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An elliptic operator with a nonlocal term: maximum principle, principal eigenvalue, and applications to a logistic equation with indefinite weight

Part of: Partial differential equations Elliptic equations and systems

Published online by Cambridge University Press:  24 February 2025

Willian Cintra Open the ORCID record for Willian Cintra [Opens in a new window]  and
Ismael Oliveira dos Anjos Open the ORCID record for Ismael Oliveira dos Anjos [Opens in a new window]
Willian Cintra*
Affiliation:
Departamento de Matemática, Universidade de Brasília, 70910-900, Brasília, DF, Brazil ([email protected]) (corresponding author)
Ismael Oliveira dos Anjos
Affiliation:
Departamento de Matemática, Universidade de Brasília, 70910-900, Brasília, DF, Brazil ([email protected])
*
Corresponding author: Cintra Willian, email: [email protected]
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Abstract

In this work, we consider a class of uniformly elliptic operators with a nonlocal term and mixed boundary conditions in bounded domains. We establish the existence of a principal eigenvalue and provide a result that offers both sufficient and necessary conditions for the validity of the maximum principle. As a consequence of these findings, we conduct a detailed study of an eigenvalue problem with an indefinite weight, as well as establish existence and uniqueness results for a logistic-type equation and prove some blow-up results.

Keywords

logistic equationmaximum principlenonlocal elliptic operatorprincipal eigenvalue

MSC classification

Primary: 35J25: Boundary value problems for second-order elliptic equations
Secondary: 35B09: Positive solutions 35B50: Maximum principles 92D25: Population dynamics (general)
Type
Research Article
Information
Proceedings of the Royal Society of Edinburgh Section A: Mathematics , First View , pp. 1 - 38
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Copyright
© The Author(s), 2025. Published by Cambridge University Press on behalf of The Royal Society of Edinburgh

