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22 results on '"Ftouhi, Ilias"'

1. On a Pólya’s inequality for planar convex sets

Author

Ftouhi, Ilias

Subjects
Mathematics, QA1-939
Abstract

In this short note, we prove that for every bounded, planar and convex set $\Omega $, one has \[ \frac{\lambda _1(\Omega )T(\Omega )}{|\Omega |}\le \frac{\pi ^2}{12}\cdot \left(1+\sqrt{\pi }\frac{r(\Omega )}{\sqrt{|\Omega |}}\right)^2, \] where $\lambda _1$, $T$, $r$ and $|{\,\cdot \,}|$ are the first Dirichlet eigenvalue, the torsion, the inradius and the volume. The inequality is sharp as the equality asymptotically holds for any family of thin collapsing rectangles.As a byproduct, we obtain the following bound for planar convex sets \[ \frac{\lambda _1(\Omega )T(\Omega )}{|\Omega |}\le \frac{\pi ^2}{12}\left(1+\frac{2\sqrt{2(6+\pi ^2)}-\pi ^2}{4+\pi ^2}\right)^2\approx 0.996613\dots \] which improves Polyá’s inequality $\frac{\lambda _1(\Omega )T(\Omega )}{|\Omega |}

Published
2022
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2. Where to place a spherical obstacle so as to maximize the first nonzero Steklov eigenvalue

Author

Ftouhi, Ilias

Subjects
Mathematics - Optimization and Control
Abstract

We prove that among all doubly connected domains of $\mathbb{R}^n$ of the form $B_1\backslash \overline{B_2}$, where $B_1$ and $B_2$ are open balls of fixed radii such that $\overline{B_2}\subset B_1$, the first nonzero Steklov eigenvalue achieves its maximal value uniquely when the balls are concentric. Furthermore, we show that the ideas of our proof also apply to a mixed boundary conditions eigenvalue problem found in literature.

Published
2025

3. The diagram $(\lambda_1,\mu_1)$

Author

Ftouhi, Ilias and Henrot, Antoine

Subjects
Mathematics - Optimization and Control
Abstract

In this paper, we are interested in the possible values taken by the pair $(\lambda_1(\Omega), \mu_1(\Omega))$ the first eigenvalues of the Laplace operator with Dirichlet and Neumann boundary conditions respectively of a bounded plane domain $\Omega$. We prove that, without any particular assumption on the class of open sets $\Omega$, the two classical inequalities (the Faber-Krahn inequality and the Weinberger inequality) provide a complete system of inequalities. Then we consider the case of convex plane domains for which we give new inequalities for the product $\lambda_1 \mu_1$. We plot the so-called Blaschke--Santal\'o diagram and give some conjectures.

Published
2025

4. Complete systems of inequalities relating the perimeter, the area and the Cheeger constant of planar domains

Author

Ftouhi, Ilias

Subjects
Mathematics - Optimization and Control
Abstract

The object of the paper is to find complete systems of inequalities relating the perimeter $P$, the area $|\cdot|$ and the Cheeger constant $h$ of planar sets. To do so, we study the so called Blaschke--Santal\'o diagram of the triplet $(P,h,|\cdot|)$ for different classes of domains: simply connected sets, convex sets and convex polygons with at most $N$ sides. We completely determine the diagram in the latter cases except for the class of convex $N$-gons when $N\ge 5$ is odd: therein, we show that the boundary of the diagram is given by the graphs of two continuous and strictly increasing functions. An explicit formula for the lower one and a numerical method to obtain the upper one is provided. At last, some applications of the results are presented.

Published
2025

5. Improved description of Blaschke--Santal\'o diagrams via numerical shape optimization

Author

Ftouhi, Ilias

Subjects
Mathematics - Optimization and Control
Abstract

We propose a method based on the combination of theoretical results on Blaschke--Santal\'o diagrams and numerical shape optimization techniques to obtain improved description of Blaschke--Santal\'o diagrams in the class of planar convex sets. To illustrate our approach, we study three relevant diagrams involving the perimeter $P$, the diameter $d$, the area $A$ and the first eigenvalue of the Laplace operator with Dirichlet boundary condition $\lambda_1$. The first diagram is a purely geometric one involving the triplet $(P,d,A)$ and the two other diagrams involve geometric and spectral functionals, namely $(P,\lambda_1,A)$ and $(d,\lambda_1,A)$ where a strange phenomenon of non-continuity of the extremal shapes is observed.

