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Toplam kayıt 6, listelenen: 1-6
Generalized cone b−random metric space with some random fixed point theorems
(Işık University Press, 2022)
In this paper, we introduce generalized cone b−random metric space and prove some random fixed point theorems for mappings satisfying various contractive type conditions. Also some stochastic fixed point theorems for ...
A product topology and strong convergence scheme for finding common fixed points of a family of nonexpansive semigroup
(Işık University Press, 2022)
In this paper, we consider the product space Eˡ with the product topology generated by the strong topologies on E for each i ∈ I and using a family of nonexpansive semigroup in a product spaces Eˡ, where E is a real strictly ...
Fixed point theorems for (?, ?)-uniformly locally contractive mapping defined on ?-chainable G-metric type spaces
(Işık University Press, 2022)
In this article, we discuss fixed point results for (?, ?)-uniformly locally contractive self mapping defined on ?-chainable G-metric type spaces. In particular, we Show that under some more general conditions, certain ...
Solving existence problems via F-contraction in modified b-metric spaces
(Işık University Press, 2022)
In this paper, we introduce a new abstract structure, expanded b-metric, as an natural extension of b-metric. We also define basic topological notions in expanded bmetric to able to investigate the existence of fixed point ...
Analysis of a dynamic contact problem for electro-viscoelastic materials with Tresca’s friction
(Işık University Press, 2022)
We consider a mathematical model which describes the dynamic process of contact between two electro-viscoelastic bodies with damage. The contact is bilateral and is modeled with Tresca’s friction law. The damage of the ...
Solving fractional differential equations using fixed point results in generalized metric spaces of Perov’s type
(Işık University Press, 2022-07)
In 1964, A. I. Perov generalized the Banach contraction principle introducing, following the work of ¯D. Kurepa, a new approach to fixed point problems, by defining generalized metric spaces (also known as vector valued ...