Научная статья на тему 'On the limit distribution of sums of real random variables'

On the limit distribution of sums of real random variables Текст научной статьи по специальности «Математика»

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Ключевые слова
ЗАВИСИМЫЕ СЛУЧАЙНЫЕ ВЕЛИЧИНЫ / DEPENDENT RANDOM VARIABLES / SUMS OF DEPENDENT RANDOM VARIABLES / ПРЕДЕЛЬНОЕ РАСПРЕДЕЛЕНИЕ СУММ СЛУЧАЙНЫХ ВЕЛИЧИН / LIMIT DISTRIBUTION OF SUMS OF RANDOM VARIABLES / НОРМАЛЬНОСТЬ ПРЕДЕЛЬНОГО РАСПРЕДЕЛЕНИЯ СУММ СЛУЧАЙНЫХ ВЕЛИЧИН / THE NORMALITY OF THE LIMIT DISTRIBUTION OF SUMS OF RANDOM VARIABLES / СУММА ЗАВИСИМЫХ СЛУЧАЙНЫХ ВЕЛИЧИН

Аннотация научной статьи по математике, автор научной работы — Chebotarev Sergey V.

Considers centered sequence of absolutely continuous random variables with a non-trivial weak limit of ∑ the sums 1 n

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О предельном распределении сумм действительных случайных величин

Рассмотрены центрированные последовательности абсолютно непрерывных случайных величин, ∑ 1 n имеющие нетривиальный слабый предел сумм

Текст научной работы на тему «On the limit distribution of sums of real random variables»

Journal of Siberian Federal University. Mathematics & Physics 2017, 10(3), 310—313

УДК 519.21

On the Limit Distribution of Sums of Real Random Variables

Sergey V. Chebotarev*

Altai state pedagogical university Molodezhnaya, 55, Barnaul, 656015

Russia

Received 28.10.2016, received in revised form 12.12.2016, accepted 10.03.2017 Considers centered sequence of absolutely continuous random variables with a non-trivial weak limit of 1 "

the sums We found a general view of the limit distribution. It is shown that the form of the

V" -f-f

v i=i

limit distribution depends only on the average mixed moments of the first order, describing the sequence of Rademacher random variables, into which can be decomposed the elements of the given sequence.

Keywords: dependent random variables, the sums of dependent random variables, limit distribution of sums of random variables, the normality of the limit distribution of sums of random variables. DOI: 10.17516/1997-1397-2017-10-3-310-313.

Introduction

In this paper we continue the study initiated in [1]. The main purpose is to obtain a general form of the limit distribution sums of centered absolutely continuous random variables with a

1 n

non-trivial weak limit of the sums ^^ V^ £i.

Vn i=1

v i=i

1. Preliminary results

Let us consider a sequence of absolutely continuous centered real random variables £ = (^t)teN. We assume that the random variables are defined at similar spaces of elementary events Qt = Q,t e I with similar a-algebras of events At = A. As previously, we assume QI = Q1 x Q2 x ... x Qt x ... and AI = A1 x A2 x ... x At x .... The space of values of random variables, we assume the set of real numbers £t(w) e Xt = R, w e Qt with given on it Borel a-algebra B. By analogy with previous unite into the set such the sequence of random variables £ = (£t)teN, for which exists a continuous random variable m - weak limit of sequence

1n

S1/2 (£(n)) = ]C £t

weak lim Si (£ ).

We also denote c subset of sequences with averaged links (shortly sal) £ = (£t)teN, the existence and construction of which is shown in Theorem 3.3 [2] and for distribution functions of this sequences the following property satisfied:

(y) = Frii(y), Vy e R.

* [email protected] © Siberian Federal University. All rights reserved

We study the limit distribution of the random variable nt ■

k 1 n

Vt "== lim —^ y]£t, where £ = (£t)teN & S3. n^-rn yjn

In fact, to achieve this goal we needed to prove the existence of such a sequence 7 = Y(£) & S1, that

FV( (x) = Fm (x), Vx & R

and apply Theorem 3 [1] to it. Issues of existence and the construction of sequences of this type for a given distribution of sums of elements of the initial sequences are described in [2]. Therefore, we will be based on results of this work.

2. Main results

1n

Consider the approximation sums S1/2(£(n)) = ^^ £t of random variables the investigated

* n t=i

sequence £ by sums S1/2(n(s n)) = —^ nt s n of lattice random variables nt s n. For this

n t=1

e we div

Axs (k) = ^

t=1

purpose we divide the set of real numbers R as follows:

'2k - s - 1 2k - s + 1

s - 1

At that we put

s 1 s 1

for k = 1,... ,s — 1, Axs(0) = ( —x,--, Axs(s) = ( —, to ).

ss

2k s

^Si/2(n(s ,n)) = = P(Si/2(£(n)) & Axn(k)) = Ps1/2(Axs(k)), k = 0,1,...,s.

