AbstractIn this paper we give a result in multiparameter local bifurcation theory. This result is a generalization of the Hopf bifurcation theorem and of a previous result by J. K. Hale. Our result can be applied to Fredholm operators with arbitrary index
AbstractA local two parameter bifurcation theorem concerning the bifurcation from steady states of t...
AbstractA general bifurcation theorem for potential operators is proved. It describes the possible b...
Local bifurcation control problems are defined and employed in the study of the local feedback stabi...
AbstractThis paper deals with local bifurcation theory for Fredholm operators based on the linear pa...
This paper reviews the global bifurcation theorem of J.Lopez-Gomez and C. Mora-Corral [18] and deriv...
This book shows the deep interaction between two important theories: Fredholm and local spectral th...
We modify an argument for multiparameter bifurcation of Fredholm maps by Fitzpatrick and Pejsachowic...
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN004721 / BLDSC - British Library D...
We associate to a parametrized family $f$ of nonlinear Fredholm maps possessing a trivial branch o...
Abstract: Bifurcations in the families of local Fredholm analytic operators are considered...
A local bifurcation theorem is proved under standard transversality assumptions by means of a reduct...
The smooth Fredholm's equation, representing various kinds of mathematical physics equations, is con...
This paper is a survey on Hopf bifurcation, Hopf bifurcation is very important in many areas. In thi...
Abstract. We consider a delayed Kaldor-Kalecki business cycle model. We first consider the existence...
We prove a global bifurcation result for an equation of the type Lx+λ(h(x)+k(x))=0, where L:Eâ€...
AbstractA local two parameter bifurcation theorem concerning the bifurcation from steady states of t...
AbstractA general bifurcation theorem for potential operators is proved. It describes the possible b...
Local bifurcation control problems are defined and employed in the study of the local feedback stabi...
AbstractThis paper deals with local bifurcation theory for Fredholm operators based on the linear pa...
This paper reviews the global bifurcation theorem of J.Lopez-Gomez and C. Mora-Corral [18] and deriv...
This book shows the deep interaction between two important theories: Fredholm and local spectral th...
We modify an argument for multiparameter bifurcation of Fredholm maps by Fitzpatrick and Pejsachowic...
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN004721 / BLDSC - British Library D...
We associate to a parametrized family $f$ of nonlinear Fredholm maps possessing a trivial branch o...
Abstract: Bifurcations in the families of local Fredholm analytic operators are considered...
A local bifurcation theorem is proved under standard transversality assumptions by means of a reduct...
The smooth Fredholm's equation, representing various kinds of mathematical physics equations, is con...
This paper is a survey on Hopf bifurcation, Hopf bifurcation is very important in many areas. In thi...
Abstract. We consider a delayed Kaldor-Kalecki business cycle model. We first consider the existence...
We prove a global bifurcation result for an equation of the type Lx+λ(h(x)+k(x))=0, where L:Eâ€...
AbstractA local two parameter bifurcation theorem concerning the bifurcation from steady states of t...
AbstractA general bifurcation theorem for potential operators is proved. It describes the possible b...
Local bifurcation control problems are defined and employed in the study of the local feedback stabi...
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