In this thesis, we study a general principle of convexification to treat certain non convex variationalproblems in Rd. Thanks to this principle we are able to enforce the powerful duality techniques andbring back such problems to primal-dual formulations in Rd+1, thus making efficient the numericalsearch of a global minimizer. A theory of duality and calibration fields is reformulated in the caseof linear-growth functionals. Under suitable assumptions, this allows us to revisit and extend anexclusion principle discovered by Visintin in the 1990s and to reduce the original problem to theminimization of a convex functional in Rd. This result is then applied successfully to a class offree boundary or multiphase problems that we treat numerical...
AbstractThe equivalence between saddle-points and optima, and duality theorems are established for a...
International audienceThe problem of minimizing a quadratic form over a ball centered at the origin ...
AbstractWe consider variational problems of the formmin∫Ω[f(Δu(x))+g(x,u(x))]dx:u∈u0+H10(Ω),wheref: ...
In this thesis, we study a general principle of convexification to treat certain non convex variatio...
Dans cette thèse, nous étudions un principe général de convexification permettant de traiter certain...
We present a new duality theory for non-convex variational problems, under possibly mixed Dirichlet ...
AbstractThis paper treats the construction of dual variational principles for non-convex problems us...
AbstractWe examine a notion of duality which appears to be useful in situations where the usual conv...
There are two different approaches to the Dirichlet minimization problem for variational inte-grals ...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/113741/1/sapm1995952127.pd
Several important problems in learning theory and data science involve high-dimensional optimization...
AbstractIn a recent paper D. J. White presented a new approach to the problem of minimizing a differ...
Key words and phrases. Banach spaces, convex analysis, duality, calculus of variations, non-convex s...
AbstractFor variational problems of the form Infv∈V{f(Av)+g(v)}, we propose a dual method which deco...
This manuscript deals with large-scale non-smooth optimization that may typically arise when perform...
AbstractThe equivalence between saddle-points and optima, and duality theorems are established for a...
International audienceThe problem of minimizing a quadratic form over a ball centered at the origin ...
AbstractWe consider variational problems of the formmin∫Ω[f(Δu(x))+g(x,u(x))]dx:u∈u0+H10(Ω),wheref: ...
In this thesis, we study a general principle of convexification to treat certain non convex variatio...
Dans cette thèse, nous étudions un principe général de convexification permettant de traiter certain...
We present a new duality theory for non-convex variational problems, under possibly mixed Dirichlet ...
AbstractThis paper treats the construction of dual variational principles for non-convex problems us...
AbstractWe examine a notion of duality which appears to be useful in situations where the usual conv...
There are two different approaches to the Dirichlet minimization problem for variational inte-grals ...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/113741/1/sapm1995952127.pd
Several important problems in learning theory and data science involve high-dimensional optimization...
AbstractIn a recent paper D. J. White presented a new approach to the problem of minimizing a differ...
Key words and phrases. Banach spaces, convex analysis, duality, calculus of variations, non-convex s...
AbstractFor variational problems of the form Infv∈V{f(Av)+g(v)}, we propose a dual method which deco...
This manuscript deals with large-scale non-smooth optimization that may typically arise when perform...
AbstractThe equivalence between saddle-points and optima, and duality theorems are established for a...
International audienceThe problem of minimizing a quadratic form over a ball centered at the origin ...
AbstractWe consider variational problems of the formmin∫Ω[f(Δu(x))+g(x,u(x))]dx:u∈u0+H10(Ω),wheref: ...