On Global Solvability of Nonlinear Equations with Parameters

Arutyunov, A. V.; Zhukovskiy, S. E.

doi:10.1134/s1064562421010014

Dokl. Math.

2021

DOI: 10.1134/s1064562421010014

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On Global Solvability of Nonlinear Equations with Parameters

A. V. Arutyunov

S. E. Zhukovskiy

Abstract: We consider smooth mappings acting from one Banach space to another and depending on a parameter belonging to a topological space. Under various regularity assumptions, sufficient conditions for the existence of global and semilocal continuous inverse and implicit functions are obtained. We consider applications of these results to the problem of continuous extension of implicit functions and to the problem of coincidence points of smooth and continuous compact mappings.

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2022

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On stability and continuous dependence on parameter of the set of coincidence points of two mappings acting in a space with a distance

Zhukovskaia

Merchela

2022

Russian Universities Reports. Mathematics

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We consider the problem of coincidence points of two mappings ψ,φ, acting from a metric space (X,ρ) into a space (Y,d), in which a distance d has only one of the properties of the metric: d(y_1,y_2)=0⇔y_1=y_2, and is assumed to be neither symmetric nor satisfying the triangle inequality. The question of well-posedness of the equation ψ(x)=φ(x), which determines the coincidence point, is investigated. It is shown that if x=ξ is a solution to this equation, then for any sequence of α_i-covering mappings ψ_i:X→Y and any sequence of β_i-Lipschitz mappings φ_i:X→Y, α_i>β_i≥0, in the case of convergence d(φ_i (ξ),ψ_i (ξ))→0, equation ψ_i (x)=φ_i (x) has, for any i, a solution x=ξ_i such that ρ(ξ_i,ξ)→0. Further in the article, the dependence of the set "Coin"(t) of coincidence points of mappings ψ(•,t),φ(•,t):X→Y on a parameter t, an element of the topological space T, is investigated. Assuming that the first of these mappings is α-covering and the second one is β-Lipschitz, we obtain an assertion on upper semicontinuity, lower semicontinuity, and continuity of the set-valued mapping "Coin":T⇒X.

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On stability and continuous dependence on parameter of the set of coincidence points of two mappings acting in a space with a distance

Zhukovskaia

Merchela

2022

Russian Universities Reports. Mathematics

View full text Add to dashboard Cite

show abstract

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On Global Solvability of Nonlinear Equations with Parameters

Cited by 1 publication

References 8 publications

On stability and continuous dependence on parameter of the set of coincidence points of two mappings acting in a space with a distance

On stability and continuous dependence on parameter of the set of coincidence points of two mappings acting in a space with a distance

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