periodic: Calculate Reproducing Kernels for Periodic Polynomial Splines...

In catherinewang1/assist: A Suite of R Functions Implementing Spline Smoothing Techniques

Description

Return a matrix evaluating reproducing kernels for periodic polynomial splines at observed points.

Usage

periodic(s, t=s, order=2)

Arguments

s	a numeric vector.
t	an optional vector. Default is the same as s.
order	an optional integer sepcifying the order of the polynomial spline. Default is 2 for the periodic cubic spline.

Details

The general formula of the reproducing kernel is sum of an infinite series, which is approximated by taking the first 50 terms. For the case of order=2, the close form is available and used.

Value

a matrix with the numbers of row and column equal to the lengths of s and t respectively. The [i, j] element is the reproducing kernel evaluated at (s[i], t[j]).

References

Wahba, G. (1990). Spline Models for Observational Data. SIAM, Vol. 59.

Gu, C. (2001). Smoothing Spline ANOVA Modes. Chapman and Hall.

See Also

cubic, lspline

Examples

## Not run: 
x<- seq(0, 1, len=100)
periodic(x, order=3)

## End(Not run)

catherinewang1/assist documentation built on June 16, 2019, 1:36 p.m.