Your search keyword '"Irene Benedetti"' showing total 22 results

1. Exact controllability for nonlocal semilinear differential inclusions

Author

Irene Benedetti and Angelica Palazzoni

Subjects

exact controllability, fixed point theorems, weak topology, gelfand triple, Analysis, QA299.6-433

Abstract

In this paper, we investigate the controllability of a class of semilinear differential inclusions in Hilbert spaces. Assuming the exact controllability of the associated linear problem, we establish sufficient conditions for achieving the exact controllability of the nonlinear problem. In infinite-dimensional spaces, the compactness of the evolution operator and the linear controllability condition are often incompatible. To address this, we avoid the compactness assumption on the semigroup by employing two distinct approaches: one based on weak topology, and the other on the concept of Gelfand triples. Furthermore, the problem we consider is that of nonlocal controllability, where the solution satisfies a nonlocal initial condition that depends on the behaviour of the solution over the entire time interval.

Published

2025

2. Nonlocal solutions of parabolic equations with strongly elliptic differential operators

Author

Luisa Malaguti, Irene Benedetti, and Valentina Taddei

Subjects

35K20 (Primary), 34B10, 47H11, 93D30 (Secondary), Parabolic equations, Boundary (topology), Lyapunov-like functions, Fixed point, 01 natural sciences, symbols.namesake, Mathematics - Analysis of PDEs, FOS: Mathematics, Boundary value problem, 0101 mathematics, Mathematics, Degree theory, Dirichlet conditions, Applied Mathematics, 010102 general mathematics, Mathematical analysis, Multipoint and mean value conditions, Analysis, Function (mathematics), Differential operator, Parabolic partial differential equation, 010101 applied mathematics, Bounded function, symbols, Analysis of PDEs (math.AP)

Abstract

The paper deals with second order parabolic equations on bounded domains with Dirichlet conditions in arbitrary Euclidean spaces. Their interest comes from being models for describing reaction–diffusion processes in several frameworks. A linear diffusion term in divergence form is included which generates a strongly elliptic differential operator. A further linear part, of integral type, is present which accounts of nonlocal diffusion behaviours. The main result provides a unifying method for studying the existence and localization of solutions satisfying nonlocal associated boundary conditions. The Cauchy multipoint and the mean value conditions are included in this investigation. The problem is transformed into its abstract setting and the proofs are based on the homotopic invariance of the Leray–Schauder topological degree. A bounding function (i.e. Lyapunov-like function) theory is developed, which is new in this infinite dimensional context. It allows that the associated vector fields have no fixed points on the boundary of their domains and then it makes possible the use of a degree argument.

Published

2019

3. Lyapunov Pairs in Semilinear Differential Problems with State-Dependent Impulses

Author

Irene Benedetti, Grzegorz Gabor, Tiziana Cardinali, and Paola Rubbioni

Subjects

Statistics and Probability, Lyapunov function, Pure mathematics, 0211 other engineering and technologies, Banach space, 010103 numerical & computational mathematics, 02 engineering and technology, Derivative, 01 natural sciences, symbols.namesake, Differential inclusion, 0101 mathematics, Mathematics, Numerical Analysis, 021103 operations research, Applied Mathematics, Differential inclusions, State dependent, symbols, Contingent derivative, Differential inclusions, State-dependent impulses, Lyapunov pairs, Contingent derivative, Geometry and Topology, State-dependent impulses, Lyapunov pairs, Analysis, Differential (mathematics)

Abstract

The paper deals with semilinear differential inclusions with state-dependent impulses in Banach spaces. Defining a suitable Banach space in which all the solutions can be embedded we prove the first existence result for at least one global mild solution of the problem considered. Then we characterize this result by means of a new definition of Lyapunov pairs. To this aim we give sufficient conditions for the existence of Lyapunov pairs in terms of a new concept of contingent derivative.

