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Fixed Point Theorems for Measurable Semigroups of Operations

Published online by Cambridge University Press:  20 November 2018

James C. S. Wong*
Affiliation:
Department of Mathematics and Statistics University of Calgary Calgary, Alberta T2N 1N4
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Abstract

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Let Sbe a topological semigroup, K a compact convex subset of a separated convex space Eand T: S x KK an affine action (denoted by (s, x)Ts(x),sS, xK) of S as continuous affine maps on K. It is shown in A. Lau and J. Wong [22] that the weakly left uniformly measurable functions WLUM(S) on S has a left invariant mean iff Shas the fixed point property for weakly measurable affine actions, i.e. affine actions such that the scalar function sx*Ts(x) is measurable for each xK and x*E* (the dual of E) with respect to the Borel sets in S. It is natural to ask for a “strongly” measurable analogue of this result. There are a number of ways to define such actions and the corresponding functions on S. In this paper, we obtained a neat analogue of this fixed point theorem by a suitable choice of strong measurability which naturally leads to another new fixed point theorem for separable actions. Also, we shall unify these and many known fixed point theorems and extend and generalise them to anti-actions of S as bounded linear operators on Banach spaces

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1992

References

1. Argabright, L.N., Invariant means and fixed points. A sequel to Mitchell's paper, Trans. Amer. Math. Soc. 130 (1968),127130.Google Scholar
2. Berglund, J.F., Junghenn, H.D. and Milnes, P., Compact Right Topological Semigroups and Generalisations of Almost Periodicity, Lecture Notes in Mathematics 663, Springer-Verlag, Berlin-Heidelberg-New York (1978).Google Scholar
3. Berglund, J.F., Junghenn, H.D. and Milnes, P., Analysis on Semigroups, Function Spaces, Compactifications, Representations, Wiley Interscience, New York, 1989.Google Scholar
4. Day, M.M., Fixed-point theorems for compact convex sets, Illinois J. Math. 5 (1961), 585590.Google Scholar
5. Day, M.M., Correction to my paper Fixed-point theorems for compact convex sets, Illinois J. Math. 8 (1964), 713.Google Scholar
6. Douglas, R.G.,On lattices and algebras of real valued functions, Amer. Math. Monthly, 72 (1965), 642643.Google Scholar
7. Dunford, N. and Schwartz, J.T., Linear Operators I, Interscience, New York, 1957.Google Scholar
8. Dzinotyiweyi, H., Analogues of the Group Algebra for Topological Semigroups, Pitman Research Notes in Mathematics Series 98, Longman, 1984.Google Scholar
9. Gramelin, T. and Greene, R., Introduction to Topology, Saunders, New York, 1983.Google Scholar
10. Glicksberg, I., On convex hulls of translates, Pacific J. Math. 13 (1963), 97113.Google Scholar
11. Granirer, E., Extremely amenable semigroups, Math. Scand. 17 (1965), 177197.Google Scholar
12. Granirer, E., Extremely amenable semigroups II, Math. Scand. 20 (1967), 93113.Google Scholar
13. Granirer, E., Functional analytic properties of extremely amenable semigroups, Trans. Amer. Math. Soc. 137 (1969), 5357.Google Scholar
14. Greeleaf, F.P., Invariant Means on Topological Groups, Van Nostrand Math. Studies, Princeton, New Jersey, 1969.Google Scholar
15. Hewitt, E. and Ross, K.A., Abstract Harmonic Analysis I, Springer-Verlag, Berlin, 1963.Google Scholar
16. Hille, E. and Phillips, R.S., Functional Analysis and Semigroups, Amer. Math. Soc. Colloquium Publications 31 (1957).Google Scholar
17. Junghenn, H.D., Some general results on fixed points and invariant means, Semigroup Forum 11 (1975), 153164.Google Scholar
18. Kelley, J., General Topology, Van Nostrand, New York, 1968.Google Scholar
19. Kelley, J. and Namioka, I., Topological Linear Spaces, Van Nostrand, New York, 1961.Google Scholar
20. Lau, A., Invariant means on almost periodic functions and fixed point properties, Rocky Mountain J. Math. 3 (1973), 6976.Google Scholar
21. Lau, A., Some fixed point theorems and their applications to W*-algebras. In: Fixed Point Theory and its Applications, (Edited by Swaminathan, S.), 121129. Academic Press, New York, 1976.Google Scholar
22. Lau, A. and James Wong, C.S., Finite dimensional invariant subspacesfor measurable semigroups of linear operators, J. Math Anal and Appl. 127 (1987), 548558.Google Scholar
23. Mitchell, T., Function algebras, means and fixed points, Trans. Amer. Math. Soc. 130 (1968), 117126.Google Scholar
24. Mitchell, T., Topological semigroups and fixed points, Illinois, J. Math. 14 (1970), 630641.Google Scholar
25. Namioka, J., On certain actions of semigroups on L-spaces, Studia Math. 29 (1967), 6377.Google Scholar
26. Nedoma, J., Notes on generalised random variables, Trans. First Prague Conference on Information Theory, Statistical Decision Functions and Random Processes, ( 1956), Czechoslovak Academy of Sciences, Prague (1957), 139141.Google Scholar
27. T, A.L.. Paterson, Amenability, Amer. Math. Soc. Math. Survey and Monographs 29, Providence, Rhode Island, 1988.Google Scholar
28. Rickert, N., Amenable groups and groups with the fixed point property, Trans. Amer. Math. Soc. 127 (1967), 211232.Google Scholar
29. Robertson, A. and Robertson, W., Topological Vector Spaces, Cambridge Tracts in Mathematics 53, Cambridge University Press, 1973.Google Scholar
30. Simon, B., A remark on groups with the fixed point property, Proc. Amer. Math. Soc. 31 (1972), 623624.Google Scholar
31. Wong, James C.S., Uniform semigroups and fixed point properties, Semigroup Forum 35 (1987),227236.Google Scholar