Cauchy–Born rule provides a crucial link between continuum theories of elasticity and the atomistic nature of matter. In its strongest form it says that application of affine displacement boundary conditions to a monatomic crystal will lead to an affine deformation of the whole crystal lattice. We give a general condition in arbitrary dimensions which ensures the validity of the Cauchy–Born rule for boundary deformations which are close to rigid motions. This generalizes results of Friesecke...