УДК 517.53
Нехай
u
– субгармонічна в
ℝ
m
,
m
≥
2
,
функція нульового порядку з мірою Рісса
μ
на від'ємній півосі
O
x
1
,
n
(
r
,
u
)
=
μ
(
{
x
∈
ℝ
m
:
|
x
|
≤
r
}
)
,
d
m
=
m
-
2
для
m
≥
3
,
d
2
=
1
,
N
(
r
,
u
)
=
d
m
∫
1
r
n
(
t
,
u
)
t
m
-
1
ⅆ
t
.
За умови повільного зростання
N
(
r
,
u
)
знайдено асимптотику
u
(
x
)
при
|
x
|
=
r
→
+
∞
.
Досліджено також обернений зв'язок між регулярним зростанням
u
та поводженням
N
(
r
,
u
)
при
r
→
+
∞
.
УДК 517.53
Доведено існування цілих функцій довільного нижнього порядку і порядку для якихОтримані результати свідчать про непокращуваність умови однієї теореми Валірона.
The paper is devoted to the investigation of statistical properties of the sample estimator of the beta coefficient in the case when the weights of benchmark portfolio are constant and for the target portfolio, the global minimum variance portfolio is taken. We provide the asymptotic distribution of the sample estimator of the beta coefficient assuming that the asset returns are multivariate normally distributed. Based on the asymptotic distribution we construct the confidence interval for the beta coefficient. We use the daily returns on the assets included in the DAX index for the period from 01.01.2018 to 30.09.2019 to compare empirical and asymptotic means, variances and densities of the standardized estimator for the beta coefficient. We obtain that the bias of the sample estimator converges to zero very slowly for a large number of assets in the portfolio. We present the adjusted estimator of the beta coefficient for which convergence of the empirical variances to the asymptotic ones is not significantly slower than for a sample estimator but the bias of the adjusted estimator is significantly smaller.
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