odesolv {fda}R Documentation

Numerical Solution mth Order Differential Equation System

Description

The system of differential equations is linear, with possibly time-varying coefficient functions. The numerical solution is computed with the Runge-Kutta method.

Usage

odesolv(bwtlist, ystart=diag(rep(1,norder)),
        h0=width/100, hmin=width*1e-10, hmax=width*0.5,
        EPS=1e-4, MAXSTP=1000)

Arguments

bwtlist a list whose members are functional parameter objects defining the weight functions for the linear differential equation.
ystart a vector of initial values for the equations. These are the values at time 0 of the solution and its first m - 1 derivatives.
h0 a positive initial step size.
hmin the minimum allowable step size.
hmax the maximum allowable step size.
EPS a convergence criterion.
MAXSTP the maximum number of steps allowed.

Details

This function is required to compute a set of solutions of an estimated linear differential equation in order compute a fit to the data that solves the equation. Such a fit will be a linear combinations of m independent solutions.

Value

a named list of length 2 containing

tp a vector of time values at which the system is evaluated
yp a matrix of variable values corresponding to tp.

See Also

pda.fd,

Examples

#See the analyses of the lip data.

[Package fda version 2.1.1 Index]