Wefelmeyer, Wolfgang - Mathematisches Institut, Universität zu Köln

• W. Wefelmeyer Wintersemester 2003/04 M. Scholpen
• Root n consistent and optimal density estimators for moving average processes
• Gruppeneinteilung ,,Einfhrung in die Stochastik" Folgende Gruppen werden eingerichtet
• Prof. Dr. W. Wefelmeyer Sommersemester 2009 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2009 Dipl.-Math. Markus Schulz
• The Behavior of Estimators in Misspecified Regression Models
• March 1, 2011 8:38 Journal of Nonparametric Statistics rev18 Journal of Nonparametric Statistics
• Variance bounds for estimators in autoregressive models with constraints
• Statistics & Decisions 1, 14 (2004) c R. Oldenbourg Verlag, Munchen 2004
• Root-n consistent density estimators of convolutions in weighted L1-norms
• Pointwise convergence rates and central limit theorems for kernel density estimators in linear processes
• Estimating invariant laws of linear processes by U-statistics By Anton Schick1
• Efficient estimators for functionals of Markov chains with parametric marginals
• Autoregression, estimating functions, and optimality criteria Ursula U. Muller1
• Estimating the innovation distribution in nonlinear autoregressive models
• Prof. Dr. W. Wefelmeyer Sommersemester 2011 Dr. M. Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2011 Dr. M. Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2011 Dr. M. Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2011 Dr. M. Schulz
• Mathematisches Institut der Universitt zu Kln
• Mathematisches Institut der Universitt zu Kln
• Mathematisches Institut der Universitt zu Kln
• Einfhrung in die Stochastik Vorlesung von Wolfgang Wefelmeyer
• Prof. Dr. W. Wefelmeyer Wintersemester 2010/11 Dr. M. Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2010/11 Dr. M. Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2010/11 Dr. M. Schulz
• Vorlesung uber Statistik fur Zeitreihen Wintersemester 2006/2007
• Prof. Dr. W. Wefelmeyer Sommersemester 2010 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2010 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2010 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2010 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2009/10 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2009/10 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2009/10 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2009/10 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2009/10 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2009/10 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2009 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2008/2009 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2008/2009 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2008/2009 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2008 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2008 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2007/2008 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2007/2008 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2007/2008 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2006/2007 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer Wintersemester 2006/2007 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer Sommersemester 2006 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer Sommersemester 2006 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer WS 05/06 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer SS 2005 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer SS 2005 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer SS 2005 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer SS 2005 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer WS 2004/05 Dipl.-Math. K. Tang
• W. Wefelmeyer Sommersemester 2004 M. Scholpen
• The information in the marginal law of a Markov chain
• Prof. Dr. W. Wefelmeyer Wintersemester 2006/2007 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer Sommersemester 2008 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2011 Dr. M. Schulz
• Mathematisches Institut der Universitt zu Kln
• Prof. Dr. W. Wefelmeyer Sommersemester 2011 Dr. M. Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2010 Dipl.-Math. Markus Schulz
• Mathematisches Institut der Universitt zu Kln
