Numerical Method for Finding Critical Points of Constrained Functions of Several Variables

Lehew, Glenn N.

January 1966

No description available.

Mathematics

Critical point theory

Mathematical analysis

Solving boundary value problems using critical point theory

Feller, Heidi.

January 1900

Thesis (Ph.D.)--University of Nebraska-Lincoln, 2008. / Title from title screen (site viewed Sept. 16, 2008). PDF text: vi, 91 p. : ill. ; 1 Mb. UMI publication number: AAT 3297751. Includes bibliographical references. Also available in microfilm and microfiche formats.

Eine Anwendung des Mountain-Pass-Lemmas auf den Fragenkreis des Plateauschen Problems und eine Alternative zur Drei-Ounkte-Bedingung /

Imbusch, Cordula.

January 1900

Thesis (doctoral)--Rheinische Friedrich-Wilhelms-Universität Bonn, 1997. / Includes bibliographical references (p. 133-134).

A Refined Saddle Point Theorem and Applications

Enniss, Harris

31 May 2012

Under adequate conditions on $g$, we show the density in $L^2((0,\pi),(0,2\pi))$ of the set of functions $p$ for which \begin{equation*} u_{tt}(x,t)-u_{xx}(x,t)= g(u(x,t)) + p(x,t) \end{equation*} has a weak solution subject to \begin{equation*} \begin{aligned} u(x,t)&=u(x,t+2\pi)\\ u(0,t)&=u(\pi,t)=0. \end{aligned} \end{equation*} To achieve this, we prove a Saddle Point Principle by means of a refined variant of the deformation lemma of Rabinowitz. Generally, inf-sup techniques allow the characterization of critical values by taking the minimum of the maximae on some particular class of sets. In this version of the Saddle Point Principle, we introduce sufficient conditions for the existence of a saddle-structure which is not restricted to finite-dimensional subspaces.

35L05 Wave equation

58E05 Abstract critical point theory

On Critical Points of Random Polynomials and Spectrum of Certain Products of Random Matrices

Annapareddy, Tulasi Ram Reddy

January 2015

In the first part of this thesis, we study critical points of random polynomials. We choose two deterministic sequences of complex numbers, whose empirical measures converge to the same probability measure in complex plane. We make a sequence of polynomials whose zeros are chosen from either of sequences at random. We show that the limiting empirical measure of zeros and critical points agree for these polynomials. As a consequence we show that when we randomly perturb the zeros of a deterministic sequence of polynomials, the limiting empirical measures of zeros and critical points agree. This result can be interpreted as an extension of earlier results where randomness is reduced. Pemantle and Rivin initiated the study of critical points of random polynomials. Kabluchko proved the result considering the zeros to be i.i.d. random variables. In the second part we deal with the spectrum of products of Ginibre matrices. Exact eigenvalue density is known for a very few matrix ensembles. For the known ones they often lead to determinantal point process. Let X1, X2,..., Xk be i.i.d Ginibre matrices of size n ×n whose entries are standard complex Gaussian random variables. We derive eigenvalue density for matrices of the form X1 ε1 X2 ε2 ... Xk εk , where εi = ±1 for i =1,2,..., k. We show that the eigenvalues form a determinantal point process. The case where k =2, ε1 +ε2 =0 was derived earlier by Krishnapur. In the case where εi =1 for i =1,2,...,n was derived by Akemann and Burda. These two known cases can be obtained as special cases of our result.

Random Polynomials

Random Matrices

Eigenvalues

Ginibre Matices

Point Processes

Mathematics

Curve shortening in second-order lagrangian

Unknown Date

A second-order Lagrangian system is a generalization of a classical mechanical system for which the Lagrangian action depends on the second derivative of the state variable. Recent work has shown that the dynamics of such systems c:an be substantially richer than for classical Lagrangian systems. In particular, topological properties of the planar curves obtained by projection onto the lower-order derivatives play a key role in forcing certain types of dynamics. However, the application of these techniques requires an analytic restriction on the Lagrangian that it satisfy a twist property. In this dissertation we approach this problem from the point of view of curve shortening in an effort to remove the twist condition. In classical curve shortening a family of curves evolves with a velocity which is normal to the curve and proportional to its curvature. The evolution of curves with decreasing action is more general, and in the first part of this dissertation we develop some results for curve shortening flows which shorten lengths with respect to a Finsler metric rather than a Riemannian metric. The second part of this dissertation focuses on analytic methods to accommodate the fact that the Finsler metric for second-order Lagrangian system has singularities. We prove the existence of simple periodic solutions for a general class of systems without requiring the twist condition. Further; our results provide a frame work in which to try to further extend the topological forcing theorems to systems without the twist condition. / Includes bibliography. / Dissertation (Ph.D.)--Florida Atlantic University, 2014. / FAU Electronic Theses and Dissertations Collection

Differentiable dynamical systems

Geometry,Differential

Lagrange equations

Lagrangian functions

Mathematical optimization

Surfaces of constant curvature

On singular solutions of the Gelfand problem.

