A coincidence continuation theory between multi-valued maps with continuous selections and compact admissible maps

Volume 14, Issue 3, pp 118--123 http://dx.doi.org/10.22436/jnsa.014.03.01

Publication Date: September 07, 2020 Submission Date: June 14, 2020 Revision Date: July 25, 2020 Accteptance Date: July 30, 2020

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Authors

Donal O'Regan - School of Mathematics, Statistics and Applied Mathematics, National University of Ireland, Galway, Ireland.

Abstract

We establish a topological transversality theorem and a Leray-Schauder alternative for coincidences between multi-valued maps with continuous selections and compact admissible maps.

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Keywords

• Continuous selections
• admissible maps
• essential maps
• coincidence theory
• Continuous selections
• admissible maps
• essential maps
• coincidence theory

MSC

•  47H10
•  54C60
•  54H25
•  55M20

References

• [1] X. P. Ding, W. K. Kim, K. K. Tan, A selection theorem and its applications, Bulletin Australian Math. Soc., 46 (1992), 205--212
  • View Article
  • Google Scholar


• [2] R. Engelking, General Topology, PWN-Polish Scientific Publishers, Warszawa (1989)
  • MathSciNet
  • Google Scholar
  • MATH


• [3] M. Furi, P. Pera, A continuation method on locally convex spaces and applications to ordinary differential equations on noncompact intervals, Ann. Pol. Math., 47 (1987), 331--346
  • View Article
  • Google Scholar
  • MATH


• [4] L. Gorniewicz, Topological fixed point theory of multivalued mappings, Kluwer Academic Publishers, Dordrecht (1999)
  • View Article
  • Google Scholar
  • MATH


• [5] A. Granas, Sur la méthode de continuité de Poincaré, C. R. Acad. Sci. Paris Ser. A-B, 282 (1976), 983--985
  • MathSciNet
  • Google Scholar
  • MATH


• [6] A. Granas, J. Dugundji, Fixed Point Theory, Springer-Verlag, New York (2003)
  • View Article
  • MathSciNet
  • Google Scholar
  • MATH


• [7] L. J. Lim, S. Park, Z. T. Yu, Remarks on fixed points, maximal elements and equilibria of generalized games, J. Math. Anal. Appl., 233 (1999), 581--596
  • View Article
  • Google Scholar


• [8] D. O'Regan, Fixed point theory on extension type spaces on topological spaces, Fixed Point Theory and Applications, 1 (2004), 13--20
  • View Article
  • Google Scholar


• [9] D. O'Regan, Coincidence continuation theory for multivalued maps with selections in a given class, Axioms, 9 (2020), 11 pages
  • View Article
  • Google Scholar