M
Manuel De la Sen
Researcher at University of the Basque Country
Publications - 306
Citations - 2249
Manuel De la Sen is an academic researcher from University of the Basque Country. The author has contributed to research in topics: Fixed point & Metric space. The author has an hindex of 18, co-authored 306 publications receiving 1514 citations. Previous affiliations of Manuel De la Sen include Shahrekord University & Siirt University.
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Proceedings ArticleDOI
Second-order counterexample to the discrete-time Kalman conjecture
TL;DR: The discrete-time Kalman conjecture is shown to be false for systems of order two and above, which contrasts with continuoustime domain systems where the KalMan conjecture is true for third-order systems.
Journal ArticleDOI
On a SIR Model in a Patchy Environment Under Constant and Feedback Decentralized Controls with Asymmetric Parameterizations
TL;DR: The paper investigates the existence, allocation (depending on the vaccination control gains) and uniqueness of the disease-free equilibrium point as well as the existence of at least a stable endemic equilibrium point.
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A New Faster Iterative Scheme for Numerical Fixed Points Estimation of Suzuki’s Generalized Nonexpansive Mappings
TL;DR: In this paper, a new four-step iteration scheme for approximation of fixed point of the nonexpansive mappings named as - iteration scheme was introduced, which is faster than Picard, Mann, Ishikawa, Noor, Agarwal, Abbas, Thakur, and Ullah iteration schemes.
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Coincidence point theorems in quasi-metric spaces without assuming the mixed monotone property and consequences in G-metric spaces
TL;DR: In this paper, the authors present some coincidence point theorems in the setting of quasi-metric spaces that can be applied to operators which not necessarily have the mixed monotone property.
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Solutions of Fractional Differential Type Equations by Fixed Point Techniques for Multivalued Contractions
TL;DR: In this article, extended metric versions of a fractional differential equation, a system of fractional equations and two-dimensional (2D) linear Fredholm integral equations are investigated in the setting of an extended metric space.