On a bifurcation value related to quasi-linear Schrodinger equations

Marco Caliari; Marco Squassina

arXiv:1111.0526·math.AP·December 26, 2011·1 cites

On a bifurcation value related to quasi-linear Schrodinger equations

Marco Caliari, Marco Squassina

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TL;DR

This paper investigates a bifurcation phenomenon in minimization problems related to quasi-linear Schrödinger equations, using numerical methods to analyze the behavior and identify critical bifurcation values.

Contribution

The study introduces a numerical approach to identify bifurcation values in minimization problems for quasi-linear Schrödinger equations, providing new insights into their solution structure.

Findings

01

Identification of a bifurcation value through numerical analysis

02

Characterization of solution behavior near the bifurcation point

03

Insights into the structure of minimizers for the quasi-linear Schrödinger equation

Abstract

By virtue of numerical arguments we study a bifurcation phenomenon occurring for a class of minimization problems associated with the quasi-linear Schrodinger equation.

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Taxonomy

TopicsAdvanced Mathematical Physics Problems · Spectral Theory in Mathematical Physics · Stability and Controllability of Differential Equations