- Yu.S. Eliseeva, F. Götze and A.Yu. Zaitsev. Estimates for the concentration functions in the Littlewood-Offord problem. J. Math. Sci. (N. Y.) 206, no. 2, 146-158, 2015.
- V.I. Bernik and F. Götze. A new connection between metric theory of Diophantine approximations and distribution of algebraic numbers. In Recent trends in ergodic theory and dynamical systems, 33-45, Contemp. Math., 631, Amer. Math. Soc., Providence, RI, 2015.
- V.I. Bernik and F. Götze. Distribution of real algebraic numbers of arbitrary degree in short intervals. Izv. Math. 79, no. 1, 18-39, 2015.
- F. Götze, A. Naumov and A. Tikhomirov. On minimal singular values of random matrices with correlated entries. Random Matrices Theory Appl. 4, no. 2, 30 pp, 2015.
- F. Götze, H. Kösters and A. Tikhomirov. Asymptotic spectra of matrix-valued functions of independent random matrices and free probability. Random Matrices Theory Appl. 4, no. 2, 85 pp, 2015.
- F. Götze and M. Venker. Local Universality of Repulsive Particle Systems and Random Matrices. Ann. Prob. 42, no. 6, 2207-2242, 2014.
- M. Baake, F. Götze and T. Jakobi. Radial spacing distributions from planar point sets. Acta Crystallogr. Sect. A 70 , no. 5, 472-482, 2014.
- S. G. Bobkov, G. P. Chistyakov and F. Götze. Berry-Esseen bounds in the entropic central limit theorem. Probab. Theory Related Fields 159, no. 3-4, 435-478, 2014.
- S. G. Bobkov, G. P. Chistyakov and F. Götze. Fisher Information and convergence to stable laws. Bernoulli 20, no. 3, 1620-1646, 2014.
- S. G. Bobkov, G. P. Chistyakov and F. Götze. Fisher Information and the Central Limit Theorem. Probab. Theory Related Fields 159, no. 1-2, 1-59, 2014.
- V. Bernik, F. Götze, O. Kukso.On algebraic points in the plane near smooth curves. Lith. Math. J. 54, no. 3, 231-251, 2014.
- M. Bloznelis and F. Götze. Preferred attachment in affiliation networks. J. Stat. Phys. 156, no. 4, 800-821, 2014.
- D. Kaliada, F. Götze and O. Kukso. The asymptotic number of integral cubic polynomials with bounded heights and discriminants. Lith. Math. J. 54, no. 2, 150-165, 2014.
- F. Götze and A. Zaitsev. Explicit rates of approximation in the CLT for quadratic forms. Ann. Prob. 42, no. 1, 354-397, 2014.
- N.V. Budarina and F. Götze. Distance between conjugate algebraic numbers in clusters. Math. Notes 94, no. 5-6, 816-819, 2013.
- S. G. Bobkov, G. P. Chistyakov and F. Götze. Stability problems in Cramér-type characterization in case of i.i.d. summands. Theory Probab. Appl. 57, no. 4, 568-588, 2013.
- V. Bernik, V. Beresnevich, F. Götze and O. Kukso. Distribution of algebraic numbers and metric theory of Diophantine approximation. Limit theorems in probability, statistics and number theory, 23-48, Springer Proc. Math. Stat., 42, 2013.
- W. van Zwet and F. Götze. The times of Yuri Vasilyevich Prokhorov. Theory Probab. Appl. 57, no. 2, 306-322, 2013.
- G. P. Chistyakov and F. Götze. Free infinitely divisible approximations of n-fold free convolutions. Prokhorov and contemporary probability theory, Springer Proc. Math. Stat., 33, 225-237, 2013.
- G. P. Chistyakov and F. Götze. Asymptotic expansions in the CLT in free probability. Probab. Theory Related Fields 157, no. 1-2, 107-156, 2013.
- S. G. Bobkov, G. P. Chistyakov and F. Götze. Convergence to stable laws in relative entropy. J. Theoret. Probab. 26, no. 3, 803-81857, 2013.
