ТОП просматриваемых книг сайта:
Introduction to Linear Regression Analysis. Douglas C. Montgomery
Читать онлайн.Название Introduction to Linear Regression Analysis
Год выпуска 0
isbn 9781119578758
Автор произведения Douglas C. Montgomery
Жанр Математика
Издательство John Wiley & Sons Limited
Figure 2.14 Scatter diagram of shelf-stocking data.
Figure 2.15 The confidence and prediction bands for the shelf-stocing data.
Figure 2.15 also shows the 95% confidence interval or E(y|x0) computed from Eq. (2.54) and the 95% prediction interval on a single future observation y0 at x = x0 computed from Eq. (2.55). Notice that the length of the confidence interval at x0 = 0 is zero.
SAS handles the no-intercept case. For this situation, the model statement follows:
model time = cases/noint
2.12 ESTIMATION BY MAXIMUM LIKELIHOOD
The method of least squares can be used to estimate the parameters in a linear regression model regardless of the form of the distribution of the errors ε. Least squares produces best linear unbiased estimators of β0 and β1. Other statistical procedures, such as hypothesis testing and CI construction, assume that the errors are normally distributed. If the form of the distribution of the errors is known, an alternative method of parameter estimation, the method of maximum likelihood, can be used.
Consider the data (yi, xi), i = 1, 2, …, n. If we assume that the errors in the regression model are NID(0, σ2), then the observations yi in this sample are normally and independently distributed random variables with mean β0 + β1xi and variance σ2. The likelihood function is found from the joint distribution of the observations. If we consider this joint distribution with the observations given and the parameters β0, β1, and σ2 unknown constants, we have the likelihood function. For the simple linear regression model with normal errors, the likelihood function is
(2.56)
The maximum-likelihood estimators are the parameter values, say
(2.57)
and the maximum-likelihood estimators
(2.58b)
and
(2.58c)
The solution to Eq. (2.58) gives the maximum-likelihood estimators:
(2.59a)
(2.59b)
(2.59c)
Notice that the maximum-likelihood estimators of the intercept and slope,
In general, maximum-likelihood estimators have better statistical properties than least-squares estimators. The maximum-likelihood estimators are unbiased (including