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Maejima, Makoto - Department of Mathematics, Keio University
CURRICULUM VITAE Name : Makoto MAEJIMA
Publications 1. M. Maejima, Some limit theorems for renewal processes with non-identically
Statistics & Probability Letters 77 (2007) 838842 A characterization of subclasses of semi-selfdecomposable
Infinite Divisibility for Stochastic Processes and Time Change
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E l e c t r o n b a b i l i t y
ARTICLE IN PRESS Statistics and Probability Letters ( )
Characterizations of subclasses of type G distributions on Rd
Fixed points of mappings of infinitely divisible distributions on Rd
A NOTE ON NEW CLASSES OF INFINITELY DIVISIBLE DISTRIBU-TIONS ON Rd
Semigroups of Upsilon Transformations Ole E. Barndor-Nielsen
STOCHASTIC INTEGRAL CHARACTERIZATIONS OF SEMI-SELFDECOMPOSABLE DISTRIBUTIONS AND
arXiv:1006.1047v1[math.PR]5Jun2010 NESTED SUBCLASSES OF THE CLASS OF
-SELFDECOMPOSABLE DISTRIBUTIONS, MILD ORNSTEIN-UHLENBECK TYPE PROCESSES
PROBABILITY MATHEMATICAL STATISTICS
A note on a bivariate gamma distribution Makoto Maejimaa,
Elect. Comm. in Probab. 15 (2010), 227239 ELECTRONIC COMMUNICATIONS
SOME PROPERTIES OF EXPONENTIAL INTEGRALS OF LEVY PROCESSES AND EXAMPLES
THE GENERALIZED LANGEVIN EQUATION AND AN EXAMPLE OF TYPE G DISTRIBUTIONS
E l e c t r o n i o b a b i l i t y
E l e c t r o n i o b a b i l i t y
LIMITS OF BIFRACTIONAL BROWNIAN NOISES MAKOTO MAEJIMA AND CIPRIAN A. TUDOR
J. Math. Kyoto Univ. (JMKYAZ) 43-3 (2003), 609639
-selfdecomposable distributions and related Ornstein-Uhlenbeck type processes
Subclasses of Goldie-Steutel-Bondesson class of infinitely divisible distributions on Rd
Publications 1. M. Maejima, Some limit theorems for renewal processes with non-identically
A Class of Random Matrices with Infinitely Divisible Determinants
Some classes of multivariate infinitely divisible distributions admitting stochastic
CLASSES OF INFINITELY DIVISIBLE DISTRIBUTIONS ON Rd RELATED TO THE CLASS OF SELFDECOMPOSABLE
DISTRIBUTIONS OF EXPONENTIAL INTEGRALS OF INDEPENDENT INCREMENT PROCESSES RELATED TO
Selfdecomposability of moving average fractional Levy processes $
