Add to ORKGEdgeworth expansion provides higher-order corrections to the normal approximation for a probability distribution. The classical proof of Edgeworth expansion is via characteristic functions. As a powerful method for distributional approximations, Stein's method has also been used to prove Edgeworth expansion results. However, these results assume that either the test function is smooth (which excludes indicator functions of the half line) or that the random variables are continuous (which excludes random variables having only a continuous component). Thus, how to recover the classical Edgeworth expansion result using Stein's method has remained an open problem. In this paper, we develop Stein's method for two-term Edgeworth expansions in a g...
Since the 1930s, empirical Edgeworth expansions have been employed to develop techniques for approxi...
peer reviewedWe develop techniques for determining the exact asymptotic speed of convergence in the ...
This paper derives transformations for multivariate statistics that eliminate asymptotic skewness, e...
We establish higher-order nonasymptotic expansions for a difference between probability distribution...
Motivated from option and derivative pricing, this note develops Edgeworth expansions both in the Ko...
International audienceThis paper is a sequel of \cite{CD:2012}. We show how to establish a functiona...
We introduce a version of Stein's method of comparison of operators specifically tailored to the pro...
We obtain non-uniform Berry-Esseen type estimates and Edgeworth expansions for several classes of we...
AbstractThe validity of formal Edgeworth expansions for statistics which are functions of sample ave...
Classical Edgeworth expansions provide asymptotic correction terms to the Central Limit Theorem (CLT...
Texte intégral sur le site: https://papers.ssrn.comIn this paper, we derive a valid Edgeworth expans...
Results given by Barton & Dennis (1952) on regions of positive and unimodal series expansion of ...
International audienceThis paper is a sequel of \cite{CD:2012}. We show how to establish a functiona...
AbstractAsymptotic expansions for the standardized as well as the studentized least squares estimate...
Let {Yn}n≥ 1 be a sequence of i.i.d. m-dimensional random vectors, and let f1,....., fk be rea...
Since the 1930s, empirical Edgeworth expansions have been employed to develop techniques for approxi...
peer reviewedWe develop techniques for determining the exact asymptotic speed of convergence in the ...
This paper derives transformations for multivariate statistics that eliminate asymptotic skewness, e...
We establish higher-order nonasymptotic expansions for a difference between probability distribution...
Motivated from option and derivative pricing, this note develops Edgeworth expansions both in the Ko...
International audienceThis paper is a sequel of \cite{CD:2012}. We show how to establish a functiona...
We introduce a version of Stein's method of comparison of operators specifically tailored to the pro...
We obtain non-uniform Berry-Esseen type estimates and Edgeworth expansions for several classes of we...
AbstractThe validity of formal Edgeworth expansions for statistics which are functions of sample ave...
Classical Edgeworth expansions provide asymptotic correction terms to the Central Limit Theorem (CLT...
Texte intégral sur le site: https://papers.ssrn.comIn this paper, we derive a valid Edgeworth expans...
Results given by Barton & Dennis (1952) on regions of positive and unimodal series expansion of ...
International audienceThis paper is a sequel of \cite{CD:2012}. We show how to establish a functiona...
AbstractAsymptotic expansions for the standardized as well as the studentized least squares estimate...
Let {Yn}n≥ 1 be a sequence of i.i.d. m-dimensional random vectors, and let f1,....., fk be rea...
Since the 1930s, empirical Edgeworth expansions have been employed to develop techniques for approxi...
peer reviewedWe develop techniques for determining the exact asymptotic speed of convergence in the ...
This paper derives transformations for multivariate statistics that eliminate asymptotic skewness, e...