- S. G. Bobkov, G. P. Chistyakov and F. Götze. Rate of Convergence and Edgeworth-type Expansion in the Entropic Central Limit Theorem. Ann. Prob. 41, no. 4, 2479-2512, 2013.
- V. Bernik, F. Götze, O. Kukso. Regular systems of real algebraic numbers of third degree in small intervals. Analytic and probabilistic methods in number theory, 61-68, TEV, Vilnius, 2012.
- N. Alexeev, F. Götze, A. Tikhomirov. On the asymptotics of the distribution of singular numbers of a power of a random matrix. Zap. Nauchn. Sem. S.-Peterburg. Otdel. Mat. Inst. Steklov. (POMI) 408, 2012.
- M. Bloznelis, F. Götze, J. Jaworski. Birth of a strongly connected giant in an inhomogeneous random digraph. J. Appl. Probab. 49, no. 3, 601-611, 2012.
- S. G. Bobkov, G. P. Chistyakov and F. Götze. Stability Problems in Cramer-Type Characterization in case of i.i.d. Summands. Teor. Veroyatn. Primen. 57, no. 4, 701-723, 2012.
- S. G. Bobkov, G. P. Chistyakov and F. Götze. Entropic instability of Cramer's characterization of the normal law. Selected works of Willem van Zwet Sel. Works Probab. Stat., Springer, 231-242, 2012.
- S. G. Bobkov, G. P. Chistyakov and F. Götze. Bounds for characteristic functions in terms of quantiles and entropy. Electron. Commun. Probab. 17, no. 21, 1-9, 2012.
- G. P. Chistyakov and F. Götze. Asymptotic expansions in the CLT in free probability. Probab. Theory Related Fields, Online First, Doi: 10.1007/s00440-012-0451-2, 2012.
-
F. Götze and W.R. van Zwet. The times of Yuri Vasilyevich Prokhorov.
Teor. Veroyatn. Primen., no. 57, 353-369, 2012.
-
F. Götze and D. Zaporozhets. On the distribution of complex roots of random polynomials with heavy-tailed coefficients.
Teor. Veroyatn. Primen., no. 56, 812-818, 2011.
- S. G. Bobkov, G. P. Chistyakov and F. Götze. Non-uniform bounds in local limit theorems in case of fractional moments. I. Math. Methods of Statistics 20, no. 3, 171-191, 2011.
- S. G. Bobkov, G. P. Chistyakov and F. Götze. Non-uniform bounds in local limit theorems in case of fractional moments. II. Math. Methods of Statistics 20, no. 4, 269-287, 2011.
- S. G. Bobkov, G. P. Chistyakov and F. Götze. Convergence to
Stable Laws in Relative Entropy. J.
Theoret. Probab., Online First, DOI: 10.1007/s10959-011-0377-0, 2011.
- G.P. Chistyakov and F. Götze. The arithmetic of distributions in free probability theory. Cent. Eur. J. Math. 9, no. 5, 997-1050, 2011.
- G.P. Chistyakov, F. Götze and F. Lehner. Freeness of Linear
and Quadratic Forms in von Neumann Algebras. J. Funct. An. 261, no. 10, 2829-2844, 2011.
-
F. Götze and A. Yu. Zaitsev. Uniform estimates for the accuracy of approximation by short asymptotic expansions in the
central limit
theorem for quadratic forms. J. Math. Sci. (N. Y.) 176, no. 2, 162-189, 2011.
- Beresnevich, V. V.; Bernik, V. I. and Götze, F. On the distribution of the values of the resultants of integral
polynomials, (Russian) Dokl. Nats. Akad. Nauk Belarusi , 54, no. 5, 21-23, 2010.
-
V. V. Beresnevich; V. I. Bernik and F. Götze. Simultaneous approximations of zero by an integral polynomial, its derivative,
and small values of discriminants. (Russian) Dokl. Nats. Akad. Nauk Belarusi, 54, no. 2, 26-28, 2010.
