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References
de ACOSTA, A., Stable measures and seminorms, Ann Prob. 3, 865–875. (1975)
de ACOSTA, A., Asymptotic behaviour of stable measures, Ann. Prob. 5, 494–499. (1977)
ARAUJO, A., (1975) On infinitely divisible laws in C[0,1], Proc. Amer. Math. Soc. 51, 179–185, Erratum 56, 393.
ARAUJO, A., GINE, E., (1979) On tails and domains of attraction of stable measures in Banach spaces, Trans. Amer. Math Soc. 248, 105–119.
ARAUJO, A., GINE, E., (1980) The Central Limit Theorem for Real and Banach Valued Random Variables, Wiley, New York.
BADGAR, W., (1980) in Mathematical models as a tool for the social sciences, Ed. B.J. West, Gordon of Breach, New York, p. 87.
BERMAN, S.M., (1973) Local times and sample function properties of stationary Gaussian processes, Indiana Univ. Math. J. 23, 69–94.
BREIMAN, L., (1968) Probability, Addison-Wesley, Reading Mass.
BREIMAN, S., (1968a) A delicate law of the iterated logarithm for non-decreasing stable processes, Ann. Math. Stat. 39, 1818–1824.
BRETAGNOLLE, J., DACUNHA-CASTELLE, D., KRIVINE, J.L., (1966) Lois stables et espaces Lp, Ann. Inst. H. Poincare B 2, 231–259.
BRILLINGER, D.R., Time Series: Data Analysis and Theory, Holt, Rinehart & Winston, New York.
BYCZKOWSKI, T., (1976) The invariance principle for group valued random variables, Studia Math. 56, 187–198.
BYCZKOWSKI, T., (1977) Gaussian measures on Lp spaces 0⩽p<∞, Studia math. 59, 249–261.
BYCZKOWSKI, T., (1979) Norm convergent expansion for Lφ-valued Gaussian random elements, Studia Math. 64, 87–95.
CAMBANIS, S., (1973) On some continuity and differentiability properties of paths of Gaussian processes J. Multivariate Anal 13, 420–433.
CAMBANIS, S., (1983) Complex symmetric stable variables and processes, in Contributions to Statistics: Essays in Honour of Norman L. Johnson, P.K. Sen, Ed., North Holland, New York, 63–79.
CAMBANIS, S., HARDIN Jr., C.D., WERON, A., (1983) Series and integral representations of symmetric stable processes, manuscript.
CAMBANIS, S., HARDIN Jr., C.D., WERON, A., (1984) Ergodic properties of stationary stable processes. Center for Stochastic Processes Tech. Rept. No. 57 Univ. of North Carolina.
CAMBANIS, S., MILLER, G., Some path properties of pth order and symmetric stable processes, Ann. Prob. 8, 1148–1156.
CAMBANIS, S., MILLER, G., (1981) Linear problems in pth order and stable processes, SIAM J. Appl. Math. 41, 43–69.
CAMBANIS, S., RAJPUT, B., (1973) Some zero-one laws for Gaussian processes, Ann. Prob. 1, 304–312.
CAMBANIS, S., ROSINSKI, J., WOYCZYNSKI, W.A., (1983) Convergence of Quadratic forms in p-stable random variables and θp-radonifying operators, Center for Stochastic Processes Tech. Rept. No. 41, Univ. of North Carolina.
CAMBANIS, S., SOLTANI, A.R., (1982) Prediction of stable processes: Spectral and moving average representations. Center for Stochastic Processes Tech. Rept. No. 11, Univ. of North Carolina.
CASSANDRO, M., JONA-LASINIO, G., (1978) Critical points behaviour and probability theory, Adv. in Phys. 27, 912–941.
CHANG, M., RAJPUT, B.S., TORTRAT, A., (1982) Semistable laws on topological vector spaces, Z. Wahr. und Verw. Gebiete 60, 209–218.
CHOBANJAN, S.A., TARIELANDZE, V.I., (1977) Gaussian characterizations of certain Banach spaces, J. Multivariate Anal. 7, 183–203.
CRAMER, H., (1960) On some classes of nonstationary stochastic processes, in Proc. 4th Berkeley Symp. Math. Statistics and Probability, Univ. California Press, 57–78.
CSISZAR, I., RAJPUT, B.S., (1976) A convergence of types theorem for probability measures on topological vector spaces with applications to stable laws. Z. Wahr. und Verw. Gebiete 36, 1–7.
DETTWEILER, E., (1976) Stabile Masse auf Badrikianschen Raumen, Math. Z. 146, 149–166.
