<--- Back to Details
First PageDocument Content
Mathematical analysis / Mathematics / Calculus / Ordinary differential equations / Asymptotic analysis / Multivariable calculus / Partial differential equation / Lyapunov stability / Stability theory / Perturbation theory / Equation / Mathieu function
Mathematical analysis
Mathematics
Calculus
Ordinary differential equations
Asymptotic analysis
Multivariable calculus
Partial differential equation
Lyapunov stability
Stability theory
Perturbation theory
Equation
Mathieu function

Special Sessions Special Session 1: Qualitative Studies of PDEs: Entire Solutions and Asymptotic Behavior Peter Polacik, University of Minnesota, USA Eiji Yanagida, Tokyo Institute of Technology, Japan The aim of this se

Add to Reading List

Source URL: www.aimsciences.org

Download Document from Source Website

File Size: 827,13 KB

Share Document on Facebook

Similar Documents

Model Checking of Hybrid Systems Goran Frehse AVACS Autumn School, October 1, 2015 Univ. Grenoble Alpes – Verimag, 2 avenue de Vignate, Centre Equation, 38610 Gières, France,

Model Checking of Hybrid Systems Goran Frehse AVACS Autumn School, October 1, 2015 Univ. Grenoble Alpes – Verimag, 2 avenue de Vignate, Centre Equation, 38610 Gières, France,

DocID: 1xVIG - View Document

RATIONALITÉ DES VARIÉTÉS ALGÉBRIQUES OLIVIER DEBARRE Résumé. On cherche à paramétrer les solutions, dans un corps K contenant Q, d’une équation polynomiale en n variables à coefficients dans K, par des fracti

RATIONALITÉ DES VARIÉTÉS ALGÉBRIQUES OLIVIER DEBARRE Résumé. On cherche à paramétrer les solutions, dans un corps K contenant Q, d’une équation polynomiale en n variables à coefficients dans K, par des fracti

DocID: 1xUTe - View Document

Differential Equation Axiomatization The Impressive Power of Differential Ghosts André Platzer Yong Kiam Tan

Differential Equation Axiomatization The Impressive Power of Differential Ghosts André Platzer Yong Kiam Tan

DocID: 1xUKG - View Document

Around cubic hypersurfaces Olivier Debarre June 23, 2015 Abstract A cubic hypersurface X is defined by one polynomial equation of degree 3 in n variables with coefficients in a field K, such as

Around cubic hypersurfaces Olivier Debarre June 23, 2015 Abstract A cubic hypersurface X is defined by one polynomial equation of degree 3 in n variables with coefficients in a field K, such as

DocID: 1xTdZ - View Document

Theoretical competition. Tuesday, 15 JulyProblem 2.Van der Waals equation of state Solution

Theoretical competition. Tuesday, 15 JulyProblem 2.Van der Waals equation of state Solution

DocID: 1vrnY - View Document