Partial Differential Equations and the Calculus of Variations
By Colombini, Marino, Giuseppe Modica et al.
Partial Differential Equations and the Calculus of Variations
By Colombini, Marino, Giuseppe Modica et al.
- Gebundenes Buch
Produktdetails
- Progress in Nonlinear Differential Equations and Their Applications .1
- Verlag: Birkhäuser Basel / Springer, Basel
- 1989.
- Seitenzahl: 1019
- Englisch
- Abmessung: 235mm x 155mm x 25mm
- Gewicht: 850g
- ISBN-13: 9780817634254
- ISBN-10: 0817634258
- Artikelnr.: 27450532
On a Class of Nonlinear Diagonal Elliptic Systems with Critical Growth and C?-Regularity.- Higher Integrability from Reverse Jensen Inequalities with Different Supports.- Partial Regularity of Cartesian Currents which Minimize Certain Variational Integrals.- Theoreme des Minimax Locaux et Fonctions Topologiquement Fermees.- Variational Principles with Linear Growth.- Estimation de L'erreur Dans des Problemes de Dirichlet ou Apparait un Terme Etrange.- On Atypical Variational Problems.- Sur la Controlabilite Exacte Elargie.- Low and High Frequency Vibration in Stiff Problems.- A Time-Discretization Scheme Approximating the Non-Linear Evolution Equation u t + ABu = 0.- The Stored-Energy for Some Discontinuous Deformations in Nonlinear Elasticity.- The Calculus of Variations and Some Semilinear Variational Inequalities of Elliptic and Parabolic Type.- Some Remarks on the Dependence Domain for Weakly Hyperbolic Equations with Constant Multiplicity.- Monotonicity of the Energy for Entire Solutions of Semilinear Elliptic Equations.- Pseudo-Differential Operators of Volterra Type on Spaces of Ultra Distributions and Parabolic Mixed Problems.- The Neumann Problem for Second Order Elliptic Equations with Rapidly Oscillating Periodic Coefficients in a Perforated Domain.- Discrete Exterior Measures and Their Meaning in Applications.- An Embedding Theorem.- Nonlocal Effects Induced by Homogenization.- On Regularity and Existence of Viscosity Solutions of Nonlinear Second Order, Elliptic Equations.- Etude D'un Système en Multiplicité 4, Lorsque le Degrée du Polynôme Minimal Est Petit.- On the Weierstrass Integrals of the Calculus of Variations over BV Varieties: Recent Results of the Mathematical Seminar in Perugia.- Variable Structure Control of Semilinear Evolution Equations.
On a Class of Nonlinear Diagonal Elliptic Systems with Critical Growth and C?-Regularity.- Higher Integrability from Reverse Jensen Inequalities with Different Supports.- Partial Regularity of Cartesian Currents which Minimize Certain Variational Integrals.- Theoreme des Minimax Locaux et Fonctions Topologiquement Fermees.- Variational Principles with Linear Growth.- Estimation de L'erreur Dans des Problemes de Dirichlet ou Apparait un Terme Etrange.- On Atypical Variational Problems.- Sur la Controlabilite Exacte Elargie.- Low and High Frequency Vibration in Stiff Problems.- A Time-Discretization Scheme Approximating the Non-Linear Evolution Equation u t + ABu = 0.- The Stored-Energy for Some Discontinuous Deformations in Nonlinear Elasticity.- The Calculus of Variations and Some Semilinear Variational Inequalities of Elliptic and Parabolic Type.- Some Remarks on the Dependence Domain for Weakly Hyperbolic Equations with Constant Multiplicity.- Monotonicity of the Energy for Entire Solutions of Semilinear Elliptic Equations.- Pseudo-Differential Operators of Volterra Type on Spaces of Ultra Distributions and Parabolic Mixed Problems.- The Neumann Problem for Second Order Elliptic Equations with Rapidly Oscillating Periodic Coefficients in a Perforated Domain.- Discrete Exterior Measures and Their Meaning in Applications.- An Embedding Theorem.- Nonlocal Effects Induced by Homogenization.- On Regularity and Existence of Viscosity Solutions of Nonlinear Second Order, Elliptic Equations.- Etude D'un Système en Multiplicité 4, Lorsque le Degrée du Polynôme Minimal Est Petit.- On the Weierstrass Integrals of the Calculus of Variations over BV Varieties: Recent Results of the Mathematical Seminar in Perugia.- Variable Structure Control of Semilinear Evolution Equations.