Published

2018

4. Well-Posedness for a System of Integro-Differential Equations

Author

Luca Bisconti and Irene Benedetti

Subjects

Integro-differential equations, Differential equation, Applied Mathematics, Mathematical analysis, Nonlocal evolution equations, 01 natural sciences, Spatial SIRS models, Term (time), 010101 applied mathematics, Nonlinear system, 0103 physical sciences, Quantitative Biology::Populations and Evolution, Uniqueness, 0101 mathematics, Epidemic model, 010301 acoustics, Analysis, Well posedness, Mathematics

Abstract

We give sufficient conditions for the existence, the uniqueness and the continuous dependence on initial data of the solution to a system of integro-differential equations with superlinear growth on the nonlinear term. As possible applications of our methods we consider two epidemic models: a perturbed versions of the well-known integro-differential Kendall SIR model, and a SIRS-like model.

Published

2020

5. Evolution fractional differential problems with impulses and nonlocal conditions

Author

Valeri Obukhovskii, Valentina Taddei, and Irene Benedetti

Subjects

Caputo fractional derivative, Semigroup, Applied Mathematics, Fixed-point theorem, Monotonic function, impulse functions, Impulse (physics), Evolution inclusions in abstract spaces, Lipschitz continuity, Impulse functions, Nonlocal initial conditions, Nonlinear system, Compact space, Caputo fractional derivative, impulse functions, nonlocal initial conditions, evolution inclusions in abstract spaces, evolution inclusions in abstract spaces, Discrete Mathematics and Combinatorics, Applied mathematics, nonlocal initial conditions, Fractional differential, Analysis, Mathematics

Abstract

We obtain existence results for mild solutions of a fractional differential inclusion subjected to impulses and nonlocal initial conditions. By means of a technique based on the weak topology in connection with the Glicksberg-Ky Fan Fixed Point Theorem we are able to avoid any hypotheses of compactness on the semigroup and on the nonlinear term and at the same time we do not need to assume hypotheses of monotonicity or Lipschitz regularity neither on the nonlinear term, nor on the impulse functions, nor on the nonlocal condition. An application to a fractional diffusion process complete the discussion of the studied problem. 200 words.

Published

2020

6. Existence results for evolution equations with superlinear growth

Author

Irene Benedetti and Eugénio M. Rocha

Subjects

Leray-Schauder continuation principle, Nemytski operator, Differential equation, Applied Mathematics, Mathematical analysis, Banach space, Mathematics::Analysis of PDEs, approximation solvability method, Nemytskii operator, Parabolic partial differential equation, Semilinear dierential equation, approximation solvability method, Leray-Schauder continuation principle, Linear map, Nonlinear system, Dissipative system, Semilinear dierential equation, Analysis, Sign (mathematics), Mathematics

Abstract

By combining an approximation technique with the Leray-Schauder continuation principle, we prove global existence results for semilinear differential equations involving a dissipative linear operator, generating an extendable compact $C_0$-semigroup of contractions, and a Caratheodory nonlinearity $f\colon [0,T] \times E \to F$, with $E$ and $F$ two real Banach spaces such that $E \subseteq F$, besides imposing other conditions. The case $E\neq F$ allows to treat, as an application, parabolic equations with continuous superlinear nonlinearities which satisfy a sign condition.

Published

2019

7. On Noncompact Fractional Order Differential Inclusions with Generalized Boundary Condition and Impulses in a Banach Space

Author

Irene Benedetti, Valentina Taddei, and Valeri Obukhovskii

Subjects

education.field_of_study, Article Subject, Weak topology, lcsh:Mathematics, Mathematical analysis, Eberlein–Šmulian theorem, Population, Banach space, Fixed point theorems, lcsh:QA1-939, impulsive problems, Nonlinear system, Compact space, Differential inclusion, Fractional differential inclusions, Fixed point theorems, impulsive problems, Fractional differential inclusions, Boundary value problem, education, Analysis, inclusioni differenziali frazionarie, condizioni non locali, teoremi di punto fisso, modelli di dinamica della popolazione, Mathematics

Abstract

We provide existence results for a fractional differential inclusion with nonlocal conditions and impulses in a reflexive Banach space. We apply a technique based on weak topology to avoid any kind of compactness assumption on the nonlinear term. As an example we consider a problem in population dynamic described by an integro-partial-differential inclusion.

