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JP Journal of Fixed Point Theory and Applications

JP Journal of Fixed Point Theory and Applications
Volume 3, Issue 2, Pages 85 - 103 (August 2008)

FIXED POINT THEORY IN FRECHET SPACES FOR APPROXIMABLE AND ADMISSIBLE VOLTERRA TYPE MAPS Donal O'Regan (Ireland) and Ruyun Ma (P. R. China) Received July 27, 2007 References:
[1] R. P. Agarwal, M. Frigon and D. Oï¿½Regan, A survey of recent fixed point theory in Frï¿½chet spaces, Nonlinear Analysis and Applications: to V. Lakshmikantham on his 80th birthday, Vol. 1, 75-88, Kluwer Acad. Publ., Dordrecht, 2003. [2] R. P. Agarwal and D. Oï¿½Regan, Countably P-concentrative pairs and the coincidence index, Appl. Math. Letters 12 (2002), 439-444. [3] R. P. Agarwal and D. Oï¿½Regan, An index theory for countably P-concentrative J maps, Appl. Math. Letters 16 (2003), 1265-1271. [4] R. P. Agarwal and D. Oï¿½Regan, A topological degree for pairs, Fixed Point Theory and Applications, Vol. 4, Y. J. Cho, J. K. Kim and S. M. Kang, eds., Nova Science Publishers, New York, 2003, pp. 11-17. [5] J. Andres, G. Gabor and L. Gorniewicz, Boundary value problems on infinite intervals, Trans. Amer. Math. Soc. 351 (1999), 4861-4903. [6] P. M. Fitzpatrick and W. V. Petryshyn, Fixed point theorems and fixed point index for multivalued mappings in cones, J. London Math. Soc. 12 (1975), 75-82. [7] L. Gorniewicz, Topological Fixed Point Theory of Multivalued Mappings, Kluwer Academic Publishers, Dordrecht, 1999. [8] L. Gorniewicz, A. Granas and W. Kryszewski, On the homotopy method in the fixed point index theory of multi-valued mappings of compact absolute neighborhood retracts, J. Math. Anal. Appl. 161 (1991), 457-473. [9] L. V. Kantorovich and G. P. Akilov, Functional Analysis in Normed Spaces, Pergamon Press, Oxford, 1964. [10] Z. Kucharski, A coincidence index, Bull. Acad. Polon. Sci. 24 (1976), 245-252. [11] R. Ma, D. Oï¿½Regan and R. Precup, Fixed point theory for admissible pairs and maps in Frï¿½chet spaces via degree theory, Fixed Point Theory (to appear). [12] D. Oï¿½Regan, An essential map approach for multimaps defined on closed subsets of Frï¿½chet spaces, Applicable Analysis 85 (2006), 503-513. [13] D. Oï¿½Regan, Lefschetz fixed point theorems for approximable type maps in Frï¿½chet spaces, Commmentationes Mathematicae (Prace Matematyczne) (to appear). [14] D. Oï¿½Regan, Y. J. Cho and Y. Q. Chen, Topological Degree Theory and Applications, Chapman & Hall/CRC, Boca Raton, 2006. [15] M. Vath, Fixed point theorems and fixed point index for countably condensing maps, Topol. Methods Nonlinear Anal. 13 (1999), 341-363.

Keywords and phrases: fixed point theory, Volterra operators, projective limits.

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