Path-Connectedness in Global Bifurcation Theory
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Publication:6364856
DOI10.3934/ERA.2021079arXiv2104.04012MaRDI QIDQ6364856
Publication date: 8 April 2021
Abstract: A celebrated result in bifurcation theory is that global connected sets of non-trivial solutions bifurcate from trivial solutions at non-zero eigenvalues of odd algebraic multiplicity of the linearized problem when the operators involved are compact. In this paper a simple example is constructed which satisfies the regularity hypotheses of the global bifurcation theorem, and the eigenvalue has algebraic multiplicity one, yet all the path-connected components of the connected sets that bifurcate are singletons. Another example shows that even when the operators are everywhere infinitely differentiable and classical bifurcation occurs locally at a simple eigenvalue, the global continuum may not be path-connected away from the bifurcation point. A third example shows that the non-trivial solutions which, by variational theory, bifurcate from eigenvalues of any multiplicity when the problem has gradient structure, may not be connected and may contain no paths except singletons.
Continua and generalizations (54F15) Abstract bifurcation theory involving nonlinear operators (47J15) Bifurcations in context of PDEs (35B32) Variational problems in abstract bifurcation theory in infinite-dimensional spaces (58E07)
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