Published

2015

8. Nonlocal Problems for Differential Inclusions in Hilbert Spaces

Author

Nguyen Van Loi, Luisa Malaguti, and Irene Benedetti

Subjects

Statistics and Probability, Differential inclusion, Numerical Analysis, Pure mathematics, Applied Mathematics, Feedback control, Differential inclusion, Nonlocal condition, Topological degree, Approximation solvability method, Hartman-type inequality, Mathematical analysis, Mean value, Hilbert space, First-order partial differential equation, Existence theorem, Nonlocal condition, Topological degree, Approximation solvability method, Hartman-type inequality, symbols.namesake, symbols, Geometry and Topology, Analysis, Mathematics

Abstract

An existence theorem for differential inclusions in Hilbert spaces with nonlocal conditions is proved. Periodic, anti-periodic, mean value and multipoint conditions are included in this study. The investigation is based on a combination of the approximation solvability method with Hartman-type inequalities. A feedback control problem associated to a first order partial differential equation completes this discussion.

Published

2014

9. On generalized boundary value problems for a class of fractional differential inclusions

Author

Valeri Obukhovskii, Irene Benedetti, and Valentina Taddei

Subjects

Class (set theory), Pure mathematics, Applied Mathematics, 010102 general mathematics, nonlocal conditions, Fixed-point theorem, fixed point theorem, fractional derivative, 01 natural sciences, nonlocal conditions, fixed point theorem, fractional derivative, Fractional calculus, 010101 applied mathematics, Boundary value problem, Nonlocal conditions, 0101 mathematics, Fractional differential, Analysis, Nonlocal conditions, fixed point theorem, fractional derivative, Mathematics

Published

2017

10. Nonlocal diffusion second order partial differential equations

Author

Luisa Malaguti, Irene Benedetti, Valentina Taddei, and Nguyen Van Loi

Subjects

Partial differential equation, Degree theory, Differential equation, Applied Mathematics, Nonlocal diffusion, 010102 general mathematics, Mathematical analysis, Second order integro-partial differential equation, Approximation solvability method, Periodic solution, Nonlocal condition, Cauchy distribution, 01 natural sciences, 010101 applied mathematics, Sobolev space, Compact space, Bounded function, Standard probability space, Embedding, 0101 mathematics, Analysis, Mathematics

Abstract

The paper deals with a second order integro-partial differential equation in R n with a nonlocal, degenerate diffusion term. Nonlocal conditions, such as the Cauchy multipoint and the weighted mean value problem, are investigated. The existence of periodic solutions is also studied. The dynamic is transformed into an abstract setting and the results come from an approximation solvability method. It combines a Schauder degree argument with an Hartman-type inequality and it involves a Scorza-Dragoni type result. The compact embedding of a suitable Sobolev space in the corresponding Lebesgue space is the unique amount of compactness which is needed in this discussion. The solutions are located in bounded sets and they are limits of functions with values in finitely dimensional spaces.

Published

2017

11. An approximation solvability method for nonlocal semilinear differential problems in Banach spaces

Author

Irene Benedetti, Nguyen Van Loi, and Valentina Taddei

Subjects

Weak topology, Differential equation, nonlocal condition, Banach space, nonlocal diffusion, 01 natural sciences, Approximation solvability method, Degree theory, Nonlocal condition, Nonlocal diffusion, Semilinear differential equation, Analysis, Discrete Mathematics and Combinatorics, Applied Mathematics, 0101 mathematics, C0-semigroup, Mathematics, Semigroup, degree theory, 010102 general mathematics, Mathematical analysis, approximation solvability method, Semilinear differential equation, nonlocal diffusion, approximation solvability method, nonlocal condition, degree theory, 010101 applied mathematics, Nonlinear system, Compact space, Differential (mathematics)

Abstract

A new approximation solvability method is developed for the study of semilinear differential equations with nonlocal conditions without the compactness of the semigroup and of the nonlinearity. The method is based on the Yosida approximations of the generator of C0-semigroup, the continuation principle, and the weak topology. It is shown how the abstract result can be applied to study the reaction-diffusion models.