DOOB, J.L., (1942) The Brownian movement and stochastic equations, Ann. of Math. 43, 351–369.
DUDLEY, R.M., (1973) Sample functions of the Gaussian processes, Ann. Probab. 1, 66–103.
DUDLEY, R.M., KANTER, M., (1974) Zero-one laws for stable measures, Proc. Amer. Math. Soc. 45, 245–252.
ERHARD, A., FERNIQUE, X., (1981) Fonctions aleatoires stable irregulieres, C.R. Acad. Sci. Paris 292, 999–1001.
EHM, W., (1981) Sample function properties of multi-parameter stable processes, Z.Wahr. und verw. Gebiete 56, 247–264.
FELLER, W., (1966) An Introduction to Probability Theory and its Applications, vol. 2, Wiley, New York.
FERNIQUE, X., (1970) Integrabilite des vecteurs Gaussiens, C.R. Acad. Sci. Paris 270 1698–1699
FERNIQUE, X., (1974) Une demonstration simple du theoreme de, R.M. Dudley et M. Kanter sur les lois zero-un pour les mesures stables, Lecture Notes in Math. 381, 78–79.
FERNIQUE, X., (1975) Regularite des trajectoires des fonctions aleatoires Gaussiennes, Lecture Notes in Math. 480, 1–96.
FRISTEDT, B., (1964) The behaviour of increasing stable processes for both small and large times, J. Math. Mech. 13, 849–856.
GINE, E., HAHN, M.G., (1983) On stability of probability laws with univariate stable marginals, Z. Wahr. und verw. Gebiete 64, 157–165.
GINE, E., MARCUS, M.B., (1983) The central limit theorem for stochastic integrals with respect to Levy processes, Ann. Prob. 11, 58–77.
GINE, E., ZINN, J., (1983) Central limit theorems and weak laws of large numbers in certain Banach spaces Z. Wahr. und verw. Gebiete 62, 323–354.
GNEDENKO, B.V., KOLMOGOROV, A.N., (1954) Limit Distributions for Sums of Independent Random Variables, Addison-Wesley, Reading (Mass.).
GRENANDER, U., (1949) Stochastic processes and statistical inference, Ark. Mat. 1, 195–277.
HAHN, M.G., KLASS, M.J., (1980) The generalized domain of attraction of spherically symmetric stable law on IRd, Lecture Notes in Math. 828, 52–81.
HAHN, M. B., KLASS, M.J., (1981) A survey of generalized domains of attraction and operator norming methods, Lecture Notes in Math. 860, 187–218.
HAHN, M.B., KLASS, M.J., (1983) Affine normality of partial sums of i.i.d. random vectors; A characterization, preprint.
HARDIN, Jr., C.D., (1982) On the spectral representation of symmetric stable processes, J. Multivariate Anal. 12, 385–401.
HARDIN, Jr., C.D., (1982 a) On the linearity of regression. Z. Wahr. und verw. Gebiete 61, 293–302.
HIDA, T., (1960) Canonical representations of Gaussian processes and their applications, Mem. College Sci. Univ. Kyoto ser. A 33, 109–155.
HIDA, T., (1980) Browmian Motion. Springer-Verlag, New York.
HOSOYA, Y., (1982) Harmonizable stable processes, Z. Wahr. und verw. Gebiete 60, 517–533.
HUDSON, W.N., MASON, J.D., VEEH, J.A., (1983) The domain of normal attraction of an operator-stable law, Ann. Prob. 11, 178–184.
HUGHES, B.D., SHLESINGER, M.F., MONTROLL, E.W., (1981) Random walks with self-similar clusters, Proc. Natl. Acad. Sci. USA 78, 3287–3291.
ITO, K., MCKEAN Jr., H.P., (1965) Diffusion Processes and Their Sample Paths, Springer-Verlag, Berlin, New York.
JAIN, N.S., KALLIANPUR, G., (1970) Norm convergent expansion for Gaussian processes in Banach spaces, Proc. Amer. Math. Soc. 25, 890–895.
JAJTE, R., (1968) On stable distributions in Hilbert space. Studia Math. 30, 63–71.
JONA-LASINIO, G., (1975) The renormalization group: a probabilistic view, Il. Nuovo Cim. 26, 99–137.
JUREK, Z., (1980) Domains of normal attraction of operator-stable measures on Euclidean spaces, Bull. Acad. Polon. Sci., 28, 397–409.
JUREK, Z., (1980 a) On stability of probability measures in Euclidean spaces, Lecture Notes in Math. 828, 128–145.