Published
2025

6. Optimal $L^p$-approximation of convex sets by convex subsets

Author

Fattah, Zakaria, Ftouhi, Ilias, and Zuazua, Enrique

Subjects
Mathematics - Optimization and Control
Abstract

Given a convex set $\Omega$ of $\mathbb{R}^n$, we consider the shape optimization problem of finding a convex subset $\omega\subset \Omega$, of a given measure, minimizing the $p$-distance functional $$\mathcal{J}_p(\omega) := \left(\int_{\mathbb{S}^{n-1}} |h_\Omega-h_\omega|^p d\mathcal{H}^{n-1}\right)^{\frac{1}{p}},$$ where $1 \le p <\infty$ and $h_\omega$ and $h_\Omega$ are the support functions of $\omega$ and the fixed container $\Omega$, respectively. We prove the existence of solutions and show that this minimization problem $\Gamma$-converges, when $p$ tends to $+\infty$, towards the problem of finding a convex subset $\omega\subset \Omega$, of a given measure, minimizing the Hausdorff distance to the convex $\Omega$. In the planar case, we show that the free parts of the boundary of the optimal shapes, i.e., those that are in the interior of $\Omega$, are given by polygonal lines. Still in the $2-d$ setting, from a computational perspective, the classical method based on optimizing Fourier coefficients of support functions is not efficient, as it is unable to efficiently capture the presence of segments on the boundary of optimal shapes. We subsequently propose a method combining Fourier analysis and a recent numerical scheme, allowing to obtain accurate results, as demonstrated through numerical experiments.

Published
2025

7. The monotonicity of the Cheeger constant for parallel bodies

Author

Ftouhi, Ilias

Subjects
Mathematics - Optimization and Control
Abstract

We prove that for every planar convex set $\Omega$, the function $t\in (-r(\Omega),+\infty)\longmapsto \sqrt{|\Omega_t|}h(\Omega_t)$ is monotonically decreasing, where $r$, $|\cdot|$ and $h$ stand for the inradius, the measure and the Cheeger constant and $(\Omega_t)$ for parallel bodies of $\Omega$. The result is shown to not hold when the convexity assumption is dropped. We also prove the differentiability of the map $t\longmapsto h(\Omega_t)$ in any dimension and without any regularity assumption on $\Omega$, obtaining an explicit formula for the derivative. Those results are then combined to obtain estimates on the contact surface of the Cheeger sets of convex bodies. Finally, potential generalizations to other functionals such as the first eigenvalue of the Dirichlet Laplacian are explored.

Published
2024

8. Sharp inequalities involving the Cheeger constant of planar convex sets

Author

Ftouhi, Ilias, Masiello, Alba Lia, and Paoli, Gloria

Subjects
Mathematics - Analysis of PDEs, 52A10, 52A40, 65K15
Abstract

We are interested in finding sharp bounds for the Cheeger constant $h$ via different geometrical quantities, namely the area $|\cdot|$, the perimeter $P$, the inradius $r$, the circumradius $R$, the minimal width $\omega$ and the diameter $d$. We provide new sharp inequalities between these quantities for planar convex bodies and enounce new conjectures based on numerical simulations. In particular, we completely solve the Blaschke-Santal\'o diagrams describing all the possible inequalities involving the triplets $(P,h,r)$, $(d,h,r)$ and $(R,h,r)$ and describe some parts of the boundaries of the diagrams of the triplets $(\omega,h,d)$, $(\omega,h,R)$, $(\omega,h,P)$, $(\omega,h,|\cdot|)$, $(R,h,d)$ and $(\omega,h,r)$., Comment: 38 pages, 20 figures

Published
2022

12. Complete systems of inequalities relating the perimeter, the area and the Cheeger constant of planar domains.

Author

Ftouhi, Ilias

Subjects
*CONVEX sets
Abstract

The object of the paper is to find complete systems of inequalities relating the perimeter P , the area | ⋅ | and the Cheeger constant h of planar sets. To do so, we study the so-called Blaschke–Santaló diagram of the triplet (P , h , | ⋅ |) for different classes of domains: simply connected sets, convex sets and convex polygons with at most N sides. We completely determine the diagram in the latter cases except for the class of convex N -gons when N ≥ 5 is odd: therein, we show that the boundary of the diagram is given by the graphs of two continuous and strictly increasing functions. An explicit formula for the lower one and a numerical method to obtain the upper one is provided. At last, some applications of the results are presented. [ABSTRACT FROM AUTHOR]

Published
2023
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14. On a Pólya's inequality for planar convex sets

Author

Ftouhi, Ilias, Friedrich-Alexander Universität Erlangen-Nürnberg (FAU), and ftouhi, ilias

Subjects
[MATH.MATH-SP] Mathematics [math]/Spectral Theory [math.SP], [MATH.MATH-SP]Mathematics [math]/Spectral Theory [math.SP]
Abstract

In this short note, we prove that for every bounded, planar and convex set Ω: λ1(Ω)T (Ω) |Ω| ≤ π 2 12 1 + 2 2(6 + π 2) − π 2 4 + π 2 2 ≈ 0.996613... where λ1, T and | • | are the first Dirichlet eigenvalue, the torsion and the measure. This bound improves the one provided in [8], which is also an improvement of Pólya's inequality λ 1 (Ω)T (Ω) |Ω| < 1 in the case of planar convex sets.