-
S. G. Bobkov and F. Götze. Concentration of empirical distribution functions with applications to non-i.i.d. models.
Bernoulli, 16, no. 4, 1385-1414, 2010.
-
M. Bloznelis, F. Götze, V. Paulauskas, A. Rackauskas, A. and W. van Zwet. In memoriam: Vidmantas Kastytis Bentkus
(1949.07.28-2010.06.03). Lith. Math. J. 50, no. 4, 367-371, 2010.
-
S. G. Bobkov, F. Götze and A. N. Tikhomirov. On concentration of empirical measures and convergence to the semi-circle
law. J.
Theoret. Probab. 23, no. 3, 792-823, 2010.
-
V. Beresnevich, V. Bernik and F. Götze. The distribution of close conjugate algebraic numbers. Compos.
Math. 146, no. 5, 1165-1179, 2010.
-
F. Götze and A. Yu. Zaitsev. The accuracy of approximation in the multidimensional invariance principle for sums of
independent
identically distributed random vectors with finite moments.J. Math. Sci. (N. Y.) 167,
no. 4,
495-500, 2010.
-
F. Götze and A. N. Tikhomirov. The rate of convergence of spectra of sample covariance matrices.Theory Probab. Appl.
54, no. 1, 129-140, 2010.
- F. Götze and A. Tikhomirov.
The circular law for random matrices,
Ann. Prob., 38, no. 4, 1444-1491, 2010.
- N. Alexeev, F. Götze and A. Tikhomirov.
Asymptotic distribution of singular values of powers of random matrices,
Lith. Math. J., 50, no. 2, 121-132, 2010.
-
S. G. Bobkov, F. Götze and A. N. Tikhomirov. On the concentration of high dimensional matrices with randomly signed
entries.
J. Math. Sci. (N. Y.) 163, no. 4, 328-351, 2009.
- S. Bobkov and F. Götze.
Hardy type inequalities via Riccati and Sturm-Liouville equations,
Sobolev spaces in mathematics. I, 69-85,
Int. Math. Ser.(N.Y.),8, Springer New York, 2009.
- F. Götze and H. Kösters.
On the Second-Order Correlation Function of the Characteristic
Polynomial
of a Hermitian Wigner Matrix, Communications in Mathematical Physics, 285: 1183-1205, 2009.
- V. Bernik, F. Götze and O. Kukso.
On the divisibility of the discriminant of an integral polynomial by
prime powers,
Lith. Math. J.,
48, no. 4, 380-396, 2008.
- V. Bernik, F. Götze and O. Kukso.
Lower bounds for the number of integral polynomials with given order
of discriminants,
Acta Arith.,
133, no. 4, 375-390, 2008.
-
F. Götze and A. Zaitsev.
Bounds for the strong approximation in the multidimensional invariance
principle,
Theory Probab. Appl.,
53 (1):100-123, 2008.
-
F. Götze and M. Gordin.
Limit correlation functions for fixed trace random matrix
ensembles,
Comm. Math. Phys.,
281 (1):203-229, 2008.
-
G.P. Chistyakov and F. Götze.
Limit theorems in free probability theory. {II},
Cent. Eur. J. Math.,
6 (1):87-117, 2008.
-
G. P. Chistyakov and F. Götze.
Limit theorems in free probability theory. {I},
Ann. Probab.,
36 (1): 54-90, 2008.
-
F. Götze and A. Tikhomirov and V. Yurchenko.
Asymptotic expansion in the central limit theorem for quadratic forms,
Zap. Nauchn. Sem. S.-Peterburg. Otdel. Mat. Inst. Steklov. (POMI),
341:81-114, 230-231, 2007.
-
F. Götze, M. Gordin, and A. Levina.
Limit correlation functions at zero for fixed trace random matrix
ensembles.
Zap. Nauchn. Sem. S.-Peterburg. Otdel. Mat. Inst. Steklov,
341:68-80, 2007.
-
F. Götze and A. N. Tikhomirov and D. A. Timushev.
Rate of convergence to the semi-circle law for the deformed
Gaussian unitary ensemble.
