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Paraconvex functions and paraconvex sets

Huynh Van Ngai, Jean-Paul Penot (2008)

Studia Mathematica

We study a class of functions which contains both convex functions and differentiable functions whose derivatives are locally Lipschitzian or Hölderian. This class is a subclass of the class of approximately convex functions. It enjoys refined properties. We also introduce a class of sets whose associated distance functions are of that type. We discuss the properties of the metric projections on such sets under some assumptions on the geometry of the Banach spaces in which they are embedded. We...

Parametrization and geometric analysis of coordination controllers for multi-agent systems

Xiaoli Wang, Yiguang Hong (2009)

Kybernetika

In this paper, we address distributed control structures for multi-agent systems with linear controlled agent dynamics. We consider the parametrization and related geometric structures of the coordination controllers for multi-agent systems with fixed topologies. Necessary and sufficient conditions to characterize stabilizing consensus controllers are obtained. Then we consider the consensus for the multi-agent systems with switching interaction topologies based on control parametrization.

Partial regularity of minimizers of higher order integrals with (p, q)-growth

Sabine Schemm (2011)

ESAIM: Control, Optimisation and Calculus of Variations

We consider higher order functionals of the form F [ u ] = Ω f ( D m u ) d x for u : n Ω N , where the integrand f : m ( n , N ) , m≥ 1 is strictly quasiconvex and satisfies a non-standard growth condition. More precisely we assume that f fulfills the (p, q)-growth condition γ | A | p f ( A ) L ( 1 + | A | q ) for all A m ( n , N ) , with γ, L > 0 and 1 < p q < min { p + 1 n , 2 n - 1 2 n - 2 p } . We study minimizers of the functional F [ · ] and prove a partial C loc m , α -regularity result.

Partial regularity of minimizers of higher order integrals with (p, q)-growth

Sabine Schemm (2011)

ESAIM: Control, Optimisation and Calculus of Variations

We consider higher order functionals of the form F [ u ] = Ω f ( D m u ) d x for u : n Ω N , where the integrand f : m ( n , N ) , m≥ 1 is strictly quasiconvex and satisfies a non-standard growth condition. More precisely we assume that f fulfills the (p, q)-growth condition γ | A | p f ( A ) L ( 1 + | A | q ) for all A m ( n , N ) , with γ, L > 0 and 1 < p q < min { p + 1 n , 2 n - 1 2 n - 2 p } . We study minimizers of the functional F [ · ] and prove a partial C loc m , α -regularity result.

Path functionals over Wasserstein spaces

Alessio Brancolini, Giuseppe Buttazzo, Filippo Santambrogio (2006)

Journal of the European Mathematical Society

Given a metric space X we consider a general class of functionals which measure the cost of a path in X joining two given points x 0 and x 1 , providing abstract existence results for optimal paths. The results are then applied to the case when X is aWasserstein space of probabilities on a given set Ω and the cost of a path depends on the value of classical functionals over measures. Conditions for linking arbitrary extremal measures μ 0 and μ 1 by means of finite cost paths are given.

Pattern evolution

Augusto Visintin (1990)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

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