Published

2017

12. Semilinear differential inclusions via weak topologies

Author

Valentina Taddei, Luisa Malaguti, and Irene Benedetti

Subjects

Mathematics::Functional Analysis, Pure mathematics, Applied Mathematics, Mathematical analysis, Eberlein–Šmulian theorem, Banach space, Banach manifold, Semilinear differential inclusions in Banach spaces Compact operators Continuation principles Pushing condition, semilinear differential inclusions in Banach spaces, Compact operator, Separable space, compact operators, continuation principles, pushing condition, Sobolev space, Besov space, Interpolation space, Analysis, Mathematics

Abstract

The paper deals with the multivalued initial value problem x ′ ∈ A ( t , x ) x + F ( t , x ) for a.a. t ∈ [ a , b ] , x ( a ) = x 0 in a separable, reflexive Banach space E . The nonlinearity F is weakly upper semicontinuous in x and the investigation includes the case when both A and F have a superlinear growth in x . We prove the existence of local and global classical solutions in the Sobolev space W 1 , p ( [ a , b ] , E ) with 1 p ∞ . Introducing a suitably defined Lyapunov-like function, we are able to investigate the topological structure of the solution set. Our main tool is a continuation principle in Frechet spaces and we prove the required pushing condition in two different ways. Some examples complete the discussion.

Published

2010

13. Regularity of minimizers for nonconvex vectorial integrals withp-qgrowth via relaxation methods

Author

Elvira Mascolo and Irene Benedetti

Subjects

Applied Mathematics, media_common.quotation_subject, Mathematical analysis, Regular polygon, Structure (category theory), Relaxation (iterative method), Anisotropic growth, Lipschitz continuity, Infinity, Convexity, Analysis, Variable (mathematics), Mathematics, media_common

Abstract

Local Lipschitz continuity of local minimizers of vectorial integrals∫Ω f(x,Du)dxis proved whenfsatisfiesp-qgrowth condition andξ↦f(x,ξ)is not convex. The uniform convexity and the radial structure condition with respect to the last variable are assumed only at infinity. In the proof, we use semicontinuity and relaxation results for functionals with nonstandard growth.

Published

2004

14. A further generalization of midpoint convexity of multimaps towards common fixed point Theorems and applications

Author

Irene Benedetti and Anna Martellotti

Subjects

Pure mathematics, Generalization, Applied Mathematics, Mathematical analysis, Fixed-point theorem, Multimap, midpoint convexity, Minimax, Midpoint, Common fixed points, midpoint convexity, commuting families of multimaps, best approximations, variational inequalities, Convexity, Compact space, Variational inequality, Common fixed points, commuting families of multimaps, Analysis, best approximations, variational inequalities, Mathematics

Abstract

We furtherly generalize midpoint convexity for multivalued maps and derive Fixed Point Theorems and Common Fixed Point Theorems without requiring strong compactness. As an application we obtain some Best Approximation results, and minimax and variational inequalities.

Published

2015

15. Controllability for systems governed by semilinear evolution inclusions without compactness

Author

Irene Benedetti, Valeri Obukhovskii, and Valentina Taddei

Subjects

education.field_of_study, Semilinear evolution equations and inclusions. Controllability. Fixed point theorems, Weak topology, Applied Mathematics, Population, Mathematical analysis, Banach space, Controllability, Nonlinear system, Compact space, Differential inclusion, Bounded function, education, Analysis, Mathematics

Abstract

In this paper we study the controllability for a class of semilinear differential inclusions in Banach spaces. Since we assume the regularity of the nonlinear part with respect to the weak topology, we do not require the compactness of the evolution operator generated by the linear part. As well we are not posing any conditions on the multivalued nonlinearity expressed in terms of measures of noncompactness. We are considering the usual assumption on the controllability of the associated linear problem. Notice that, in infinite dimensional spaces, the above mentioned compactness of the evolution operator and linear controllability condition are in contradiction with each other. We suppose that the nonlinear term has convex, closed, bounded values and a weakly sequentially closed graph when restricted to its second argument. This regularity setting allows us to solve controllability problem under various growth conditions. As application, a controllability result for hyperbolic integro-differential equations and inclusions is obtained. In particular, we consider controllability of a system arising in a model of nonlocal spatial population dispersal and a system governed by the second order one-dimensional telegraph equation.

