Tests for Error Correlation in the Functional Linear Model

Article

Gabrys, Robertas; Horvath, Lajos; Kokoszka, Piotr

Utah System of Higher Education; Utah State University; Utah System of Higher Education; University of Utah

JOURNAL OF THE AMERICAN STATISTICAL ASSOCIATION

0162-1459

10.1198/jasa.2010.tm09794

2010

1113-1125

The paper proposes two inferential tests for error correlation in the functional linear model, which complement the available graphical goodness-of-fit checks. To construct them, finite dimensional residuals are computed in two different ways, and then their autocorrelations are suitably defined. From these autocorrelation matrices, two quadratic forms are constructed whose limiting distribution are chi-squared with known numbers of degrees of freedom (different for the two forms). The asymptotic approximations are suitable for moderate sample sizes. The test statistics can be relatively easily computed using the R package f.da, or similar MATLAB software. Application of the tests is illustrated on magnetometer and financial data. The asymptotic theory emphasizes the differences between the standard vector linear regression and the functional linear regression. To understand the behavior of the residuals obtained from the functional linear model, the interplay of three types of approximation errors must be considered, whose sources are: projection on a finite dimensional subspace, estimation of the optimal subspace, and estimation of the regression kernel.