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Diffusion on Lie Groups II

Published online by Cambridge University Press:  20 November 2018

N. TH. Varopoulos*
Affiliation:
Université de Paris VI, 4 Place Jussieu 75005 Paris, France
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Abstract

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The heat kernel of an amenable Lie group satisfies either exp. We give a condition on the Lie algebra which characterizes the two cases.

Résumé

Résumé

Pour le noyau de la chaleur sur un groupe de Lie moyennable on a soit . On donne une condition sur l'algèbre de Lie qui caracterise les deux cas.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1994

References

1. Varopoulos, N. Th., Analysis on Lie groups, J. Funct. Anal. (2) 76(1988), 346410.Google Scholar
2. Varopoulos, N. Th., Saloff-Coste, L. and Coulhon, T., Analysis and geometry on groups, Cambridge Univ. Press, 1992.Google Scholar
3. Hörmander, L., Hypoelliptic second order operators, Acta Math. 119(1967), 147171.Google Scholar
4. Varadarajan, V. S., Lie groups, Lie algebras and their representations, Prentice-Hall, 1984.Google Scholar
5. Jacobson, N., Lie algebras, Interscience, 1962.Google Scholar
6. Chevalley, C., Théorie de groupes de Lie, tome HI, Hermann, 1955.Google Scholar
7. Reiter, H., Classical harmonie analysis and locally compact groups, Oxford, Math. Monograph, 1968.Google Scholar
8. Varopoulos, N. Th., Diffusion on Lie groups, Canad. J. Math. (2) 46(1994), 438448.Google Scholar
9. Alexopoulos, G., Fonctions harmoniques bornées sur les groupes résolubles, C. R. Acad. Sci. Paris 305 (1987), 777779.Google Scholar
10. Alexopoulos, G., A lower estimate for central probability on polycyclic group, Canad. J. Math. (5) 44(1992), 897910.Google Scholar
11. Hebisch, W., On heat kernels on Lie groups, preprint.Google Scholar
12. Guivarc'h, Y., Croissance polynômiale et périodes des fonctions harmoniques, Bull. Soc. Math. France 101(1973), 333379.Google Scholar
13. Alexopoulos, G., An application of homogenization theory to harmonie analysis: Harnack inequalities and Riesz transforms on Lie groups of polynomial growth, Canad. J. Math. (4) 44(1992), 691727.Google Scholar
14. Ibragimov, I. A. and Linnik, Yu. V., Independent and stationary sequences of random variables, Wolters-Noordhoff, 1971.Google Scholar
15. Varopoulos, N. Th., A potential theoretic property of soluble groups, Bull. Sci. Math. (2) 108(1983), 263273.Google Scholar
16. Stein, E. M. and Weiss, G., Introduction to Fourier analysis on Euclidean spaces, Princeton Univ. Press, 1971.Google Scholar
17. Szegö, G., Orthogonal polynomials, Amer. Math. Soc. Colloq. Publ. XXIII, 1939.Google Scholar
18. Hörmander, L., Estimates for translation invariant operators in LP spaces, Acta Math. 104(1960), 93139.Google Scholar
19. Varopoulos, N. Th., Sobolev inequalities on Lie groups and symmetric spaces, J. Funct. Anal. 86(1989), 1940.Google Scholar
20. Varopoulos, N. Th., Théorie de Hardy-Littlewood sur les groupes de Lie, C. R. Acad. Sci. Paris Ser. I 316(1993), 9991003.Google Scholar