Published

2014

16. Evolution Problems with Nonlinear Nonlocal Boundary Conditions

Author

Valentina Taddei, Irene Benedetti, and Martin Väth

Subjects

Nonlocal boundary condition, Class (set theory), Conservation law, Function triple degree, Partial differential equation, Nonlinear boundary condition, nonlocal boundary condition, function triple degree, nonlinear Fredholm map, semilinear partial differential equation, nonuniqueness, age-population model, profile-preserving growth, Nonlinear Fredholm map, Mathematical analysis, Semilinear partial differential equation, Nonlinear boundary condition, Mixed boundary condition, Nonlinear system, Ordinary differential equation, Age-population model, Initial value problem, Age-population model, Function triple degree, Nonlinear boundary condition, Nonlinear Fredholm map, Nonlocal boundary condition, Nonuniqueness, Profile-preserving growth, Semilinear partial differential equation, Boundary value problem, Profile-preserving growth, Analysis, Mathematics, Nonuniqueness

Abstract

Weprovideanewapproachtoobtainsolutionsofevolutionequationswithnonlin- ear and nonlocal in time boundary conditions. Both, compact and noncompact semigroups are considered. As an example we show a "principle of huge growth": every control of a reaction-diffusion system necessarily leads to a profile preserving nonlinear huge growth for an appropriate initial value condition. As another example we apply the approach with noncompact semigroups also to a class of age-population models, based on a hyperbolic conservation law.

Published

2013

17. Existence for Competitive Equilibrium by Means of Generalized Quasivariational Inequalities

Author

Monica Milasi, Maria Bernadette Donato, and Irene Benedetti

Subjects

Consumption (economics), Mathematical optimization, Inequality, Economic equilibrium, Article Subject, Applied Mathematics, media_common.quotation_subject, lcsh:Mathematics, Generalized quasi-variational inequalities, competitive equilibrium, Competitive equilibrium, lcsh:QA1-939, Production (economics), Mathematical economics, Analysis, media_common, Mathematics

Abstract

A competitive economic equilibrium model integrated with exchange, consumption, and production is considered. Our goal is to give an existence result when the utility functions are concave, proper, and upper semicontinuous. To this aim we are able to characterize the equilibrium by means of a suitable generalized quasi-variational inequality; then we give the existence of equilibrium by using the variational approach.

Published

2013

18. Semilinear inclusions with nonlocal conditions without compactness in non-reflexive spaces

Author

Irene Benedetti and Martin Väth

Subjects

Nonlocal boundary condition, Pure mathematics, Fixed point theorems with weak topology, 021103 operations research, Weak topology, Applied Mathematics, Operator (physics), 010102 general mathematics, Mathematical analysis, 0211 other engineering and technologies, Nonlocal boundary, semilinear dierential inclusion, 02 engineering and technology, Weak measure of noncompactness, Weakly condensing map, Containment result, 01 natural sciences, Measure (mathematics), Compact space, Initial value problem, 0101 mathematics, Value (mathematics), Analysis, Mathematics

Abstract

An existence result for an abstract nonlocal boundary value problem $x'\in A(t)x(t)+F(t,x(t))$, $Lx\in B(x)$, is given, where $A(t)$ determines a linear evolution operator, $L$ is linear, and $F$ and $B$ are multivalued. To avoid compactness conditions, the weak topology is employed. The result applies also in nonreflexive spaces under a hypothesis concerning the De Blasi measure of noncompactness. Even in the case of initial value problems, the required condition is essentially milder than previously known results.