January 1994

by Chu Lap-foo. / Thesis (M.Phil.)--Chinese University of Hong Kong, 1994. / Includes bibliographical references (leaves 68-69). / Introduction --- p.iii / Chapter 1 --- Basic Properties of Singular Solutions --- p.1 / Chapter 1.1 --- An Asymptotic Radial Result --- p.2 / Chapter 1.2 --- Local Uniqueness of Radial Solutions --- p.8 / Chapter 2 --- Dirichlet Problem : Existence Theory I --- p.11 / Chapter 2.1 --- Formulation --- p.12 / Chapter 2.2 --- Explicit Solutions on Balls --- p.14 / Chapter 2.3 --- The Moser Inequality --- p.19 / Chapter 2.4 --- Existence of Solutions in General Domains --- p.24 / Chapter 2.5 --- Spectrum of the Problem --- p.26 / Chapter 3 --- Dirichlet Problem : Existence Theory II --- p.29 / Chapter 3.1 --- Mountain Pass Lemma --- p.29 / Chapter 3.2 --- Existence of Second Solution --- p.31 / Chapter 4 --- Dirichlet Problem : Non-Existence Theory --- p.36 / Chapter 4.1 --- Upper Bound of λ* in Star-Shaped Domains --- p.36 / Chapter 4.2 --- Numerical Values --- p.41 / Chapter 5 --- The Neumann Problem --- p.42 / Chapter 5.1 --- Existence Theory I --- p.43 / Chapter 5.2 --- Existence Theory II --- p.47 / Chapter 6 --- The Schwarz Symmetrization --- p.49 / Chapter 6.1 --- Definitions and Basic Properties --- p.49 / Chapter 6.2 --- Inequalities Related to Symmetrization --- p.58 / Chapter 6.3 --- An Application to P.D.E --- p.63 / Bibliography --- p.68

Quasilinearization

Singularities (Mathematics)

Dirichlet problem

Neumann problem

Schwarz function

Quelques théorèmes de points critiques basés sur une nouvelle notion d'enlacement

Boulanger, Laurence

12 1900

Une nouvelle notion d'enlacement pour les paires d'ensembles $A\subset B$, $P\subset Q$ dans un espace de Hilbert de type $X=Y\oplus Y^{\perp}$ avec $Y$ séparable, appellée $\tau$-enlacement, est définie. Le modèle pour cette définition est la généralisation de l'enlacement homotopique et de l'enlacement au sens de Benci-Rabinowitz faite par Frigon. En utilisant la théorie du degré développée dans un article de Kryszewski et Szulkin, plusieurs exemples de paires $\tau$-enlacées sont donnés. Un lemme de déformation est établi et utilisé conjointement à la notion de $\tau$-enlacement pour prouver un théorème d'existence de point critique pour une certaine classe de fonctionnelles sur $X$. De plus, une caractérisation de type minimax de la valeur critique correspondante est donnée. Comme corollaire de ce théorème, des conditions sont énoncées sous lesquelles l'existence de deux points critiques distincts est garantie. Deux autres théorèmes de point critiques sont démontrés dont l'un généralise le théorème principal de l'article de Kryszewski et Szulkin mentionné ci-haut. / A new notion of linking for pairs of sets $A\subset B$, $P\subset Q$ in a Hilbert space of the form $X=Y\oplus Y^{\perp}$ with $Y$ separable, called $\tau$-linking, is defined. The model for this definition is the generalization of homotopical linking and linking in the sense of Benci-Rabinowitz made by Frigon. Using the degree theory developped in an article of Kryszewski and Szulkin, many examples of $\tau$-linking pairs are given. A deformation lemma is established and used jointly with the notion of $\tau$-linking to prove an existence theorem for critical points of a certain class of functionals defined on $X$. Moreover, a characterization of a minimax nature for the corresponding critical value is given. As a corollary of this theorem, conditions are stated under which the existence of two distinct critical points is guaranteed. Two other critical point theorems are demonstrated, one of which generalizes the main theorem of the article of A new notion of linking for pairs of sets $A\subset B$, $P\subset Q$ in a Hilbert space of the form $X=Y\oplus Y^{\perp}$ with $Y$ separable, called $\tau$-linking, is defined. The model for this definition is the generalization of homotopical linking and linking in the sense of Benci-Rabinowitz made by Frigon~\cite{frigon:1}. Using the degree theory developped in~\cite{szulkin:1}, many examples of $\tau$-linking pairs are given. A deformation lemma is established and used jointly with the notion of $\tau$-linking to prove an existence theorem for critical points of a certain class of functionals defined on $X$. Moreover, a characterization of a minimax nature for the corresponding critical value is given. As a corollary of this theorem, conditions are stated under which the existence of two distinct critical points is guaranteed. Two other critical point theorems are demonstrated, one of which generalizes the main theorem of the article by Kryszewski and Szulkin cited above.

