COVARIANCE MATRIX ESTIMATION IN LINEAR MODELS,

Abstract

In regression analysis with heteroscedastic and/or correlated errors, the usual assumption is that the covariance matrix of the errors is completely specified, except perhaps for a scalar multiplier. This condition is relaxed in this paper by assuming only that the covariance matrix has a certain pattern; for example, that the covariance matrix is diagonal or partitionable into a diagonal matrix of sub-matrices. The method used for estimating the covariance matrix is the standard procedure of equating certain quadratic forms of the observations (in this case, squares and products of residuals from regression) to their expectations, and solving for the unknown variances and covariances. A numerical example illustrates the method. (Author)

Document Details

Document Type
Technical Report
Publication Date
Nov 01, 1967
Accession Number
AD0697078

Entities

People

  • Victor Chew

Tags

DTIC Thesaurus Topics

  • Computing-Related Activities
  • Cooperation
  • Covariance
  • Data Science
  • Information Science
  • Interdisciplinary Science
  • Mathematical Analysis
  • Mathematics
  • Observation
  • Regression Analysis
  • Residuals
  • Standards
  • Statistical Analysis
  • Statistics

Fields of Study

  • Mathematics

Readers

  • Linear Algebra
  • Statistical inference.