Cent. Eur. J. Math., 5(2):305-334 (electronic), 2007.
-
Sergey G. Bobkov and Friedrich Götze.
Concentration inequalities and limit theorems for randomized sums.
Probab. Theory Related Fields, 137(1-2):49-81, 2007.
-
G. P. Chistyakov and F. Götze.
Independence of linear forms with random coefficients.
Probab. Theory Related Fields, 137(1-2):1-24, 2007.
-
S. A. Bogatyrev, F. Götze, and V. V. Ulyanov.
Non-uniform bounds for short asymptotic expansions in the CLT for
balls in a Hilbert space. J. Multivariate Anal.,
97 no.9, 2041-2056, 2006.
-
Friedrich Götze and Willem R. van Zwet.
An expansion for a discrete non-lattice distribution.
In Frontiers in statistics, pages 257-274. Imp. Coll. Press,
London, 2006.
-
Friedrich Götze and Franz Merkl.
Random spectral distributions.
In Interacting stochastic systems, pages 181-205. Springer,
Berlin, 2005.
-
F. Götze and A. N. Tikhomirov.
Asymptotic expansions in non-central limit theorems for quadratic
forms.
J. Theoret. Probab., 18(4):757-811, 2005.
-
Friedrich Götze and Alexander Tikhomirov.
The rate of convergence for spectra of GUE and LUE matrix
ensembles.
Cent. Eur. J. Math., 3(4):666-704 (electronic), 2005.
-
F. Götze and A. N. Tikhomirov.
Limit theorems for spectra of random matrices with martingale
structure.
In Stein's method and applications, volume 5 of Lect.
Notes Ser. Inst. Math. Sci. Natl. Univ. Singap., pages 181-193. Singapore
Univ. Press, Singapore, 2005.
-
S. G. Bobkov and F. Götze.
Complement to the paper: ``On the central limit theorem along
subsequences of noncorrelated observations'' [Teor. Veroyatnost. i
Primenen. 48 (2003), no. 4, 745-765; mr2142522].
Teor. Veroyatn. Primen., 49(2):412-414, 2004.
-
G. P. Chistyakov and F. Götze.
Distribution of the shape of Markovian random words.
Probab. Theory Related Fields, 129(1):18-36, 2004.
-
G. P. Chistyakov and F. Götze.
Limit distributions of Studentized means.
Ann. Probab., 32(1A):28-77, 2004.
-
Evarist Giné and Friedrich Götze.
On standard normal convergence of the multivariate Student
t-statistic for symmetric random vectors.
Electron. Comm. Probab., 9:162-171 (electronic), 2004.
-
Friedrich Götze.
Lattice point problems and values of quadratic forms.
Invent. Math., 157(1):195-226, 2004.
-
F. Götze and A. Tikhomirov.
Limit theorems for spectra of positive random matrices under
dependence.
Zap. Nauchn. Sem. S.-Peterburg. Otdel. Mat. Inst. Steklov.
(POMI), 311(Veroyatn. i Stat. 7):92-123, 299, 2004.
-
Friedrich Götze and Alexander Tikhomirov.
Rate of convergence in probability to the Marchenko-Pastur law.
Bernoulli, 10(3):503-548, 2004.
-
F. Götze and A. Yu. Zaitsev.
Approximation of convolutions by accompanying laws without centering.
Zap. Nauchn. Sem. S.-Peterburg. Otdel. Mat. Inst. Steklov.
(POMI), 320(Veroyatn. i Stat. 8):44-53, 226, 2004.
-
S. G. Bobkov and F. Götze.
On the central limit theorem along subsequences of noncorrelated
observations.
Teor. Veroyatnost. i Primenen., 48(4):745-765, 2003.
-
G. P. Chistyakov and F. Götze.
On bounds for moderate deviations for Student's statistic.
Teor. Veroyatnost. i Primenen., 48(3):609-615, 2003.
-
F. Götze and M. Gordin.
Limiting distributions of theta series on Siegel half-spaces.
Algebra i Analiz, 15(1):118-147, 2003.
