Zap. Nauchn. Sem. LOMI, 1982, Volume 119

JOURNALS // Zapiski Nauchnykh Seminarov POMI // Archive

1982, Volume 119

Contents

Problems of the theory of probability distributions. Part VII

	Moderate deviations for densities in $\mathbb R^k$ N. N. Amosova, W. Richter		7
	On compact sets of additive measures S. G. Bobkov		14
	On distribution of integrable type functionals of Brownian motion A. N. Borodin		19
	Occupation times for countable Markov chains. I. Chains with discrete time. S. S. Vallander		39
	Local limit theorems for linear generated random vectors V. V. Gorodestkii		62
	On the Gram–de Finetti matrices L. N. Dovbysh, V. N. Sudakov		77
	On connection berween the law of large numbers for squares and the law of iterated logarithm V. A. Egorov		87
	On application of concentration inunctions to estimation of uniform distance between distributions. A. Yu. Zaitsev		93
	Estimates for the Levy-Prohorov distance in terms of characteristic functions and some applications of them. A. Yu. Zaitsev		108
	Behavior of the oscillation function and conditional Gaussian distributions of linear funotionals Yu. Ch. Kokayev		128
	The uniqueness theorem for measures in $C(K)$ and its application in the theory of stochastic processes. A. L. Koldobskii		144
	The absolute continuity of the functional “supremum” type for Gaussian processes. M. A. Lifshits		154
	Distribution of functionals on finitedimensional spaces and distributions of Gaussian sample functions. S. B. Makarova		167
	Stability of the sufficiency property of the statisties “the value in the final moment” for the processes with independent increments Nguyen Kong Shi		174
	Some limit theorems for ordered spacings V. B. Nevzorov		177
	Bahadur efficiency of integral type of symmetry Ya. Yu. Nikitin		181
	On taking into consideration the effect of ties in the two-samples Wilcoxon test M. S. Nikulin, I. S. Yusas		195
	Sequences of $m$-orthogonal random variables V. V. Petrov		198
	Gaussian $f$-regular processes and asymptotic behavior of likelihood function V. N. Solev		203
	Central limit theorem: convergence in the norm $\\|u\\|=\bigl(\int_{-\infty}^\infty u^2(x)e^{\frac{x^2}2}\,dx\bigr)$ S. V. Fomin		218
	Outleading sequences and continuous semi-Markov processes on the line. B. P. Harlamov		230