Method of indivisibles
(1985). Laplace-Gauß integrals, Gaussian measure asymptotic behaviour
and probabilities of moderate deviations. Z. Anal. Anw. 4, 3, 257-267.
(1986). Integral Laplasa i verojatnosti umerennych ukolenii v Rk.
V kn.: Verojantnostnye raspredelenija i matematitscheskaja statistika. (Laplace-Integral und Wahrscheinlichkeiten mittlerer Abweichungen im Rk.
In: Wahrscheinlichkeitsverteilungen und Mathematische Statistik). Tashkent:
Iso.-vo `Fan',(russisch), 406-420.
(1988). Exact distributions of sample functions in exponential regression. 18th European
Meeting of Statisticians. Abstract of Comm., 210.
(1991). Eine geometrische Methode in der Stochastik. Rostock. Math. Kolloq. 44,63-72.
(1995). A geometric approach to the Gaussian law. In: Symposia Gaussiana,
Conf. B, Eds.: Mammitzsch /Schneeweiß. Walter de Gruyter & Co.,
Bln., 25-45.
(1995). Eine geometrische und eine asymptotische Methode in der Statistik.
Universität Bremen, Mathematik- Arbeitspapiere Nr. 44, 2-10.
with V. Henschel (2002). Geometric generalization of the exponential law.
J. Mult. Anal., 81, 189-204. doi:10.1006/jmva.2001.2001
(2007). Generalized spherical and simplicial coordinates. J. Math. Anal. Appl. 336, 1187-1202. doi:10.1016/j.jmaa.2007.03.047
(2009). Continuous ln,p-symmetric distributions. Lithuanian Math. J.,
49, 1, 93-108.
(2011). Ellipses numbers and geometric measure representations. Accepted for print.
(2011-1). Circle numbers for stardiscs. ISRN Geometry, Article ID 479262, 16 pages.
(2011-2). On the ball number function. Lithuanian Math. J.,
51, 3, 440-449.
(2012-1). Geometric and stochastic representations for elleptically contoured distributions. Accepted for print.
with S.Kalke and F.Thauer (2012-2). Linear combinations, products and ratios of simplicial or spherical variates. Accepted for print.
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