JUREK, Z., (1981) Convergence of types, selfdecomposability and stability of measures on linear spaces, Lecture Notes in Math. 860, 257–267.
JUREK, Z., URBANIK, K., (1978) Remarks on stable measures on Banach spaces, Coll. Math. 38, 269–276.
KANTER, M., (1972) Linear sample spaces and stable processes, J. Functional Anal. 9, 441–459.
KANTER, M., (1972 a) On the spectral representation for symmetric stable random variables. Z. Wahr. und verw. Gebiete 23, 1–6.
KANTER, M., (1972 b) A representation theorem for Lp-spaces, Proc. Amer. Math. Soc. 31, 472–474.
KHINCHIN, A.I., (1938) Two theorems for stochastic processes with stable distributions (in Russian) Mat. Sbornik 3, 577–584.
KHINCHIN, A.I., (1949) Mathematical Foundations of Statistical Mechanics, Dover Publ., Inc., New York.
KRAKOWIAK, W., (1979) Operator-stable probability measures on Banach spaces, Coll. Math. 41, 313–326.
KUELBS, J., (1973) A representation theorem for symmetric stable processes and stable measures on H., Z. Wahr. und verw. Gebiete 26, 259–271.
KUELBS, J., MANDREKAR, V., (1974) Domains of attraction of stable measures on a Hilbert space. Studia Math. 50, 149–162.
KUMAR, A., MANDREKAR, V., (1972) Stable probability measures on Banach spaces, Studia Math. 42, 133–144.
KRUGLOV, V.M., (1972) On the extension of the class of stable distributions, Theory Prob. Appl. 17, 685–694, also Lit. Math Sbornik 12, 85–88.
LACEY, H.E., (1974) Isometric Theory of Classical Banach Spaces, Springer-Verlag, New York.
LEADBETTER, R.M., LINDGREN, G., ROOTZEN, H., (1983) Extremes and Related Properties of Random Sequences and Processes, Springer-Verlag, New-York.
LEVY, P., (1924) Theorie des erreurs. La loi de Gauss et les lois exceptionnelles, Bull. Soc. Math. France 52, 49–85.
LEVY, P., (1937) Theorie de L’Addition des Variables Aleatoires, Gauthier-Villars, Paris.
LePAGE, R., (1972) Note relating Bochners integrals and repreducing kernels to series representations on Gaussian Banach spaces, Proc. Amer. Math. Soc. 32, 285–289.
LePAGE, R., (1980) Multidimensional infinitely divisible variables and processes. Part I: Stable case, Tech. Rept. 292 Stanford Univ.
LePAGE, R., WOODRUFFE, M., ZINN, J., (1981) Convergence to a stable distribution via order statistics, Ann. Prob. 9, 624–632.
LINDE, W., (1982) Operators generating stable measures on Banach spaces, Z. Wahr. verw. Geb. 60, 171–184.
LINDE, W., (1983) Infinitely Divisible and Stable Measures on Banach Spaces, Teubner Texte zur Math. vol. 58, Leipzig.
LINDE, W., MANDREKAR, V., WERON, A., (1980) p-stable measures and p-absolutely summing operators, Lecture Notes in Math. 828, 167–178.
LINDE, W., MANDREKAR, V., WERON, A., (1982) Radonifying operators related to p-stable measures on Banach spaces, Probability & Math. Statist. 2, 157–160.
LINDE, W., MATHE, P., (1980) Inequalities between integrals of p-stable symmetric measures on Banach spaces. Techn. Rept. 37 Univ. Jena (to appear in Probability & Math. Statist.).
LINDE, W., PIETSCH, A., (1974) Mappings of Gaussian cylindrical measures in Banach spaces, Theor. probab. Appl. 19, 445–460.
LOUIE, D., RAJPUT, B.S., TORTRAT, A., (1980) A zero-one dichotomy theorem for r-semistable laws on infinite dimensional linear spaces, Sankhya, ser A 42, 9–18.
LUKACS, E., (1967) Une caracterisation des processus stables et symmetriques, C.R. Acad. Sci. Paris 264, 959–960.
MANDELBROT, B.B., (1963) The variation of certain speculative prices, J. Business 36, 394–419, and 45 (1972), 542–543.
MANDELBROT, B.B., (1982) The Fractal Geometry of Nature, W.H. Freeman, San Francisco.
MANDELBROT, B.B., VAN NESS, J.W., (1968) Fractional Brownian motions, fractional noises and applications, SIAM Review 10, 422–437.