Analyse non linéaire

Théorie des points critiques

Enlacement

Nonlinear analysis

Critical point theory

Kryszewski and Szulkin degree theory

Linking

Eigenvalue Problem for the 1-Laplace Operator / Das Eigenwertproblem für den 1-Laplace-Operator

Milbers, Zoja

27 March 2009

We consider the eigenvalue problem associated to the 1-Laplace operator. We define higher eigensolutions by means of weak slope and establish existence of a sequence of eigensolutions by using nonsmooth critical point theory. In addition, we deduce a new necessary condition for the first eigenvalue of the 1-Laplace operator by means of inner variations. / Wir betrachten das zum 1-Laplace-Operator gehörige Eigenwertproblem. Wir definieren höhere Eigenlösungen mittels weak slope und weisen die Existenz einer Folge von Eigenlösungen nach, indem wir die nichtglatte Theorie kritischer Punkte anwenden. Zusätzlich leiten wir eine neue notwendige Bedingung für den ersten Eigenwert des 1-Laplace-Operators mittels innerer Variationen her.

1-Laplace

nonsmooth critical point theory

weak slope

inner variations

1-Laplace

nichtglatte Theorie kritischer Punkte

weak slope

innere Variationen

ddc:510

rvk:SK 620

Quelques théorèmes de points critiques basés sur une nouvelle notion d'enlacement

Boulanger, Laurence

12 1900

Une nouvelle notion d'enlacement pour les paires d'ensembles $A\subset B$, $P\subset Q$ dans un espace de Hilbert de type $X=Y\oplus Y^{\perp}$ avec $Y$ séparable, appellée $\tau$-enlacement, est définie. Le modèle pour cette définition est la généralisation de l'enlacement homotopique et de l'enlacement au sens de Benci-Rabinowitz faite par Frigon. En utilisant la théorie du degré développée dans un article de Kryszewski et Szulkin, plusieurs exemples de paires $\tau$-enlacées sont donnés. Un lemme de déformation est établi et utilisé conjointement à la notion de $\tau$-enlacement pour prouver un théorème d'existence de point critique pour une certaine classe de fonctionnelles sur $X$. De plus, une caractérisation de type minimax de la valeur critique correspondante est donnée. Comme corollaire de ce théorème, des conditions sont énoncées sous lesquelles l'existence de deux points critiques distincts est garantie. Deux autres théorèmes de point critiques sont démontrés dont l'un généralise le théorème principal de l'article de Kryszewski et Szulkin mentionné ci-haut. / A new notion of linking for pairs of sets $A\subset B$, $P\subset Q$ in a Hilbert space of the form $X=Y\oplus Y^{\perp}$ with $Y$ separable, called $\tau$-linking, is defined. The model for this definition is the generalization of homotopical linking and linking in the sense of Benci-Rabinowitz made by Frigon. Using the degree theory developped in an article of Kryszewski and Szulkin, many examples of $\tau$-linking pairs are given. A deformation lemma is established and used jointly with the notion of $\tau$-linking to prove an existence theorem for critical points of a certain class of functionals defined on $X$. Moreover, a characterization of a minimax nature for the corresponding critical value is given. As a corollary of this theorem, conditions are stated under which the existence of two distinct critical points is guaranteed. Two other critical point theorems are demonstrated, one of which generalizes the main theorem of the article of A new notion of linking for pairs of sets $A\subset B$, $P\subset Q$ in a Hilbert space of the form $X=Y\oplus Y^{\perp}$ with $Y$ separable, called $\tau$-linking, is defined. The model for this definition is the generalization of homotopical linking and linking in the sense of Benci-Rabinowitz made by Frigon~\cite{frigon:1}. Using the degree theory developped in~\cite{szulkin:1}, many examples of $\tau$-linking pairs are given. A deformation lemma is established and used jointly with the notion of $\tau$-linking to prove an existence theorem for critical points of a certain class of functionals defined on $X$. Moreover, a characterization of a minimax nature for the corresponding critical value is given. As a corollary of this theorem, conditions are stated under which the existence of two distinct critical points is guaranteed. Two other critical point theorems are demonstrated, one of which generalizes the main theorem of the article by Kryszewski and Szulkin cited above.

Analyse non linéaire

Théorie des points critiques

Enlacement

Nonlinear analysis

Critical point theory

Kryszewski and Szulkin degree theory

Linking