Title: Classification and Evolution of Bifurcation Curves for a Dirichlet-Neumann Boundary Value Problem and its Application
Authors: Kuo, Da-Chang
Wang, Shin-Hwa
Liang, Yu-Hao
應用數學系
Department of Applied Mathematics
Keywords: bifurcation;multiplicity;positive solution;S-shaped bifurcation curve;subset of-shaped bifurcation curve;time map
Issue Date: 1-Apr-2019
Abstract: We study the classification and evolution of bifurcation curves of positive solutions for the one-dimensional Dirichlet-Neumann boundary value problem {u ''(x) + lambda f (u) = 0, 0 < x < 1, u(0) = 0, u' (1) = -c < 0, where lambda > 0 is a bifurcation parameter and c > 0 is an evolution parameter. We mainly prove that, under some suitable assumptions on f, there exists c(1) > 0, such that, on the (lambda,parallel to u parallel to(infinity))-plane, (i) when 0 < c < c(1), the bifurcation curve is S-shaped; (ii) when c >= c(1), the bifurcation curve is subset of-shaped. Our results can be applied to the one-dimensional perturbed Gelfand equation with f(u) = exp (au/a+u) for a >= 4.37.
URI: http://dx.doi.org/10.11650/tjm/180502
http://hdl.handle.net/11536/151671
ISSN: 1027-5487
DOI: 10.11650/tjm/180502
Journal: TAIWANESE JOURNAL OF MATHEMATICS
Volume: 23
Issue: 2
Begin Page: 307
End Page: 331
Appears in Collections:Articles