Published
2021

15. The diagram (λ 1 , µ 1 )

Author

Ftouhi, Ilias, Henrot, Antoine, ftouhi, ilias, and APPEL À PROJETS GÉNÉRIQUE 2018 - Optimisation de forme - - SHAPO2018 - ANR-18-CE40-0013 - AAPG2018 - VALID

Subjects
Blaschke-Santaló diagrams, convex sets, complete systems of inequalities, [MATH] Mathematics [math], Mathematics::Spectral Theory, sharp spectral inequalities
Abstract

In this paper we are interested in the possible values taken by the pair (λ1(Ω), µ1(Ω) the first eigenvalues of the Laplace operator with Dirichlet and Neumann boundary conditions respectively of a bounded plane domain Ω. We prove that, without any particular assumption on the class of open sets Ω, the two classical inequalities (the Faber-Krahn inequality and the Weinberger inequality) provide a complete system of inequalities. Then we consider the case of convex plane domains for which we give new inequalities for the product λ1µ1. We plot the so-called Blaschke-Santaló diagram and give some conjectures.

Published
2021

17. Where to place a spherical obstacle so as to maximize the first Steklov eigenvalue

Author

Ftouhi, Ilias, Institut de Mathématiques de Jussieu - Paris Rive Gauche (IMJ-PRG (UMR_7586)), Université Paris Diderot - Paris 7 (UPD7)-Sorbonne Université (SU)-Centre National de la Recherche Scientifique (CNRS), and ftouhi, ilias

Subjects
[MATH.MATH-AP]Mathematics [math]/Analysis of PDEs [math.AP], [MATH.MATH-OC] Mathematics [math]/Optimization and Control [math.OC], [MATH.MATH-OC]Mathematics [math]/Optimization and Control [math.OC], [MATH.MATH-CA]Mathematics [math]/Classical Analysis and ODEs [math.CA], [MATH.MATH-AP] Mathematics [math]/Analysis of PDEs [math.AP], Mathematics::Spectral Theory, [MATH.MATH-CA] Mathematics [math]/Classical Analysis and ODEs [math.CA]
Abstract

We prove that the first non-trivial Steklov eigenvalue of a spherical shell is maximal when the balls are concentric. Furthermore, we show that the ideas of our proof also apply to a mixed boundary conditions eigenvalue problem found in literature.; We prove that the first non-trivial Steklov eigenvalue of a spherical shell is maximal when the balls are concentric. We also show that the ideas used may apply to a mixed boundary conditions eigenvalue problem found in literature.

Published
2019

18. Complete systems of inequalities relating the perimeter, the area and the Cheeger constant of planar domains

Author

Ftouhi, Ilias, Institut de Mathématiques de Jussieu - Paris Rive Gauche (IMJ-PRG (UMR_7586)), and Sorbonne Université (SU)-Centre National de la Recherche Scientifique (CNRS)-Université de Paris (UP)

Subjects
sharp spectral inequalities AMS classification:: 52A10, Blaschke-Santaló diagrams, 49R99, convex sets, Applied Mathematics, General Mathematics, complete systems of inequalities, 52A40, 65K15, Cheeger constant, [MATH]Mathematics [math]
Abstract

The object of the paper is to find complete systems of inequalities relating the perimeter [Formula: see text], the area [Formula: see text] and the Cheeger constant [Formula: see text] of planar sets. To do so, we study the so-called Blaschke–Santaló diagram of the triplet [Formula: see text] for different classes of domains: simply connected sets, convex sets and convex polygons with at most [Formula: see text] sides. We completely determine the diagram in the latter cases except for the class of convex [Formula: see text]-gons when [Formula: see text] is odd: therein, we show that the boundary of the diagram is given by the graphs of two continuous and strictly increasing functions. An explicit formula for the lower one and a numerical method to obtain the upper one is provided. At last, some applications of the results are presented.