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References

Abreu, R., Morales-Rodrigo, C. and Suárez, A.. Some eigenvalue problems with non-local boundary conditions and applications. Commun. Pure Appl. Anal. 13 (2014), 24652474.CrossRefGoogle Scholar
Afrouzi, G. A. and Brown, K. J.. On principal eigenvalues for boundary value problems with indefinite weight and Robin boundary conditions. Proc. Am. Math. Soc. 127 (1999), 125130.CrossRefGoogle Scholar
Aleja, D., Antón, I. and López-Gómez, J.. Global structure of the periodic positive solutions for a general class of periodic-parabolic logistic equations with indefinite weights. J. Math. Anal. Appl. 487 (2020), Id/No 123961.CrossRefGoogle Scholar
Aleja, D., Antón, I. and López-Gómez, J.. Solution components in a degenerate weighted BVP. Nonlinear Anal. Theory Methods Appl. Ser. A, Theory Methods. 192 (2020), Id/No 111690.CrossRefGoogle Scholar
Allegretto, W. and Barabanova, A.. Positivity of solutions of elliptic equations with nonlocal terms. Proc. R. Soc. Edinb. Sect. A, Math. 126 (1996), 643663.CrossRefGoogle Scholar
Alves, C. O., Delgado, M., Souto, M. A. S. and Suárez, A.. Existence of positive solution of a nonlocal logistic population model. Z. Angew. Math. Phys. 66 (2015), 943953.CrossRefGoogle Scholar
Antón, I. and López-Gómez, J.. Principal eigenvalues of weighted periodic-parabolic problems. Rend. Istit. Mat. Univ. Trieste. 49 (2017), 287318.Google Scholar
Cano-Casanova, S. and López-Gómez, J.. Properties of the principal eigenvalues of a general class of non-classical mixed boundary value problems. J. Differ. Equations. 178 (2002), 123211.CrossRefGoogle Scholar
Cantrell, R. S. and Cosner, C.. Diffusive logistic equations with indefinite weights: population models in disrupted environments. II. SIAM J. Math. Anal. 22 (1991), 10431064.CrossRefGoogle Scholar
Chipot, M.. Remarks on some class of nonlocal elliptic problems, in Recent Advances on Elliptic and Parabolic Issues (pp. 79–102) (World Scientific, Singapore, 2006).CrossRefGoogle Scholar
Cintra, W., Morales-Rodrigo, C. and Suárez, A.. Asymptotic behavior of positive solutions for a degenerate logistic equation with mixed local and non-local diffusion. Preprint. 60(3) (2021), .Google Scholar
Daners, D. and Koch Medina, P.. Abstract evolution equations, periodic problems and applications. Pitman Res. Notes Math. Ser., Vol.279 (Longman Scientific & Technical, Harlow, 1992), New York, NY: Wiley.Google Scholar
Delgado, M., Suárez, A. and Duarte, I. B. M.. Nonlocal problems arising from the birth-jump processes. Proc. R. Soc. Edinb. Sect. A, Math. 149 (2019), 447469.CrossRefGoogle Scholar
Du, Y. and Huang, Q.. Blow-up solutions for a class of semilinear elliptic and parabolic equations. SIAM J. Math. Anal. 31 (1999), 118.CrossRefGoogle Scholar
Freitas, P. and Sweers, G.. Positivity results for a nonlocal elliptic equation. Proc. R. Soc. Edinb. Sect. A, Math. 128 (1998), 697715.CrossRefGoogle Scholar
Furter, J. and Grinfeld, M.. Local vs. non-local interactions in population dynamics. Journal of Mathematical Biology. 27 (1989), 6580.CrossRefGoogle Scholar
García-Melián, J., Gómez-Reñasco, R., López-Gómez, J. and Sabina de Lis, J. C.. Pointwise growth and uniqueness of positive solutions for a class of sublinear elliptic problems where bifurcation from infinity occurs. Arch. Ration. Mech. Anal. 145 (1998), 261289.Google Scholar
Gilbarg, D. and Neil, S. T.. Elliptic partial differential equations of second order. 2nd ed. Grundlehren Math. Wiss., Vol.224 (Springer, Cham, 1983).Google Scholar
Hess, P. and Kato, T.. On some linear and nonlinear eigenvalue problems with an indefinite weight function. Commun. Partial Differ. Equations. 5 (1980), 9991030.CrossRefGoogle Scholar
Hillen, T., Greese, B., Martin, J. and de Vries, G.. Birth-jump processes and application to forest fire spotting. J. Biol. Dyn. 9 (2015), 104127.CrossRefGoogle ScholarPubMed
Kato, T.. Perturbation Theory for Linear operators. Vol.132 (Springer Science & Business Media, 2013).Google Scholar
López-Gómez, J.. Linear Second Order Elliptic operators (World Scientific, Hackensack, NJ, 2013).CrossRefGoogle Scholar
López-Gómez, J. and Molina-Meyer, M.. The maximum principle for cooperative weakly coupled elliptic systems and some applications. Differ. Integral Equ. 7 (1994), 383398.Google Scholar
López-Gómez, J. and Sabina de Lis, J. C.. First variations of principal eigenvalues with respect to the domain and point-wise growth of positive solutions for problems where bifurcation from infinity occurs. J. Differential Equations. 148 (1998), 4764.CrossRefGoogle Scholar
Maia, B. B. V., Morales-Rodrigo, C. and Suárez, A.. Some asymmetric semilinear elliptic interface problems. J. Math. Anal. Appl. 526 (2023), .CrossRefGoogle Scholar
Ouyang, T.. On the positive solutions of semilinear equations $\Delta u+\lambda u-hu^p=0$ on the compact manifolds. Trans. Amer. Math. Soc. 331 (1992), 503527.Google Scholar
Peng, R. and Zhao, X. -Q.. Effects of diffusion and advection on the principal eigenvalue of a periodic-parabolic problem with applications. Calc. Var. Partial Differ. Equ. 54 (2015), 16111642.CrossRefGoogle Scholar
Wan-Tong, L., López-Gómez, J. and Sun, J. -W.. Sharp patterns of positive solutions for some weighted semilinear elliptic problems. Calc. Var. Partial Differ. Equ. 60 (2021), , Id/No 85.Google Scholar