Hostname: page-component-cd9895bd7-jn8rn Total loading time: 0 Render date: 2024-12-27T09:01:07.589Z Has data issue: false hasContentIssue false

On Semipositone Non-Local Boundary-Value Problems with Nonlinear or Affine Boundary Conditions

Published online by Cambridge University Press:  02 November 2016

Christopher S. Goodrich*
Affiliation:
Department of Mathematics, Creighton Preparatory School, Omaha, NE 68114, USA ([email protected])

Abstract

We consider the boundary-value problem

where H: [0,+∞) → ℝ and f : [0, 1] × ℝ → ℝ are continuous and λ > 0 is a parameter. We show that if H satisfies a boundedness condition on a specified compact set, then this, together with an assumption that H is either affine or superlinear at +∞, implies existence of at least one positive solution to the problem, even in the case where we impose no growth conditions on f. Finally, since it can hold that f(t, y) < 0 for all (t, y) ∈ [0, 1]×ℝ, the semipositone problem is included as a special case of the existence result.

Type
Research Article
Copyright
Copyright © Edinburgh Mathematical Society 2016 

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

1. Anderson, D. R., Existence of three solutions for a first-order problem with nonlinear nonlocal boundary conditions, J. Math. Analysis Applic. 408 (2013), 318323.CrossRefGoogle Scholar
2. Anuradha, V., Hai, D. D. and Shivaji, R., Existence results for superlinear semipositone BVPs, Proc. Am. Math. Soc. 124 (1996), 757763.CrossRefGoogle Scholar
3. Goodrich, C. S., Positive solutions to boundary value problems with nonlinear boundary conditions, Nonlin. Analysis 75 (2012), 417432.CrossRefGoogle Scholar
4. Goodrich, C. S., Nonlocal systems of BVPs with asymptotically superlinear boundary conditions, Commentat. Math. Univ. Carolinae 53 (2012), 7997.Google Scholar
5. Goodrich, C. S., Nonlocal systems of BVPs with asymptotically sublinear boundary conditions, Appl. Analysis Discr. Math. 6 (2012), 174193.CrossRefGoogle Scholar
6. Goodrich, C. S., On nonlocal BVPs with boundary conditions with asymptotically sublinear or superlinear growth, Math. Nachr. 285 (2012), 14041421.CrossRefGoogle Scholar
7. Goodrich, C. S., On nonlinear boundary conditions satisfying certain asymptotic behavior, Nonlin. Analysis 76 (2013), 5867.CrossRefGoogle Scholar
8. Goodrich, C. S., On a nonlocal BVP with nonlinear boundary conditions, Results Math. 63 (2013), 13511364.CrossRefGoogle Scholar
9. Goodrich, C. S., Positive solutions to differential inclusions with nonlocal, nonlinear boundary conditions, Appl. Math. Computat. 219 (2013), 1107111081.CrossRefGoogle Scholar
10. Goodrich, C. S., An existence result for systems of second-order boundary value problems with nonlinear boundary conditions, Dynam. Syst. Applic. 23 (2014), 601618.Google Scholar
11. Goodrich, C. S., A note on semipositone boundary value problems with nonlocal, nonlinear boundary conditions, Arch. Math. 103 (2014), 177187.CrossRefGoogle Scholar
12. Goodrich, C. S., On nonlinear boundary conditions involving decomposable linear functionals, Proc. Edinb. Math. Soc. 58 (2015), 421439.CrossRefGoogle Scholar
13. Goodrich, C. S., Semipositone boundary value problems with nonlocal, nonlinear boundary conditions, Adv. Diff. Eqns 20 (2015), 117142.Google Scholar
14. Infante, G., Nonlocal boundary value problems with two nonlinear boundary conditions, Commun. Appl. Analysis 12 (2008), 279288.Google Scholar