Published

2016

19. Two-points b.v.p. for multivalued equations with weakly regular r.h.s

Author

Luisa Malaguti, Irene Benedetti, and Valentina Taddei

Subjects

Floquet theory, Multivalued boundary value problems, fixed points theorems, Transversality, Sublinear function, Applied Mathematics, Mathematical analysis, Banach space, Multivalued boundary value problems. Differential inclusions in Banach spaces. Compact operators. Fixed point theorems, Compact operator, Nonlinear system, Differential inclusion, differential inclusions in Banach spaces, Boundary value problem, compact operators, Analysis, Mathematics

Abstract

A two-point boundary value problem associated to a semilinear multivalued evolution equation is investigated, in reflexive and separable Banach spaces. To this aim, an original method is proposed based on the use of weak topologies and on a suitable continuation principle in Frechet spaces. Lyapunov-like functions are introduced, for proving the required transversality condition. The linear part can also depend on the state variable x and the discussion comprises the cases of a nonlinearity with sublinear growth in x or of a noncompact valued one. Some applications are given, to the study of periodic and Floquet boundary value problems of partial integro-differential equations and inclusions appearing in dispersal population models. Comparisons are included, with recent related achievements.

Published

2011

20. On the Index of Solvability for Variational Inequalities in Banach Spaces

Author

Irene Benedetti and Valeri Obukhovskii

Subjects

Pure mathematics, Index (economics), approximable multimap, variational inequality, index of solvability, pseudo-monotone multimap, Galerkin approximation, topological degree, Applied Mathematics, Minimization problem, Mathematical analysis, Banach space, Zero (complex analysis), Type (model theory), Multimap, Separable space, Variational inequality, Analysis, Mathematics

Abstract

We define the index of solvability, a topological characteristic, whose difference from zero provides the existence of a solution for variational inequalities of Stampacchia’s type with S +-type and pseudo-monotone multimaps on reflexive separable Banach spaces. Some applications to a minimization problem and to a problem of economical dynamics are presented.

Published

2008

21. Erratum and addendum to 'Two-point b.v.p. for multivalued equations with weakly regular r.h.s.'

Author

Luisa Malaguti, Irene Benedetti, and Valentina Taddei

Subjects

Discrete mathematics, Multivalued boundary value problems, Multivalued function, Applied Mathematics, Regular polygon, Mathematics::General Topology, Addendum, Compact operator, Combinatorics, Compact operators, Topological index, Metrization theorem, Locally convex topological vector space, Differential inclusions in Banach spaces, Fixed points theorems, Order (group theory), Analysis, Multivalued boundary value problems. Differential inclusions in Banach spaces. Compact operators. Fixed points theorems, Mathematics

Abstract

In this paper, we define a topological index for compact multivalued maps in convex metrizable subsets of a locally convex topological vector space in order to correct the proofs of Theorems 4.1 and 4.2 in Benedetti et al. (2011) [1] .

Published

2012

22. Nonlocal semilinear evolution equations without strong compactness: theory and applications

Author

Luisa Malaguti, Valentina Taddei, and Irene Benedetti

Subjects

Diffusion problem, Partial differential equation, Algebra and Number Theory, Mathematical analysis, First-order partial differential equation, Nonlocal condition, nonlocal condition, semilinear evolution equation, fixed point theorems, optimal feedback control problem, diffusion problem, age-structure population model, Fixed point theorems, Parabolic partial differential equation, Elliptic partial differential equation, Age-structure population model, Free boundary problem, Boundary value problem, Age-structure population model, Diffusion problem, Fixed point theorems, Nonlocal condition, Optimal feedback control problem, Semilinear evolution equation, C0-semigroup, Semilinear evolution equation, Hyperbolic partial differential equation, Optimal feedback control problem, Analysis, Mathematics

Abstract

A semilinear multivalued evolution equation is considered in a reflexive Banach space. The nonlinear term has convex, closed, bounded values and a weakly sequentially closed graph when restricted to its second argument. No strong compactness is assumed, neither on the evolution operator generated by the linear part, or on the nonlinear term. A wide family of nonlocal associated boundary value problems is investigated by means of a fixed point technique. Applications are given to an optimal feedback control problem, to a nonlinear hyperbolic integro-differential equation arising in age-structure population models, and to a multipoint boundary value problem associated to a parabolic partial differential equation. MSC:34G25, 34B10, 34B15, 47H04, 28B20, 34H05.