• Prof. Dr. W. Wefelmeyer Sommersemester 2009 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2010/11 Dr. M. Schulz
• Prof. Dr. W. Wefelmeyer WS 05/06 Dipl.-Math. K. Tang
• Root n consistent density estimators for sums of independent random variables
• Functional convergence and optimality of plug-in estimators for stationary densities of moving average processes
• Prof. Dr. W. Wefelmeyer Wintersemester 2006/2007 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer WS 05/06 Dipl.-Math. K. Tang
• Priscilla E. Greenwood 1 Anton Schick 2
• Characterizing efficient empirical estimators for local interaction Gibbs fields
• Prof. Dr. W. Wefelmeyer SS 2005 Dipl.-Math. K. Tang
• Vorlesung uber Mathematische Statistik Sommersemester 2006
• Prof. Dr. W. Wefelmeyer WS 2004/05 Dipl.-Math. K. Tang
• Splitting Markov fields and combining empirical estimators
• Prof. Dr. W. Wefelmeyer Sommersemester 2006 Dipl.-Math. K. Tang
• Efficient estimation of invariant distributions of some semiparametric Markov chain models
• Prof. Dr. W. Wefelmeyer WS 2004/05 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer WS 05/06 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer Sommersemester 2011 Dr. M. Schulz
• Prof. Dr. W. Wefelmeyer WS 2004/05 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer Sommersemester 2010 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2008 Dipl.-Math. Markus Schulz
• Imputing responses that are not missing Ursula U. Muller
• September 2, 2005 14:16 WSPC/Trim Size: 9in x 6in for Review Volume m-bickel07 EFFICIENT ESTIMATORS FOR TIME SERIES
• Prof. Dr. W. Wefelmeyer Sommersemester 2008 Dipl.-Math. Markus Schulz
• Improved estimators for constrained Markov chain models
• Prediction in moving average processes Anton Schick and Wolfgang Wefelmeyer
• Prof. Dr. W. Wefelmeyer Wintersemester 2010/11 Dr. M. Schulz
• Zulassungen im Rahmen der Vorlesung ,,Einfhrung in die Stochastik" im WS 2010/2011
• Prof. Dr. W. Wefelmeyer SS 2005 Dipl.-Math. K. Tang
• EFFICIENT ESTIMATION IN INVERTIBLE LINEAR PROCESSES ANTON SCHICK AND WOLFGANG WEFELMEYER
• An introduction to efficient estimation for semiparametric time series
• Institute of Mathematical Statistics LECTURE NOTES --MONOGRAPH SERIES
• Prof. Dr. W. Wefelmeyer SS 2005 Dipl.-Math. K. Tang
• WEIGHTED RESIDUAL-BASED DENSITY ESTIMATORS FOR NONLINEAR AUTOREGRESSIVE MODELS
• 1Alea , () Convergence rates in weighted L1 spaces
• Prof. Dr. W. Wefelmeyer Wintersemester 2007/2008 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2006/2007 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer Wintersemester 2009/10 Dipl.-Math. Markus Schulz
• IMPROVED DENSITY ESTIMATORS FOR INVERTIBLE LINEAR PROCESSES
• W. Wefelmeyer Sommersemester 2004 M. Scholpen
• Prof. Dr. W. Wefelmeyer Wintersemester 2006/2007 Dipl.-Math. K. Tang
• MUSTERLSUNG ZU BLATT 8 Aufgabe 36
• Prof. Dr. W. Wefelmeyer Sommersemester 2010 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Sommersemester 2006 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer WS 05/06 Dipl.-Math. K. Tang
• Uniformly root-n consistent density estimators for weakly dependent invertible linear processes
• Prediction in invertible linear processes Anton Schick
• Vorlesung uber Mathematische Statistik Sommersemester 2004
• Prof. Dr. W. Wefelmeyer WS 05/06 Dipl.-Math. K. Tang
• Prof. Dr. W. Wefelmeyer Sommersemester 2008 Dipl.-Math. Markus Schulz
• Prof. Dr. W. Wefelmeyer Wintersemester 2006/2007 Dipl.-Math. K. Tang
• W. Wefelmeyer Sommersemester 2004 M. Scholpen
• Prof. Dr. W. Wefelmeyer WS 05/06 Dipl.-Math. K. Tang
• Von Mises type statistics for single site updated local interaction random fields
• Prof. Dr. W. Wefelmeyer Sommersemester 2009 Dipl.-Math. Markus Schulz
• Statistical analysis of stochastic resonance in a thresholded detector
• Convergence in weighted L1-norms of convolution estimators for the response density in nonparametric regression
• Estimating the error distribution function in semiparametric additive regression models
• Uniform convergence of convolution estimators for the response density in nonparametric regression
• Efficient estimators for alternating quasi-likelihood models Ursula U. Muller
• Non-Standard Behavior of Density Estimators for Functions of Independent Observations
• Uniform convergence of convolution estimators for the response density in nonparametric regression