D2ss: Numerical Derivatives of (x,y) Data (via Smoothing Splines)

Description

Compute the numerical first or 2nd derivatives of $f()$ given observations (x[i], y ~= f(x[i])).

D1tr is the trivial discrete first derivative using simple difference ratios, whereas D1ss and D2ss use cubic smoothing splines (see smooth.spline) to estimate first or second derivatives, respectively.

D2ss first uses smooth.spline for the first derivative $f'()$ and then applies the same to the predicted values $\hat f'(t_i)$ (where $t_i$ are the values of xout) to find $\hat f''(t_i)$.

Usage

D1tr(y, x = 1)
D1ss(x, y, xout = x, spar.offset = 0.1384, spl.spar=NULL)
D2ss(x, y, xout = x, spar.offset = 0.1384, spl.spar=NULL)

Arguments

x,y

numeric vectors of same length, supposedly from a model y ~ f(x). For D1tr(), x can have length one and then gets the meaning of $h = \Delta x$.

xout

abscissa values at which to evaluate the derivatives.

spar.offset

numeric fudge added to the smoothing parameter(s), see spl.par below. Note that the current default is there for historical reasons only, and we often would recommend to use spar.offset = 0 instead.

spl.spar

direct smoothing parameter(s) for smooth.spline. If it is NULL (as per default), the smoothing parameter used will be spar.offset + sp$spar, where sp$spar is the GCV estimated smoothing paramet

Value

D1tr() and D1ss() return a numeric vector of the length of y or xout, respectively.
D2ss() returns a list with components
xthe abscissae values (= xout) at which the derivative(s) are evaluated.
yestimated values of $f''(x_i)$.
spl.sparnumeric vector of length 2, contain the spar arguments to the two smooth.spline calls.
spar.offsetas specified on input (maybe rep()eated to length 2).

Details

It is well known that for derivative estimation, the optimal smoothing parameter is larger (more smoothing needed) than for the function itself. spar.offset is really just a fudge offset added to the smoothing parameters. Note that in R's implementation of smooth.spline, spar is really on the $\log\lambda$ scale.

Examples

Run this code

## First Derivative  --- spar.off = 0  ok "asymptotically" (?)
set.seed(330)
mult.fig(12)
for(i in 1:12) {
  x <- runif(500, 0,10); y <- sin(x) + rnorm(500)/4
  f1 <- D1ss(x=x,y=y, spar.off=0.0)
  plot(x,f1, ylim = range(c(-1,1,f1)))
  curve(cos(x), col=3, add= TRUE)}