-
F. Götze and A. Tikhomirov.
Rate of convergence to the semi-circular law.
Probab. Theory Related Fields, 127(2):228-276, 2003.
-
M. Bloznelis and F. Götze.
An Edgeworth expansion for symmetric finite population statistics.
Ann. Probab., 30(3):1238-1265, 2002.
-
G. P. Chistyakov and F. Götze.
Moderate deviations for Student's statistic.
Teor. Veroyatnost. i Primenen., 47(3):518-532, 2002.
-
F. Götze, Yu. V. Prokhorov, and V. V. Ulyanov.
The mean-value theorem of I. M. Vinogradov for random
variables.
In IV International Conference ``Modern Problems of Number
Theory and its Applications'': Current Problems, Part I (Russian) (Tula,
2001), pages 39-53. Mosk. Gos. Univ. im. Lomonosova, Mekh.-Mat. Fak.,
Moscow, 2002.
-
F. Götze and A. N. Tikhomirov.
Rate of convergence to the semi-circular law for the Gaussian
unitary ensemble. Theory Probab. Appl. 47, no. 2, 323-330, 2003.
-
F. Götze and A. Tikhomirov.
Asymptotic distribution of quadratic forms and applications.
J. Theoret. Probab., 15(2):423-475, 2002.
-
M. Bloznelis and F. Götze.
Orthogonal decomposition of finite population statistics and its
applications to distributional asymptotics.
Ann. Statist., 29(3):899-917, 2001.
-
Sergey G. Bobkov, Friedrich Götze, and Christian Houdré.
On Gaussian and Bernoulli covariance representations.
Bernoulli, 7(3):439-451, 2001.
-
Friedrich Götze and Alfredas Rackauskas.
Adaptive choice of bootstrap sample sizes.
In State of the art in probability and statistics (Leiden,
1999), volume 36 of IMS Lecture Notes Monogr. Ser., pages 286-309.
Inst. Math. Statist., Beachwood, OH, 2001.
-
F. Götze and A. Yu. Zaitsev.
Multidimensional Hungarian construction for vectors with almost
Gaussian smooth distributions.
In Asymptotic methods in probability and statistics with
applications (St. Petersburg, 1998), Stat. Ind. Technol., pages 101-132.
Birkhäuser Boston, Boston, MA, 2001.
-
Mindaugas Bloznelis and Friedrich Götze.
An Edgeworth expansion for finite-population U-statistics.
Bernoulli, 6(4):729-760, 2000.
-
Friedrich Götze and Andrei Yu. Zaitsev.
A multiplicative inequality for concentration functions of n-fold
convolutions.
In High dimensional probability, II (Seattle, WA, 1999),
volume 47 of Progr. Probab., pages 39-47. Birkhäuser Boston, Boston,
MA, 2000.
-
V. Bentkus and F. Götze.
Lattice point problems and distribution of values of quadratic forms.
Ann. of Math. (2), 150(3):977-1027, 1999.
-
V. Bentkus and F. Götze.
Optimal bounds in non-Gaussian limit theorems for U-statistics.
Ann. Probab., 27(1):454-521, 1999.
-
M. Bloznelis and F. Götze.
One-term Edgeworth expansion for finite population U-statistics
of degree two.
Acta Appl. Math., 58(1-3):75-90, 1999.
Limit theorems of probability theory (Vilnius, 1999).
-
S. G. Bobkov and F. Götze.
Exponential integrability and transportation cost related to
logarithmic Sobolev inequalities.
J. Funct. Anal., 163(1):1-28, 1999.
-
S. G. Bobkov and F. Götze.
Discrete isoperimetric and Poincaré-type inequalities.
Probab. Theory Related Fields, 114(2):245-277, 1999.
-
Friedrich Götze and Hartmut Milbrodt.
The work of Johann Pfanzagl.
Math. Methods Statist., 8(2):121-141, 1999.
Johann Pfanzagl-on the occasion of his 70th birthday.
-
F. Götze, V. Paulauskas, and Yu. V. Prokhorov, editors.
Limit theorems of probability theory.
