PERROTTA, Stefania

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PERROTTA, Stefania

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Dipartimento di Scienze Fisiche, Informatiche e Matematiche

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Risultati 1 - 19 di 19 (tempo di esecuzione: 0.043 secondi).

A correction of the paper "On minima of radially symmetric functionals of the gradient"

2008 A., Cellina; Perrotta, Stefania

Evolution equations with nonlocal multivalued Cauchy problems

2024 Malaguti, L.; Perrotta, S.

Exact controllability of infinite dimensional systems with controls of minimal norm

2019 Malaguti, Luisa; Perrotta, Stefania; Taddei, Valentina

Existence of minimizers for nonconvex, noncoercive simple integrals.

2002 P., Celada; Perrotta, Stefania

Existence of solutions for a class of non convex minimum problems

1998 P., Celada; Perrotta, Stefania; G., Treu

Functions with prescribed singular values of the gradient.

1998 P., Celada; Perrotta, Stefania

Local Lipschitz continuity for energy integrals with slow growth

2022 Eleuteri, M.; Marcellini, P.; Mascolo, E.; Perrotta, S.

Lp-exact controllability of partial differential equations with nonlocal terms

2022 Malaguti, Luisa; Perrotta, Stefania; Taddei, Valentina

Minimizing non-convex multiple integrals: a density result.

2000 P., Celada; Perrotta, Stefania

Minimizing nonconvex, simple integrals of product type

2001 P., Celada; Perrotta, Stefania

Nonconvex variational problems related to a hyperbolic equation

1999 F., FLORES BAZAN; Perrotta, Stefania

On a class of nonconvex Bolza problems related to Blatz-Ko elastic materials

2007 P., Celada; Perrotta, Stefania

On a problem of potential wells.

1995 A., Cellina; Perrotta, Stefania

On minima of radially symmetric functionals of the gradient.

1994 A., Cellina; Perrotta, Stefania

On the closure of reachable sets for control systems.

1994 Perrotta, Stefania

On the minimum problem for nonconvex, multiple integrals of product type

2001 P., Celada; Perrotta, Stefania

On the validity of the maximum principle and of the Euler-Lagrange equation for a minimum problem depending on the gradient

1998 A., Cellina; Perrotta, Stefania

Polyconvex energies and cavitation

2013 P., Celada; Perrotta, Stefania

Vectorial Hamilton-Jacobi equations with rank one affine dependence on the gradient.

2000 P., Celada; Perrotta, Stefania

Titolo	Data di pubblicazione	Autore(i)
A correction of the paper "On minima of radially symmetric functionals of the gradient"	1-gen-2008	A., Cellina; Perrotta, Stefania
Evolution equations with nonlocal multivalued Cauchy problems	1-gen-2024	Malaguti, L.; Perrotta, S.
Exact controllability of infinite dimensional systems with controls of minimal norm	1-gen-2019	Malaguti, Luisa; Perrotta, Stefania; Taddei, Valentina
Existence of minimizers for nonconvex, noncoercive simple integrals.	1-gen-2002	P., Celada; Perrotta, Stefania
Existence of solutions for a class of non convex minimum problems	1-gen-1998	P., Celada; Perrotta, Stefania; G., Treu
Functions with prescribed singular values of the gradient.	1-gen-1998	P., Celada; Perrotta, Stefania
Local Lipschitz continuity for energy integrals with slow growth	1-gen-2022	Eleuteri, M.; Marcellini, P.; Mascolo, E.; Perrotta, S.
Lp-exact controllability of partial differential equations with nonlocal terms	1-gen-2022	Malaguti, Luisa; Perrotta, Stefania; Taddei, Valentina
Minimizing non-convex multiple integrals: a density result.	1-gen-2000	P., Celada; Perrotta, Stefania
Minimizing nonconvex, simple integrals of product type	1-gen-2001	P., Celada; Perrotta, Stefania
Nonconvex variational problems related to a hyperbolic equation	1-gen-1999	F., FLORES BAZAN; Perrotta, Stefania
On a class of nonconvex Bolza problems related to Blatz-Ko elastic materials	1-gen-2007	P., Celada; Perrotta, Stefania
On a problem of potential wells.	1-gen-1995	A., Cellina; Perrotta, Stefania
On minima of radially symmetric functionals of the gradient.	1-gen-1994	A., Cellina; Perrotta, Stefania
On the closure of reachable sets for control systems.	1-gen-1994	Perrotta, Stefania
On the minimum problem for nonconvex, multiple integrals of product type	1-gen-2001	P., Celada; Perrotta, Stefania
On the validity of the maximum principle and of the Euler-Lagrange equation for a minimum problem depending on the gradient	1-gen-1998	A., Cellina; Perrotta, Stefania
Polyconvex energies and cavitation	1-gen-2013	P., Celada; Perrotta, Stefania
Vectorial Hamilton-Jacobi equations with rank one affine dependence on the gradient.	1-gen-2000	P., Celada; Perrotta, Stefania