MANDREKAR, V., (1981) Domain of attraction problem on Banach spaces: A survey, Lecture Notes in Math. 860, 285–290.
MANDREKAR, V., WERON, A., (1982) α-stable characterization of Banach spaces (1<α<2), J. Multivariate Anal. 11, 572–580.
MARCUS, D., (1983) Non-stable laws with all projections stable, Z. Wahr. verw. Geb. 64, 139–156.
MARCUS, M.B., PISIER, G., (1982) Characterizations of almost surely continuous p-stable random Fourier series and strongly stationary processes, preprint
MARCUS, M.B., WOYCZYNSKI, W.A., (1979) Stable measures and central limit theorems in spaces of stable type, Trans. Amer. Math. Soc. 251, 71–102.
MARUYAMA, G., (1949) The harmonic analysis of stationary stochastic processes, Mem. Fac. Sci. Kyushu Univ. A 4, 45–106.
MARUYAMA, G., (1970) Infinitely divisible processes, Theor. Prob. Appl. 15, 3–23.
MASRY, E., CAMBANIS, S., (1982) Spectral density estimation for stationary stable processes. Center for Stochastic Processes Tech. Rept. 23, Univ. of North Carolina, to appear in Stochastic Proc. Appl.
MATHE, P., (1982) A note on classes of Banach spaces related to stable measures, Tech. Rept. 39, Univ. Jena, to appear in Math. Nachr.
MILLER, G., (1978) Properties of certain symmetric stable distributions. J. Multivariate Anal. 8, 346–360.
MIJNHEER, J.L., (1975) Sample Paths Properties of Stable Processes, Math. Centre Tracts 59, Amsterdam.
MONRAD, D., (1977) Stable processes: Sample function growth at a last exit time, Ann. Prob. 5, 435–462.
MONTROLL, E.W., SHLESINGER, M.F., (1982) On 1/f noise and other distributions with long tails, Proc. Natl. Acad. Sci. USA 79, 3380–3383.
MONTROLL, E.W., SHLESINGER, M.F., (1983) Maximum entropy formalism, fractals, scaling phenomena and 1/f noise: A tail of tails. J. Stat. Phys. 32, 209–230.
NOLAN, J.P., (1982) Local nondeterminism and local times for stable processes, Ph.D. Thesis Univ. of Virginia.
OKAZAKI, Y., (1979) Wiener integral by stable random measure Mem. Fac. Sci. Kyushu Univ. Ser. A 33, 1–70.
PAULAUSKAS, V.I., (1976) Some remarks on multivariate stable distributions, J. Multivariate Anal. 6, 356–368.
PAULAUSKAS, V.I., (1978) Infinitely divisible and stable laws in seperable Banach spaces, Litovsk. Mat. Sbornik 18, 101–114, Part II, 20(1980), 97–113 (joint with A. Rackauskas).
POURAHMADI, M., (1983) On minimality and interpolation of harmonizable stable processes, preprint.
PRAKSA-RAO, B.L.S., (1968) On characterization of symmetric stable process with finite mean, Ann. Math. Statist. 39, 1498–1501.
PRUITT, W.E., TAYLOR, S.J., (1969) Sample path properties of processes with stable components, Z. Wahr. verw. Geb. 12, 267–289.
RACKAUSKAS, A., (1979) A remark on stable measures on Banach spaces, Litovsk. Mat. Sbornik 19, 161–165, also 20, (1980), 133–145.
RAJAGOPAL, A.K., NGAI, K.L., RENDELL, R.W., TEITLER, S., (1983) Nonexponential decay in relaxation phenomena. J. Stat. Phys. 30, 285–292.
RAJPUT, B.S., (1972) Gaussian measures on Lp spaces, 1<p<∞, J. Multivariate Anal. 2, 382–403.
RAJPUT, B.S., (1976) A representation of the characteristic function of a stable probability measure on certain TV spaces J. Multivariate Anal. 6, 592–600.
RAJPUT, B.S., (1977) On the support of certain symmetric stable measures on TVS, Proc. Amer. Math. Soc. 63, 306–312, also 66, 331–334.
RAJPUT, B.S., CAMBANIS, S., (1973) Some zero-one laws for Gaussian processes, Ann. Prob. 1, 304–312.
RAJPUT, B.S., RAMA-MURTHY K., (1983) Spectral representation of semistable processes, and semistable laws on Banach spaces, Tech. Rept. Univ. of Tennessee.
ROOTZEN, H., (1978) Extremes of moving averages of stable processes Ann. Prob. 6, 847–869.
