New discussion concerning to optimal control for semilinear population dynamics system in Hilbert spaces

Rohit Patel; Anurag Shukla; Juan J. Nieto; Velusamy Vijayakumar; Shimpi Singh Jadon

doi:10.15388/namc.2022.27.26407

Nonlinear Analysis (Feb 2022)

New discussion concerning to optimal control for semilinear population dynamics system in Hilbert spaces

Rohit Patel,
Anurag Shukla,
Juan J. Nieto,
Velusamy Vijayakumar,
Shimpi Singh Jadon

Affiliations

Rohit Patel: Government P.G. College Bisalpur
Anurag Shukla: Rajkiya Engineering College Kannauj
Juan J. Nieto: Institute of Mathematics, University of Santiago de Compostela
Velusamy Vijayakumar: Vellore Institute of Technology
Shimpi Singh Jadon: Rajkiya Engineering College Kannauj

DOI: https://doi.org/10.15388/namc.2022.27.26407
Journal volume & issue: Vol. 27

Abstract

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The objective of our paper is to investigate the optimal control of semilinear population dynamics system with diffusion using semigroup theory. The semilinear population dynamical model with the nonlocal birth process is transformed into a standard abstract semilinear control system by identifying the state, control, and the corresponding function spaces. The state and control spaces are assumed to be Hilbert spaces. The semigroup theory is developed from the properties of the population operators and Laplacian operators. Then the optimal control results of the system are obtained using the C0-semigroup approach, fixed point theorem, and some other simple conditions on the nonlinear term as well as on operators involved in the model.

Published in Nonlinear Analysis

ISSN: 1392-5113 (Print); 2335-8963 (Online)
Publisher: Vilnius University Press
Country of publisher: Lithuania
LCC subjects: Science: Mathematics: Analysis
Website: http://www.journals.vu.lt/nonlinear-analysis

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