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Literature A) Stability on vector spaces
DETTWEILER, E.: “Stabile Maße auf Badrikianschen Räumen”. Math. Z. 146 (1976) 149–166.
HALL, P.: “A comedy of errors: The canonical form for a stable characteristic function”. Bull. London Math. Soc. 13 (1981) 23–27.
JUREK Z.J., URBANIK K.: “Remarks on stable measures on Banach spaces”. Coll. Math. 38 (1978) 269–276.
B)Generalizations (Semistable and self decomposable measures
FORST G.: “A characterization of self decomposable probabilities on the half line”. Z. Wahrscheinlichkeitstheorie verw. Geb. 49 (1979) 349–352.
KRAPAVICKAITE D.: “Certain classes of probability distributions”. Lith. Math. J. 20 (1981) 298–304.
KRAPAVICKAITE D.: “Generalized semistable probability distributions in Hilbert space”. Lith. Math. J. 20 (1980) 111–118.
KRUGLOV V.M.: “On an extension of the class of stable distribution functions”. Theory Prob. Appl. 17 (1972) 723–732.
LAHA R.G., ROHATGI V.K.: “Stable and semistable probability measures on a Hilbert space. Essays in Statistics and probability. North Holland, Pub. Co (1981).
PILLAI R.N.: “Semistable laws as limit distributions”. Ann. Math. Stat. 42 (1971) 780–783.
SATO K.: “Class L of multivariate distributions”. J. Mult. Anal. 10 (1980) 207–232.
SHIMIZU R.: “Characteristic functions satisfying a functional equation I, II”. Ann. Inst. Stat. Math. 20 (1968) 187–209 and 21 (1969) 391–405.
URBANIK K.: “Remarks on B-stable probability distributions”. Bull. Acad. Pol. Sci. (1976) 783–787.
URBANIK K.: “A representation of self decomposable distributions”. Bull. Acad. Pol. Sci. 16 (1968) 209–214.
URBANIK K.: “Limit laws for sequences of normed sums satisfying some stability conditions”. Multivariate Analysis III (1973) 225–237, Academic Press, New York.
URBANIK K.: “Self decomposable probability measures on R m”. Zastosowania Mat. 10 (1969) 91–97.
VAN THU, NGUYEN: “Multiply self decomposable probability measures in Banach spaces”. Studia Math. 66 (1979/80) 161–175.
VAN THU, NGUYEN: “A characterization of mixed stable laws”. Bull. Acad. Pol. Sci. 27 (1979) 629–630.
WOLFE S.J.: “A characterization of Lévy probability distribution functions on Euclidean spaces”. J. Mult. Analysis 10 (1980) 379–384.
C)Further generalizations
BERG CH., FORST G.: “Multiply self decomposable probability measures on— and Z+”. Preprint (1981) Nr.6, Kopenhavns Univ. Matematisk Inst.
JUREK Z.J.: “Some characterization of the class of s-self-decomposable distributions”. Bull. Acad. Pol. Sci. 26 (1978) 719–725.
JUREK Z.J.: “Properties of s-stable distribution function”. Bull. Acad. Pol. Sci. 27 (1979) 135–141.
JUREK Z.J.: “Limit distributions for shrunken random variables”. Diss. Math. 85 (1981) 1–46.
D)Operator stable measures
HUDSON W.N.: “Operator stable distributions and stable marginals”. J. Mult. Analysis 10 (1980) 26–37.
HUDSON W.N., MASON J.D.: “Exponents of operator stable laws.” Probabilities in Banach Spaces 3. Proceedings. Lecture Notes in Math. 860 (1981) 291–298.
HUDSON W.N., MASON J.D.: “Operator stable laws”. J. Mult. Analysis 11 (1981) 434–447.
HUDSON W.N., MASON J.D.: “Operator stable measures on R 2 with multiple exponents”. Ann. Prob. 9 (1981) 482–489.
JUREK Z.J.: “On stability of probability measures in Euclidean spaces”. Probability theory on Banach spaces II. Proceedings. Lecture Notes Math. 828 (1980) 129–145.
JUREK Z. J., SMALARA J.: “On integrability with respect to infinitely divisible measures”. Bull. Acad. Pol. Sci. (1980).
KRAKOWIAK W.: “Operator stable probability measures on Banach Spaces”. Coll. Math. 41 (1979) 313–326.
KUCHARCZAK J.: “On operator stable probability measures”. Bull. Acad. Pol. Sci. 23 (1975) 571–576.
KUCHARCZAK J.: “Remarks on operator stable measures”. Coll. Math. 34 (1976) 109–119.