Springer, Dordrecht, 1999.
Papers from the International Conference held in honour of Vytautas
Statulevicius on his 70th birthday in Vilnius, August 1999, Acta Appl.
Math. 58 (1999), no. 1-3.
-
F. Götze, V. Paulauskas, and Yu. V. Prokhorov.
Preface [on the 70th birthday of Vytautas Statulevicius].
Acta Appl. Math., 58(1-3):1-3, 1999.
Limit theorems of probability theory (Vilnius, 1999).
-
F. Götze and A. N. Tikhomirov.
Asymptotic distribution of quadratic forms.
Ann. Probab., 27(2):1072-1098, 1999.
-
F. Götze and B. A. Zalesky.
Restoration of binary images for Bernoullian noise models.
Math. Methods Statist., 8(3):299-319, 1999.
-
F. Götze.
Errata: ``Lattice point problems and the central limit theorem in
Euclidean spaces''.
In Proceedings of the International Congress of Mathematicians,
Vol. I (Berlin, 1998), number Extra Vol. I, page 648 (electronic), 1998.
-
F. Götze.
Lattice point problems and the central limit theorem in Euclidean
spaces.
In Proceedings of the International Congress of Mathematicians,
Vol. III (Berlin, 1998), number Extra Vol. III, pages 245-255 (electronic),
1998.
-
F. Götze and A. Yu. Zaitsev.
Estimates for the rapid decay of concentration functions of
n-fold convolutions.
J. Theoret. Probab., 11(3):715-731, 1998.
-
V. Bentkus, M. Bloznelis, and F. Götze.
A Berry-Esséen bound for M-estimators.
Scand. J. Statist., 24(4):485-502, 1997.
-
V. Bentkus and F. Götze.
On the lattice point problem for ellipsoids.
Acta Arith., 80(2):101-125, 1997.
-
V. Bentkus and F. Götze.
Uniform rates of convergence in the CLT for quadratic forms in
multidimensional spaces.
Probab. Theory Related Fields, 109(3):367-416, 1997.
-
V. Bentkus, F. Götze, and A. Tikhomirov.
Berry-Esseen bounds for statistics of weakly dependent samples.
Bernoulli, 3(3):329-349, 1997.
-
V. Bentkus, F. Götze, and A. Yu. Zaitsev.
Approximation of quadratic forms of independent random vectors by
accompanying laws.
Teor. Veroyatnost. i Primenen., 42(2):308-335, 1997.
-
V. Bentkus, F. Götze, and W. R. van Zwet.
An Edgeworth expansion for symmetric statistics.
Ann. Statist., 25(2):851-896, 1997.
-
P. J. Bickel, F. Götze, and W. R. van Zwet.
Resampling fewer than n observations: gains, losses, and remedies
for losses.
Statist. Sinica, 7(1):1-31, 1997.
Empirical Bayes, sequential analysis and related topics in statistics
and probability (New Brunswick, NJ, 1995).
-
S. G. Bobkov and F. Götze.
On moments of polynomials.
Teor. Veroyatnost. i Primenen., 42(3):638-640, 1997.
-
Evarist Giné, Friedrich Götze, and David M. Mason.
When is the Student t-statistic asymptotically standard normal?
Ann. Probab., 25(3):1514-1531, 1997.
-
F. Götze, Yu. V. Prokhorov, and V. V. Ulyanov.
On the smooth behavior of probability distributions under polynomial
mappings.
Teor. Veroyatnost. i Primenen., 42(1):51-62, 1997.
-
V. Bentkus, M. Bloznelis, and F. Götze.
A Berry-Esséen bound for Student's statistic in the
non-i.i.d. case.
J. Theoret. Probab., 9(3):765-796, 1996.
-
V. Bentkus and F. Götze.
The Berry-Esseen bound for Student's statistic.
Ann. Probab., 24(1):491-503, 1996.
-
V. Bentkus and F. Götze.
Optimal rates of convergence in the CLT for quadratic forms.
Ann. Probab., 24(1):466-490, 1996.
