-
1
-
-
0012489605
-
A limit theorem for statistics of spatial data
-
Baddeley, A., 1980. A limit theorem for statistics of spatial data. Adv. Appl. Probab. 12, 447-461.
-
(1980)
Adv. Appl. Probab.
, vol.12
, pp. 447-461
-
-
Baddeley, A.1
-
3
-
-
0012489772
-
Asymptotic normality of random fields with mixing
-
Bulinskii, A.V., 1985. Asymptotic normality of random fields with mixing. Soviet Math. Dokl. 32 (2), 523-527.
-
(1985)
Soviet Math. Dokl.
, vol.32
, Issue.2
, pp. 523-527
-
-
Bulinskii, A.V.1
-
5
-
-
4243435822
-
Limit theorems for the empirical distribution function in the spatial case
-
Technical Report, 8/2001, University of Debrecen, Hungary
-
Fazekas, I., 2001. Limit theorems for the empirical distribution function in the spatial case. Technical Report, 8/2001, University of Debrecen, Hungary, p. 24.
-
(2001)
, pp. 24
-
-
Fazekas, I.1
-
6
-
-
4243432247
-
Asymptotic normality of kernel-type density estimators for random fields
-
Manuscript, University of Debrecen, Hungary
-
Fazekas, I., Chuprunov, A.N., 2001. Asymptotic normality of kernel-type density estimators for random fields. Manuscript, University of Debrecen, Hungary.
-
(2001)
-
-
Fazekas, I.1
Chuprunov, A.N.2
-
7
-
-
0012489773
-
A central limit theorem for mixing random fields and its statistical applications
-
Proceedings of the Conference on Limit Theorems, Balatonlelle, Hungary, in preparation
-
Fazekas, I., Kukush, A.G., 1999. A central limit theorem for mixing random fields and its statistical applications. Proceedings of the Conference on Limit Theorems, Balatonlelle, Hungary, in preparation.
-
(1999)
-
-
Fazekas, I.1
Kukush, A.G.2
-
8
-
-
0000957182
-
Infill asymptotics inside increasing domains for the least squares estimator in linear models
-
Fazekas, I., Kukush, A.G., 2000. Infill asymptotics inside increasing domains for the least squares estimator in linear models. Statist. Inference. Stochastics Proc. 3, 199-223.
-
(2000)
Statist. Inference. Stochastics Proc.
, vol.3
, pp. 199-223
-
-
Fazekas, I.1
Kukush, A.G.2
-
9
-
-
0001301654
-
Convergence theorems for empirical Lorenz curves and their inverses
-
Goldie, C.M., 1977. Convergence theorems for empirical Lorenz curves and their inverses. Adv. Appl. Probab. 9, 765-791.
-
(1977)
Adv. Appl. Probab.
, vol.9
, pp. 765-791
-
-
Goldie, C.M.1
-
11
-
-
0000315194
-
On inconsistency of estimators based on spatial data under infill asymptotics
-
Lahiri, S.N., 1996. On inconsistency of estimators based on spatial data under infill asymptotics. Sankhya, Ser. A 58, 403-417.
-
(1996)
Sankhya, Ser. A
, vol.58
, pp. 403-417
-
-
Lahiri, S.N.1
-
12
-
-
0033449128
-
Asymptotic distribution of the empirical spatial cumulative distribution function predictor and prediction bands based on a subsampling method
-
Lahiri, S.N., 1999. Asymptotic distribution of the empirical spatial cumulative distribution function predictor and prediction bands based on a subsampling method. Probab. Theory Relat. Fields 114, 55-84.
-
(1999)
Probab. Theory Relat. Fields
, vol.114
, pp. 55-84
-
-
Lahiri, S.N.1
-
13
-
-
0003485065
-
-
Science Press, New York-Beijing, Kluwer, Dordrecht-Boston-London
-
Lin, Z., Lu, C., 1996. Limit Theory for Mixing Dependent Random Variables. Science Press, New York-Beijing, Kluwer, Dordrecht-Boston-London.
-
(1996)
Limit Theory for Mixing Dependent Random Variables
-
-
Lin, Z.1
Lu, C.2
-
14
-
-
0012489965
-
On the central limit theorem for nonuniform φ-mixing random fields
-
Maltz, A.L., 1999. On the central limit theorem for nonuniform φ-mixing random fields. J. Theoret. Probab. 12, 643-660.
-
(1999)
J. Theoret. Probab.
, vol.12
, pp. 643-660
-
-
Maltz, A.L.1
-
15
-
-
0001380311
-
Limit theorems for stochastic processes
-
Skorokhod, A.V., 1956. Limit theorems for stochastic processes. Theory. Probab. Appl. 1, 261-290.
-
(1956)
Theory. Probab. Appl.
, vol.1
, pp. 261-290
-
-
Skorokhod, A.V.1
-
16
-
-
0012541478
-
Weak convergence of multidimensional empirical processes for strong mixing sequences of stochastic vectors
-
Yoshihara, K., 1975. Weak convergence of multidimensional empirical processes for strong mixing sequences of stochastic vectors. Z. Wahrsch. Gebiete 33, 133-137.
-
(1975)
Z. Wahrsch. Gebiete
, vol.33
, pp. 133-137
-
-
Yoshihara, K.1
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