KUCHARCZAK J., URBANIK K.: “Operator stable probability measures on some Banach spaces”. Bull. Acad. Pol. Sci. 25 (1977) 585–588.
Michalicek J.: “Die Randverteilungen der operatorstabilen Maße im zweidimensionalen Raum”. Z. Wahrscheinlichkeitstheorie verw. Geb. 21 (1972) 135–146.
MINCER B., URBANIK K.: “Completely stable measures on Hilbert spaces”. Coll. Math. 42 (1979) 301–307.
PARTHASARATHY K.R.: “Every completely stable distribution is normal”. Sankhyā 35 (1973) Ser. A, 35–38.
PARTHASARATHY K.R., SCHMIDT K.: “Stable positive definite functions”. Trans. Amer. Math. Soc. 203 (1975) 161–174.
SHARPE M.: “Operator stable probability measures on vector groups” Trans. Amer. Math. Soc. 136 (1969) 51–65.
SCHMIDT K.: “Stable probability measures on R n”. Z. Wahrscheinlichkeitstheory verw. Geb. 33 (1975) 19–31.
SEMORSKI S.V.: “Operator stable laws of distributions”. Soviet Math. Doklady 20 (1979) 139–142.
E)Domains of attraction for operator stable measures
JUREK Z.J.: “Central limit theorem in Euclidean spaces”. Bull. Acad. Pol. Sci. 28 (1980) 81–86.
HAHN M.G., KLASS M.J.: “Matrix normalization of sums of random vectors in the domain of attraction of the multi variate normal”. Ann. Prob. 8 (1980) 262–280.
HAHN M.G., KLASS M.J.: “A survey of generalized domains of attraction and operator norming methods”. Probabilities on Banach Spaces III, Proceedings. Lecture Notes Math. 860 (1981), 187–218.
HAHN M.G., KLASS M.J.: “The generalized domain of attraction of spherically symmetric stable laws on R d, Probability on Vector spaces II. Proceedings”. Lecture Notes Math. 828 (1980) 52–81.
HAHN M.G.: “The generalized domain of attraction of a gaussian law in a Hilbert space”. Probabilities on Banach spaces 2. Oberwolfach Lecture Notes in Math. 709 (1978) 125–144.
SEMORSKII V.M.: “The central limit theorem for sums of random vectors normalised by linear operators”. Sovjet Math. Doklady 20 (1979) 356–359.
F)Generalization of operator-stability (semistable and self-decomposable measures)
JAJTE R.: “Semistable probability measures on R N”. Studia Math. 61 (1977) 29–39.
JAJTE R.: “S-decomposable measures on a Hilbert space”. Bull. Acad. Pol. Sci. 27 (1979) 625–628.
JAJTE R.: “V-decomposable measures on a Hilbert space”. Probability theory on vector spaces II. Proceedings. (Blazejewko 1979) Lecture Notes in Math. 828 (1980) 108–127.
JUREK Z.J.: “Limit distributions and one parameter groups of linear operators on Banach spaces”. Report 8106 (1981) Math. Inst. Kath. Univ. Nijmegen.
JUREK Z.J.: “Convergence of types, self decomposibility and stability of measures on linear spaces”. Probability on Banach spaces III. Proceedings. Lecture Notes in Math. 860 (1981) 257–284.
KRAKOWIAK W.: “Operator semistable probability measures in Banach spaces”. Coll. Math. 53 (1980) 351–363.
URBANIK K.: “Lévy’s probability measures on Banach Spaces”. Studia Math. 63 (1978) 283–308.
URBANIK K.: “Lévy’s probability measures on Euclidean Spaces”. Studia Math. 44 (1972) 119–148.
G) Stability on groups
BALDI P.: “Lois stables sur les déplacements de R d” Probability measures on groups. Proceedings. Lecture Notes in Math. 706 (1979) 1–9.
CREPEL P., RAUGI A.: “Théorem central limite sur les groups nilpotents”. Ann. Inst. H. Poinceré 14 (1978) 145–162.
GALLARDO L.: “Processus subordonnés au mouvement brownien sur les groupes de Lie nilpotents”. Compt. Rend. Acad. Sc. Paris 292 (1981) 413–416.
HAZOD W.: “Subordination von Faltungs-und Operatorhalbgruppen”. Probability measures on groups. Proceedings. Lecture Notes Math. 706 (1979).
HULANICKI A.: “The distribution of energy in the Brownien motion in the gaussian field and analytic hyppoellipticity of certain subelliptic operators on the Heisenberg group”. Studia Math. 16 (1976) 165–173.