For n(s,n) in [2] shown ( see Theorem 2.4) the existence of a finite sal ft(s,n), having the same distribution of sums. Out there it also shown the existence of a finite and Rademacher type sal Y(sn) such that

1 s-\

nt,s,n = — Jt+i-n (1)

V s i=0

v i=0

For it also is performed the relation:

1 sn

FSi/2(nw)(x) = FS1/2(^l(sn)) Vx & R, where S1/2 (Y(sn)) = —rs=Y,Yt.

vsn t=1

Proceeding to the limit with s ^ x>, obtain the sal Y(n,N) for which

1 sn

FSi/2(t(n))(x) = FSi/2(7(„^ )) Vx & R, where S1/2 (Y(nN)) w=e=k slim —rsnJ2Yt.

v +_ 1

Note that Y(n,N) & S1. Further, proceeding to the limit with n ^ <x, obtain, on the one parties, sal Y for which

k 1 r

Fn6 (x) = F„. (x) Vx & R, where ny w=== lim ^p Yt.

6 T r —yco * r

t=1

But on the other parties, random variables of sal £, constructed by the limit sum of the original sequence £, nothing else than

- weak - weak 1 ^

£t w== lim lim nt s n or a considering (1), we have £,t we= lim lim — Yt+in.

n^oo s^w ' ' n^oo s^w ^—^

v i=0

Then

Lemma 1. Let us assume that a sequence £ e S3 is given. Then there exists a sequence 7 = Y(£) e Si such that

Fn e (x) = FVi (x), Vx e R. Proof. Follows from the foregoing. □

Theorem 1. Let us assume that a sequence £ e S3 is given. Then random variable n

n

weak 1

n == lim £t,

v t=1

have a density distribution function f as follows:

1 _ ^ ~ m=0

where vm are mixed moments of the sequence Y(£) e S1, constructed in Lemma 1. Proof. Follows from Theorem 3 [1] and Lemma 1.

ff (x) = —= e V" vm(Y) • hm(x), Vx e R,

V m=0

Theorem 2. Let us assume that a sequence £ e S3 is given. Then, if the density distribution function f of the random variable n

1n weak 1

n == lim £t,

Jn z—'

v t=1

is continuous function, all moments for this random variable are exist and finite.

Proof. Similarly to the proof Corollary 1 [1]. □

Corollary 1. Let us assume that a sequence £ e S3 is given. Then a random variable n

n

weak 1

n == lim ^ > £t

v t=1

have a standard normal distribution then and only then when

lim vm(Y(n)) =0, Vm > 2. Proof. Obviously follows from the expression for density of limit distribution in Theorem 1.

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Concerning the moments of sequence of random variables £ can be argued, considering relation (16) [1] and method of forming sequence 7, that

• if

Vm(£) = lim lim sm ■ vm(\n),s) =0, Vm > 2,

п^ж s^Ж

then the sequence £ has zero average mixed moments for m = 2,3 ..., that is particularly true for independent random variables;

• if

Vm(£) = lim lim sm ■ vm(Y(n),s) < ж, Vm > 2,

п^ж s^ж

then the sequence £ has finite moments; • and if beginning with some m = m0

Vm(£) = lim lim sm ■ vm(Y(n),s) = ж,

then moments (m > m0) of sequence £ does not exist.

References

[1] S.V.Chebotarev, On Limit Distribution of Sums of Random Variables, Journal of Siberian Federal University. Mathematics & Physics, 9(2016), no 1, 17-29.

[2] S.V.Chebotarev, About sequences of random variables with averaged links, Vestnik AltSPA, seriya: estestv. i tochnye nauki, 7(2011), 28-37 (in Russian).

О предельном распределении сумм действительных случайных величин

Сергей В. Чеботарев

Алтайский государственный педагогический университет Молодежная, 55, Барнаул, 656015

Россия

Рассмотрены центрированные последовательности абсолютно непрерывных случайных величин,

1 n

имеющие нетривиальный слабый предел сумм у Для них найден общий вид предельного

v i=i

распределения. Показано, что вид предельного распределения зависит лишь от усредненных смешанных моментов первого порядка, характеризующих случайные величины последовательности радемахеровских случайных величин, в которую можно разложить элементы рассматриваемой последовательности.

Ключевые слова: зависимые случайные величины, сумма зависимых случайных величин, предельное распределение сумм случайных величин, нормальность предельного распределения сумм случайных величин.

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