ROSINSKI, J., (1982) Random integrals of Banach space valued functions, preprint.
ROSINSKI, J., TARIELADZE, V.I., (1982) Remarks on sample path integrable random processes, preprint.
ROSINSKI, J., WOYCZYNSKI, W.A., (1983) Products of random measures, Multilinear random forms and multiple stochastic integrals, preprint, to appear in Proceedings Measure Theory, Oberwolfach 1983.
SALEHI, H., (1979) Algorithms for linear interpolator and interpolation error for minimal stationary stochastic processes, Ann. Prob. 7, 840–846.
SCHILDER, M., (1970), Some structure theorems for the symmetric stable laws, Ann. Math. Statist. 41, 412–421.
SCHRIBER, M., (1972) Quelques remarques sur les caracterisations des espaces Lp, 0<p<1 Ann. Inst. H. Poincare 8, 83–92.
SHARPE, M., (1969) Operator-stable probability distributions on vector groups, Trans. Amer. Math. Soc. 136, 51–65.
SINGER, I., (1970) Best Approximation in Normed Linear Space by Elements of Linear Subspaces, Springer-Verlag, New York.
SKOROHOD, A.V., (1957) Limit theorems for stochastic processes with independent increments, Theor. Prob. Appl. 2, 138–171.
SMOLENSKI, W., (1981) A new proof of the zero-one law for stable measures, Proc. Amer. Math. Soc. 83, 398–399.
SURGALIS, D., (1981) On L2 and non-L2 multiple stochastic integration, Lecture Notes in Control & Information Sci. 36, 212–226.
SZULGA, J., WOYCZYNSKI, W.A., (1983) Existence of a double random integral with respect to stable measures, J. Multivariate Anal. 13, 194–201.
TAQQU, M.S., WOLPERT, R., (1983) Infinite variance self-similar processes subordinate to a Poisson measure, Z. Wahr. verw. Geb. 62, 53–72.
TEITLER, S., RAJAGOPAL, A.K., NGAI, K.L., (1982) Relaxation processes and time scale transformations, Phys. Rev. A. 26, 2906–2912.
THANG, D.H., TIEN, N.Z., (1980) On the extension of stable cylindrical measures, Acta. Math. Vietnamica 5, 169–177.
THANG, D.H., TIEN, N.Z., (1982) Mappings of stable cylindrical measures in Banach spaces, Theor. Prob. Appl. 27, 492–501.
TIEN, N.Z., (1980) On the convergence of stable measures in a Banach spaces, preprint.
TIEN, N.Z., WERON, A., (1980) Banach spaces related to α-stable measures, Lecture Notes in Math. 828, 309–317.
TORTRAT, A., (1972) Lois e(λ) dans les espaces vectoriels et lois stables. Z. Wahr. verw. Geb. 37, 175–182.
TUNALEY, J.K.E., (1972) Conduction in a random lattice under a potential gradient, J. Appl. Phys. 43, 4783–4786.
URBANIK, K., (1968) Random measures and harmonizable sequences, Studia Math. 31, 61–88.
URBANIK, K., (1972) Levy’s probability measures on Euclidean spaces, Studia Math. 44, 119–148.
URBANIK, K., (1973) Levy’s probability measures on Banach spaces, Studia Math. 63, 283–308.
URBANIK, K., WOYCZYNSKI, W.A., (1967) Random integrals and Orlicz spaces, Bull. Acad. Polon. Sci. 15, 161–169.
VAKHANIA, N.N., (1979) Correspondence between Gaussian measures and Gaussian processes, Math. Notes 26, 293–297.
WERON, A., (1981) A conjecture on Banach spaces related to p-stable measures, Abstr. 3rd Vilnius Conf. 353–354, Vilnius.
WERON, A., (1983) Harmonizable stable processes on groups: Spectral, ergodic and interpolation properties, Center for Stochastic Processes, Tech. Rept. 32, Univ. of North Carolina.
WERON, K., RAJAGOPAL, A.K., NGAI, K.L., (1984) Superposable distributions in condensed matter physics, preprint.
WEST, B.J., SESHARDI, V., (1982) Linear systems with Levy fluctuations, Physica 113, A 203–216.
ZINN, J., (1975) Admissible translates of stable measures, Studia Math. 54, 245–257.
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Weron, A. (1984). Stable processes and measures; A survey. In: Szynal, D., Weron, A. (eds) Probability Theory on Vector Spaces III. Lecture Notes in Mathematics, vol 1080. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0099806
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