15. Infante, G. and Pietramala, P., Existence and multiplicity of non-negative solutions for systems of perturbed Hammerstein integral equations, Nonlin. Analysis 71 (2009), 13011310.CrossRefGoogle Scholar
16. Infante, G. and Pietramala, P., Eigenvalues and non-negative solutions of a system with nonlocal BCs, Nonlin. Studies 16 (2009), 187196.Google Scholar
17. Infante, G. and Pietramala, P., Perturbed Hammerstein integral inclusions with solutions that change sign, Commentat. Math. Univ. Carolinae 50 (2009), 591605.Google Scholar
18. Infante, G. and Pietramala, P., A third order boundary value problem subject to nonlinear boundary conditions, Math. Bohem. 135 (2010), 113121.CrossRefGoogle Scholar
19. Infante, G. and Pietramala, P., Multiple non-negative solutions of systems with coupled nonlinear BCs, Math. Meth. Appl. Sci. 37 (2014), 20802090.CrossRefGoogle Scholar
20. Infante, G., Minhós, F. and Pietramala, P., Non-negative solutions of systems of ODEs with coupled boundary conditions, Commun. Nonlin. Sci. Numer. Simulation 17 (2012), 49524960.CrossRefGoogle Scholar
21. Infante, G., Pietramala, P. and Tenuta, M., Existence and localization of positive solutions for a nonlocal BVP arising in chemical reactor theory, Commun. Nonlin. Sci. Numer. Simulation 19 (2014), 22452251.CrossRefGoogle Scholar
22. Jankowski, T., Positive solutions to fractional differential equations involving Stieltjes integral conditions, Appl. Math. Computat. 241 (2014), 200213.CrossRefGoogle Scholar
23. Jiang, J., Liu, L. and Wu, Y., Positive solutions for second-order singular semipositone differential equations involving Stieltjes integral conditions, Abstr. Appl. Analysis 2012 (2012), 696283.Google Scholar
24. Karakostas, G. L., Existence of solutions for an n-dimensional operator equation and applications to BVPs, Electron. J. Diff. Eqns 2014 (2014), No. 71.Google Scholar
25. Karakostas, G. L. and Tsamatos, P. Ch., Existence of multiple positive solutions for a nonlocal boundary value problem, Topolog. Meth. Nonlin. Analysis 19 (2002), 109121.CrossRefGoogle Scholar
26. Karakostas, G. L. and Tsamatos, P. Ch., Multiple positive solutions of some Fredholm integral equations arisen from nonlocal boundary-value problems, Electron. J. Diff. Eqns 2002 (2002), No. 30.Google Scholar
27. Picone, M., Su un problema al contorno nelle equazioni differenziali lineari ordinarie del secondo ordine, Annali Scuola Norm. Sup. Pisa 10 (1908), 195.Google Scholar
28. Webb, J. R. L. and Infante, G., Positive solutions of nonlocal boundary value problems: a unified approach, J. Lond. Math. Soc. 74 (2006), 673693.CrossRefGoogle Scholar
29. Webb, J. R. L. and Infante, G., Non-local boundary value problems of arbitrary order, J. Lond. Math. Soc. 79 (2009), 238258.CrossRefGoogle Scholar
30. Webb, J. R. L. and Infante, G., Semi-positone nonlocal boundary value problems of arbitrary order, Commun. Pure Appl. Analysis 9 (2010), 563581.CrossRefGoogle Scholar
31. Whyburn, W. M., Differential equations with general boundary conditions, Bull. Am. Math. Soc. 48 (1942), 692704.CrossRefGoogle Scholar
32. Yang, Z., Positive solutions to a system of second-order nonlocal boundary value problems, Nonlin. Analysis 62 (2005), 12511265.CrossRefGoogle Scholar
33. Yang, Z., Positive solutions of a second-order integral boundary value problem, J. Math. Analysis Applic. 321 (2006), 751765.CrossRefGoogle Scholar
34. Zeidler, E., Nonlinear functional analysis and its applications, I: fixed-point theorems (Springer, 1986).CrossRefGoogle Scholar