On the evolutionary bifurcation curves for the one-dimensional prescribed mean curvature equation with logistic type

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On the evolutionary bifurcation curves for the one-dimensional prescribed mean curvature equation with logistic type

We study the bifurcation diagrams and exact multiplicity of positive solutions for the one-dimensional prescribed mean curvature equation −u′1+u′2′=λu1+up,−L<x<L,u(−L)=u(L)=0,\left\{\begin{array}{l}-{\left(\frac{{u}^{^{\prime} }}{\sqrt{1+{u}^{^{\prime} 2}}}\right)}^{^{\prime} }=\lambda {\left(...

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Auteurs principaux:	Zhang Jiajia, Qiao Yuanhua, Duan Lijuan, Miao Jun
Format:	article
Langue:	EN
Publié:	De Gruyter 2021
Sujets:	mean curvature bifurcation curve logistic function 34b18 34c23 34b15 Mathematics QA1-939
Accès en ligne:	https://doaj.org/article/0c28dc2095504b5eb0296f9998f8d81a
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