-
V. Bentkus, F. Götze, and V. Paulauskas. Bounds for the accuracy of Poissonian approximations of stable laws. Stochastic Process. Appl., 65(1):55-68, 1996.
- R. N. Bhattacharya and F. Götze. Corrections to: ``Time-scales for Gaussian approximation and its breakdown under a hierarchy of periodic spatial heterogeneities''. Bernoulli, 2(1):107-108, 1996.
- F. Götze and H. R. Künsch. Second-order correctness of the blockwise bootstrap for stationary observations. Ann. Statist., 24(5):1914-1933, 1996.
- F. Götze, Yu. V. Prohorov, and V. V. Ulyanov. A stochastic analogue of the Vinogradov mean value theorem. In Probability theory and mathematical statistics (Tokyo, 1995), pages 62-82. World Sci. Publ., River Edge, NJ, 1996.
- F. Götze, Yu. V. Prokhorov, and V. V. Ulyanov. Estimates for the characteristic functions of polynomials of asymptotically normal random variables. Uspekhi Mat. Nauk, 51(2(308)):3-26, 1996.
- V. Bentkus and F. Götze. On minimal moment assumptions in Berry-Esséen theorems for U-statistics. Teor. Veroyatnost. i Primenen., 40(3):596-614, 1995.
- V. Bentkus and F. Götze. On the number of lattice points in a large ellipsoid. Dokl. Akad. Nauk, 343(4):439-440, 1995.
- Rabi N. Bhattacharya and Friedrich Götze. Time-scales for Gaussian approximation and its breakdown under a hierarchy of periodic spatial heterogeneities. Bernoulli, 1(1-2):81-123, 1995.
- F. Götze, L. Heinrich, and C. Hipp. m-dependent random fields with analytic cumulant generating function. Scand. J. Statist., 22(2):183-195, 1995.
- F. Götze and R. Zitikis. Edgeworth expansions and bootstrap for degenerate von Mises statistics. Probab. Math. Statist., 15:327-351, 1995. Dedicated to the memory of Jerzy Neyman.
- Vidmantas Bentkus, Friedrich Götze, and Ricardas Zitikis. Lower estimates of the convergence rate for U-statistics. Ann. Probab., 22(4):1707-1714, 1994.
- F. Götze and C. Hipp. Asymptotic distribution of statistics in time series. Ann. Statist., 22(4):2062-2088, 1994.
- Vidmantas Bentkus and Friedrich Götze. On smoothness conditions and convergence rates in the CLT in Banach spaces. Probab. Theory Related Fields, 96(2):137-151, 1993.
- Vidmantas Bentkus, Friedrich Götze, and Ricardas Zitikis. Asymptotic expansions in the integral and local limit theorems in Banach spaces with applications to ω-statistics. J. Theoret. Probab., 6(4):727-780, 1993.
- Erwin Bolthausen and Friedrich Götze. The rate of convergence for multivariate sampling statistics. Ann. Statist., 21(4):1692-1710, 1993.
- F. Götze. Asymptotic approximations and the bootstrap. IMS Bulletin, 56th AMS-Meeting, 1993.
- V. Bentkus, F. Götze, V. Paulauskas, and A. Rachkauskas. The accuracy of Gaussian approximation in Banach spaces. In Probability theory, 6 (Russian), Itogi Nauki i Tekhniki, pages 39-139. Akad. Nauk SSSR Vsesoyuz. Inst. Nauchn. i Tekhn. Inform., Moscow, 1991.
- F. Götze. On the rate of convergence in the multivariate CLT. Ann. Probab., 19(2):724-739, 1991.
- F. Götze and C. Hipp. Local limit theorems for sums of finite range potentials of a Gibbsian random field. Ann. Probab., 18(2):810-828, 1990.
- F. Götze. Edgeworth expansions in functional limit theorems. Ann. Probab., 17(4):1602-1634, 1989.
- F. Götze and C. Hipp. Asymptotic expansions for potential functions of i.i.d. random fields. Probab. Theory Related Fields, 82(3):349-370, 1989.
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