H. Salahifard scite author profile

We prove the demiclosedness principle for a class of mappings which is a generalization of all the forms of nonexpansive, asymptotically nonexpansive, and nearly asymptotically nonexpansive mappings. Moreover, we establish the existence theorem and convergence theorems for modified Ishikawa iterative process in the framework ofCAT(0)spaces. Our results generalize, extend, and unify the corresponding results on the topic in the literature.

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Bifurcation problems for noncompact operators

Salahifard¹,

Vaezpour²

2016

MMN

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Under new hypotheses, and using the Lyapunov-Schmidt reduction, we study the branches of bifurcation of a nonlinear equation of the type u Lu C G. ; u/ D 0, in a neighborhood W of a particular solution. 0 ; 0/ 2 R X, where X is a real Banach space, L a noncompact linear operator defines on X and G is a nonlinear operator defined on W to values in X. This type of bifurcation problems (bifurcation from the trivial branch) have different applications such as resolution of differential equations as those of Von-Karmann and Navier-Stokes or to integral equations as the Urysohn's one.

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H. Salahifard

Invariant approximation for spaces

Demiclosedness Principle for Total Asymptotically Nonexpansive Mappings inCAT(0)Spaces

Bifurcation problems for noncompact operators

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