 Aims
The objective is to present the basic resampling methods (bootstrap, jacknife,...) useful for doing inference in statistical models. These methods provide approximations of the sampling distribution of the quantities of interest (estimator, pivotal quantities, test statistics,...). In many situations, the quality of the approximation is better than the usual asymptotic ones based on central-limit arguments. In others situation (more complex
problems), there are no real alternatives than the bootstrap to obtain these approximations. Using these approaches (which are computer intensive), we are often able to provide confidence intervals, critical values, p-values in testing problems, etc. The statistical properties of the bootstrap are investigated and applied in many fields of statistics and/or econometrics.
Main themes
- Basic ideas of the bootstrap
- Monte-Carlo methods
- Bias of an estimator
- Confidence intervals
- Theoretical properties of the bootstrap
- Hypothesis testing
- Bootstrap in regression models
- Iterated bootstrap
- The Jacknife
- The smmothed bootstrap
- Bootstrap in time series
Content and teaching methods
- Basic ideas of the bootstrap
- Monte-Carlo methods
- Bias of an estimator
- Confidence intervals
- Theoretical properties of the bootstrap
- Hypothesis testing
- Bootstrap in regression models
- Iterated bootstrap
- The Jacknife
- The smmothed bootstrap
- Bootstrap in time series
Other information (prerequisite, evaluation (assessment methods), course materials recommended readings, ...)
References
Efron B. and R.J. Tibshirani (1993) : An introduction to the Bootstrap, Chapman and Hall, London.Hall P. (1992) : The Bootstrap and the Edgeworth Expansion, Springer Verlag, New-York.Beran, R . and G. Ducharme (1991) : Asymptotic theory for bootstrap methods in statistics, Centre de Recherches Mathématiques, Univ. de Montréral.
For more information:
http://www.stat.ucl.ac.be/cours/stat3210/index.html
http://www.stat.ucl.ac.be/cours/stat3210/index.html
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