HULANICKI A.: “A Tauberien property of the convolution semigroup generated by X2 − ∣Y∣γ on the Heisenberg group”. Proceedings. Symposia Pure Math. (AMS) 35 (1979) 403–405.
HULANICKI A.: “Commutative subalgebras of L1 (G) associated with a subelliptic operator on a Lie group G”. Bull. Amer. Math. Soc. 81 (1975) 121–124.
HULANICKI A.: “A class of convolution semi-groups of measures on a Lie groups”. Probability measures on vector spaces II. Proceedings. Lecture Notes Math. 828 (1980) 82–101.
RAUGI A.: “Théoreme de la limite centrale sur les groups nilpotents”. Z. Wahrscheinlichkeitstheorie verw. Geb. 43 (1978) 149–172.
RAUGI A.: “Théoreme de limite centrale pour un produit semidirect d’un groupe de Lie résoluble simplement connexe de type rigide par un groupe compact.” Probability measures on groups. Proceedings Lecture Notes Math. 706 (1979) 257–324.
TORTRAT A.: “Lois stables dans un groupe”. Ann. Inst. H. Poincaré Sect. B17 (1981) 51–61.
H) Convolution semigroups, generating distributions, structure of groups
GOODMAN R.: “Nilpotent Lie groups: Structure and applications to analysis”. Lecture Notes Math. 562 (1976).
GOODMAN R.: “Filtration and asymptotic automorphisms on nilpotent Lie groups”. J. Diff. Geometry 12 (1977) 183–196.
GOODMAN R.: “Filtrations and Canonical Coordinates on Nilpotent Lie groups”. Trans. Amer. Math. Soc. 237 (1978) 189–204.
GUIVARC’H Y.: “Croissance polynomiale et pédiodes des fonctions harmoniques”. Bull. Soc. Math. de France 101 (1973) 333–379.
GUIVARC’H Y.: “Sur la loi des grands nombres et le rayon spectral d’un marche aléatoire”. Asterisque 74 (1980) 47–98.
HAZOD W.: “Stetige Halbgruppen von Wahrscheinlichkeitsmaßen und erzeugende Distributionen”. Lecture Notes Math. Vol. 595 (1977).
HAZOD W.: “Über Faltungshalbgruppen von Wahrscheinlichkeitsmaßen”. Österreich Acad. Wiss. Math.-Natur. K. S. B. II, 181, 29–47 (1973).
HAZOD W.: “Über Faltungshalbgruppen von Wahrscheinlichkeitsmaßen II: Einige Klassen topologischer Gruppen”. Monatsh. für Math. 79, 25–45 (1975)
HEYER H.: “Probability measures on locally compact groups”. Ergebnisse der Math. Berlin-Heidelberg-New York, Springer 1977
JANSSEN A.: “Charakterisierung stetiger Faltungshalbgruppen durch das Lévy-Maß”. Math. Ann. 246, 233–240 (1980).
NAGEL A., STEIN E. M.: “Lecture on pseudodifferential operators”. Princeton Univ. Press 1979.
SIEBERT E.: “Fourier Analysis and Limit theorems for convolution semigroups on a locally compact group”. Adv. Math. 39 (1981) 111–154.
SIEBERT E.: “Wahrscheinlichkeitsmaße auf lokalkompakten maximal fastperiodischen Gruppen”. Dissertation, Tübingen 1972.
SIEBERT E.: “Über die Erzeugung von Faltungshalbgruppen auf beliebigen lokalkompakten Gruppen”. Math. Z. 131, 313–333 (1973).
SIEBERT E.: “On the generation of convolution semigroups on arbitrary locally compact groups II”. Arch. Math. (Basel) 28, 139–148 (1977).
METIVIER, G.: “Hypoellipticité analytique des groupes nilpotents de rang 2”. Duke M. J. 47 (1980) 195–221.
HELFFER, B.: “Hypoellipticité analytique sur des groupes nilpotents de rang 2” (d’apres G. Metivier). Seminaire Goulaouic-Schwartz 1979/80 Nr. 1
Literature
E. Lukacs, On some properties of symmetric stable distributions. Analytic function methods in probability theory. Coll. Math./ Soc. J. Bolyai 21, North Holland, Amsterdam, 1980
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Hazod, W. (1982). Stable probabilities on locally compact groups. In: Heyer, H. (eds) Probability Measures on Groups. Lecture Notes in Mathematics, vol 928. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0093225
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DOI: https://doi.org/10.1007/BFb0093225
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