Voir la notice de l'article provenant de la source Cambridge University Press
Wong, James C. S. On the Semigroup of Probability Measures of a Locally Compact Semigroup II. Canadian mathematical bulletin, Tome 30 (1987) no. 3, pp. 273-281. doi: 10.4153/CMB-1987-039-9
@article{10_4153_CMB_1987_039_9,
author = {Wong, James C. S.},
title = {On the {Semigroup} of {Probability} {Measures} of a {Locally} {Compact} {Semigroup} {II}},
journal = {Canadian mathematical bulletin},
pages = {273--281},
year = {1987},
volume = {30},
number = {3},
doi = {10.4153/CMB-1987-039-9},
url = {http://geodesic.mathdoc.fr/articles/10.4153/CMB-1987-039-9/}
}
TY - JOUR AU - Wong, James C. S. TI - On the Semigroup of Probability Measures of a Locally Compact Semigroup II JO - Canadian mathematical bulletin PY - 1987 SP - 273 EP - 281 VL - 30 IS - 3 UR - http://geodesic.mathdoc.fr/articles/10.4153/CMB-1987-039-9/ DO - 10.4153/CMB-1987-039-9 ID - 10_4153_CMB_1987_039_9 ER -
[1] 1. Argabright, , Invariant means and fixed points, A sequel to Mitchell's paper. Trans. Amer. Math. Soc. 130(1968), pp. 1277–130. Google Scholar
[2] 2. Berglund, J.F., Junghenn, H.D. and Milnes, P., Compact right topological semigroups and generalisations of almost periodicity, lecture notes in mathematics. Springer-Verlag, Berlin Heidelbert, New York 1978. Google Scholar
[3] 3. Day, M.M., Fixed point theorems for compact convex sets. 111. J. Math. 5 (1961), pp. 585 — 590. Google Scholar
[4] 4. Day, M.M., Correction to my paper “Fixed point theorems for compact convex sets“, 111. J. Math. 8(1964), p. 713. Google Scholar
[5] 5. Ganeson, S., On amenability of the semigroup of probability measures on topological groups. Ph.D. Thesis, SUNY at Albany, 1983. Google Scholar
[6] 6. Ganeson, S., P-amenable locally compact groups. To appear. Google Scholar
[7] 7. Glickberg, , Weak compactness and separate continuity. Pacific J. Math. 11 (1961), pp. 205 — 214. Google Scholar
[8] 8. Greenleaf, F.P., Invariant means on topological groups and their applications. Van Nostrand, Princeton, N.J., 1969. Google Scholar
[9] 9. Hewitt, E. and Ross, K.A., Abstract harmonic analysis I. Springer-Verlag Berlin, 1963. Google Scholar
[10] 10. Kharaghani, H., Invariant means on topological semigroups. Ph.D. Thesis, University of Calgary, 1974. Google Scholar
[11] 11. Lau, A., Invariant means on almost periodic functions and fixed point properties. Rocky Mountain J. Math. 3(1973), pp. 6999–76. Google Scholar
[12] 12. Mitchell, T., Function algebras, means and fixed points. Trans. Amer. Math. Soc. 130 (1968), pp. 117–126. Google Scholar
[13] 13. Mitchell, T., Topological semigroups and fixed points. 111. J. Math. 14 (1970), pp. 630–641. Google Scholar
[14] 14. Rickert, N.W., Amenable groups and groups with the fixed point property. Trans. Amer. Math. Soc. 127(1967), pp. 2210–232. Google Scholar
[15] 15. Williamson, J., Harmonic analysis on semigroups. J. London Math. Soc. 41 (1967), pp. 1—41. Google Scholar
[16] 16. Wong, James C. S., Topological invariant means and locally compact groups and fixed points. Proc. Amer. Math. Soc. 27 (1971), pp. 572–578. Google Scholar
[17] 17. Wong, James C. S., Invariant means on locally compact semigroups. Proc. Amer. Math. Soc. 31 (1972), pp. 39–45. Google Scholar
[18] 18. Wong, James C. S., Topological semigroups and representations. Trans. Amer. Math. Soc. 200 (1974), pp. 89–109. Google Scholar
[19] 19. Wong, James C. S., Convolution and separate continuity. Pacific J. Math. 75 (1978) pp. 601 -611. Google Scholar
[20] 20. Wong, James C. S., Uniform semigroups and fixed point properties. To appear. Google Scholar
[21] 21. Wong, James C. S., On the semigroup of probability measures of a locally compact semigroup. To appear. Google Scholar
Cité par Sources :