AN OPTIMAL CONTROL PROBLEM FOR A LOTKA-VOLTERRA COMPETITION MODEL WITH CHEMO-REPULSION

doi:10.1007/s10473-024-0219-7

Abstract

Abstract: In this paper we study a bilinear optimal control problem for a diffusive Lotka-Volterra competition model with chemo-repulsion in a bounded domain of $\mathbb{R^N},$ $N=2,3$. This model describes the competition of two species in which one of them avoid encounters with rivals through a chemo-repulsion mechanism. We prove the existence and uniqueness of weak-strong solutions, and then we analyze the existence of a global optimal solution for a related bilinear optimal control problem, where the control is acting on the chemical signal. Posteriorly, we derive first-order optimality conditions for local optimal solutions using the Lagrange multipliers theory. Finally, we propose a discrete approximation scheme of the optimality system based on the gradient method, which is validated with some computational experiments.

Key words: Lotka-Volterra, chemo-repulsion, optimal control, optimality conditions

CLC Number:

35K51

Diana I. HERNÁNDEZ, Diego A. RUEDA-GÓMEZ, Élder J. VILLAMIZAR-ROA. AN OPTIMAL CONTROL PROBLEM FOR A LOTKA-VOLTERRA COMPETITION MODEL WITH CHEMO-REPULSION[J].Acta mathematica scientia,Series B, 2024, 44(2): 721-751.

Trendmd

References

[1] Bellomo N, Bellouquid A, Tao Y, Winkler M. Toward a mathematical theory of Keller-Segel models of pattern formation in biological tissues. Math Models Methods Appl Sci, 2015, 25(9): 1663-1763
[2] Silva P B E, Guillén-González F, Perusato C F, Rodríguez-Bellido M A. Bilinear optimal control of the Keller-Segel logistic model in 2D-domains. Appl Math Optim, 2023, 87(3): Art 55
[3] Duarte-Rodríguez A, Ferreira L C, Villamizar-Roa E J. Global existence for an attraction-repulsion chemotaxis fluid model with logistic source. Discrete Contin Dyn Syst Ser B, 2019, 24(2): 423-447
[4] Feireisl E, Novotný A.Singular Limits in Thermodynamics of Viscous Fluids. Basel: Birkhäuser, 2009
[5] Guillén-González F, Mallea-Zepeda E, Rodríguez-Bellido M A. A regularity criterion for a 3D chemo-repulsion system and its application to a bilinear optimal control problem. SIAM J Control Optim, 2020, 58(3): 1457-1490
[6] Guillén-González F, Mallea-Zepeda E, Rodríguez-Bellido M A. Optimal bilinear control problem related to a chemo-repulsion system in 2D domains. ESAIM Control Optim Calc Var, 2020, 26: Art 29
[7] Guillén-González F, Mallea-Zepeda E, Villamizar-Roa E J. On a bi-dimensional chemo-repulsion model with nonlinear production and a related optimal control problem. Acta Appl Math, 2020, 170: 963-979
[8] Gunzburger M D, Manservisi S. Analysis and approximation of the velocity tracking problem for Navier-Stokes flows with boundary control. SIAM J Control Optim, 2000, 39: 594-634
[9] Gunzburger M D.Perspectives in Flow Control and Optimization. Philadelphia: SIAM, 2002
[10] Hurst J L, Beyon R J. Scent wars: the chemobiology of competitive signalling in mice. BioEssays, 2004, 26: 1288-1298
[11] Lions J L.Quelques Métodes de Résolution des Problèmes aux Limites Non linéares. Paris: Dunod, 1969
[12] Liu C, Yuang Y. Optimal control of a fully parabolic attraction-repulsion chemotaxis model with logistic source in 2D. Appl Math Optim, 2022, 85(1): Art 7
[13] López-Ríos J, Villamizar-Roa E J. An optimal control problem related to a 3D-chemotaxis-Navier-Stokes model. ESAIM Control Optim Calc Var, 2021, 27: Art 58
[14] Lorca S, Mallea-Zepeda E, Villamizar-Roa E J. Stationary solutions to a chemo-repulsion system and a related optimal bilinear control problem. Bull Braz Math Soc (N S), 2023, 54: Art 39
[15] Lotka A J.Elements of Physical Biology. Baltimore: Williams and Wilkins Co, 1925
[16] Mallea-Zepeda E, Ortega-Torres E, Villamizar-Roa E J. An optimal control problem for the Navier-Stokes-$\alpha$ system. J Dyn Control Syst, 2023, 29(1): 129-156
[17] Rodríguez-Bellido M A, Rueda-Gómez D A, Villamizar-Roa E J. On a distributed control problem for a coupled chemotaxis-fluid model. Discrete Contin Dyn Syst Ser B, 2018, 23: 557-571
[18] Simon J. Compact sets in the space $L^p(0,T;B)$. Ann Mat Pura Appl,1987, 146: 65-96
[19] Tello J I, Wrzosek D. Inter-species competition and chemorepulsion. J Math Anal Appl, 2018, 459: 1233-1250
[20] Troltzsch F.Optimal Control of Partial Differential Equations. Theory, Methods and Applications. Providence, RI: Amer Math Soc, 2010
[21] Volterra V. Variazioni e fluttuazioni del numero díndividui in specie animali conviventi. Mem R Accad Naz Dei Lincei Ser VI, 1926, 2: 31-113
[22] Zimmer R K, Butman C A. Chemical signaling processes in the marine environment. Biol Bull, 2000, 198: 168-187
[23] Zowe J, Kurcyusz S. Regularity and stability for the mathematical programming problem in Banach spaces. Appl Math Optim, 1979, 5: 49-62