Published
2021

19. Diagrammes de Blaschke-Santaló et autres problèmes en optimisation de forme

Author

Ftouhi, Ilias, Institut de Mathématiques de Jussieu - Paris Rive Gauche (IMJ-PRG (UMR_7586)), Sorbonne Université (SU)-Centre National de la Recherche Scientifique (CNRS)-Université de Paris (UP), Sorbonne Université, Jimmy Lamboley, and Antoine Henrot

Subjects
Convex analysis, Diagrammes de Blaschke-Santaló, Blaschke-Santaló diagrams, Optimal placement of an obstacle, Shape optimization, Placement optimal d'un obstacle, Analyse convexe, Théorie spectrale, Optimisation de forme, [MATH.MATH-OC]Mathematics [math]/Optimization and Control [math.OC], Spectral theory, Analyse numérique, Numerical analysis
Abstract

The present thesis is a contribution to the field of calculus of variations and more precisely the discipline of shape optimization. We are interested in the major part of this work in the study of sharp inequalities relating different geometric and spectral quantities for various classes of sets, this is tightly related to the study of the so called Blaschke-Santaló diagrams that allow to visualise the possible inqualities relating 3 given shape functionals. We develop different techniques that allow to prove qualitative results on these diagrams and propose a numerical approach in order to provide optimal approximations of them. We are also interested by the study of the Cheeger inequality, that relates the Cheeger constant and the first eigenvalue of the Laplace operator with Dirichlet boundary condition, for convex domains. At last, we focus on the problem of finding the optimal placement of a spherical obstacle so as to maximize the first Laplace eigenvalue with Steklov boundary conditions.; La présente thèse est une contribution au domaine des calculs de variations et plus précisément la discipline d'optimisation de forme. Nous nous intéressons dans la majeure partie de ce travail à l'étude d’inégalités optimales reliant différentes quantités géométriques et spectrales sur plusieurs classes d'ensembles, ceci passe par l'étude de diagrammes dits de Blaschke-Santaló qui permettent de visualiser les inégalités possibles reliant 3 fonctionnelles de forme données. Nous développons différentes techniques qui permettent de démontrer des résultats qualitatifs sur ces diagrammes et proposons une approche numérique pour en fournir une approximation optimale. Nous nous intéressons aussi à l'étude de l'inégalité de Cheeger, qui est une inégalité classique reliant la première valeur propre du Laplacien avec condition Dirichlet au bord et la constante de Cheeger, pour les domaines convexes. Enfin, nous nous penchons sur le problème de trouver l'emplacement optimal d'un obstacle sphérique contenu dans une boule qui permet de maximiser la première valeur propre du Laplacien avec conditions aux bord de type Steklov.

Published
2021

21. THE DIAGRAM (λ1, μ1).

Author

FTOUHI, ILIAS and HENROT, ANTOINE

Subjects
CONVEX sets, NEUMANN boundary conditions, DIRICHLET principle, LOGICAL prediction, MATHEMATICAL models
Abstract

In this paper we are interested in the possible values taken by the pair (λ1(Ω); μ1(Ω)) the first eigenvalues of the Laplace operator with Dirichlet and Neumann boundary conditions respectively of a bounded plane domain Ω. We prove that, without any particular assumption on the class of open sets Ω, the two classical inequalities (the Faber-Krahn inequality and the Weinberger inequality) provide a complete system of inequalities. Then we consider the case of convex plane domains for which we give new inequalities for the product λ1μ1. We plot the so-called Blaschke-Santaló diagram and give some conjectures. [ABSTRACT FROM AUTHOR]

Published
2022

22. Optimal design of sensors via geometric criteria

Author

Ilias Ftouhi, Enrique Zuazua, and ftouhi, ilias

Subjects
Geometry and Topology, [MATH] Mathematics [math]
Abstract

We consider a convex set $$\Omega $$ Ω and look for the optimal convex sensor $$\omega \subset \Omega $$ ω ⊂ Ω of a given measure that minimizes the maximal distance to the points of $$\Omega .$$ Ω . This problem can be written as follows $$\begin{aligned} \inf \{d^H(\omega ,\Omega ) \ |\ |\omega |=c\ \text {and}\ \omega \subset \Omega \}, \end{aligned}$$ inf { d H ( ω , Ω ) | | ω | = c and ω ⊂ Ω } , where $$c\in (0,|\Omega |),$$ c ∈ ( 0 , | Ω | ) , $$d^H$$ d H being the Hausdorff distance. We show that the parametrization via the support functions allows us to formulate the geometric optimal shape design problem as an analytic one. By proving a judicious equivalence result, the shape optimization problem is approximated by a simpler minimization problem of a quadratic function under linear constraints. We then present some numerical results and qualitative properties of the optimal sensors and exhibit an unexpected symmetry breaking phenomenon.

Published
2023

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