An Adaptive Orthogonal-Series Estimator for Probability Density Functions.
Abstract
Given a sample set X1,...,XN of independent identically distributed real-valued random variables, each with the unknown probability density function f(.), the problem considered is to estimate f from the sample set. The function f is assumed to be in L2(a,b); f is not assumed to be in any parametric family. This paper constructs an adaptive two-pass solution to the problem: in a pre-processing step (the first pass), a preliminary rough estimate of f is obtained by means of a standard orthogonal-series estimator. In the second pass, the preliminary estimate is used to transform the orthogonal series. The new, transformed orthogonal series is then used to obtain the final estimate. The paper establishes consistency of the estimator and derives asymptotic (large sample set) estimates of the bias and variance. It is shown that the adaptive estimator offers reduced bias (better resolution) in comparison to the conventional orthogonal series estimator. Computer simulations are presented which demonstrate the small sample set behavior. A case study of a bimodal density confirms the theoretical conclusions. (Author)
Document Details
- Document Type
- Technical Report
- Publication Date
- Feb 01, 1978
- Accession Number
- ADA056065
Entities
People
- G. Leigh Anderson
- Rui J. P. De Figueiredo
Organizations
- Rice University