Nothing
# private method
# Runge-Kutta method for solving differential equations. It is used to generate
# both Lorenz and Rossler systems.
rungeKutta = function(func, initial.condition, time, params) {
n.samples = length(time)
h = time[[2]] - time[[1]]
y = matrix(ncol = length(initial.condition), nrow = n.samples)
y[1,] = initial.condition
for (i in 2:n.samples) {
k1 = h * func(y[i - 1, ], time[[i - 1]], params)
k2 = h * func(y[i - 1, ] + k1 / 2 , time[[i - 1]] + h / 2, params)
k3 = h * func(y[i - 1, ] + k2 / 2 , time[[i - 1]] + h / 2, params)
k4 = h * func(y[i - 1, ] + k3 , time[[i - 1]] + h, params)
y[i, ] = y[i - 1, ] + (k1 + 2 * k2 + 2 * k3 + k4) / 6
}
y
}
# private method
# Trapezoidal rule for numerical integration
trapezoidalRule = function(x, integrand ){
index = 2:length(x)
(
as.double((x[index] - x[index - 1]) %*%
(integrand[index] + integrand[index - 1])) / 2
)
}
# private method implementing (y(x + h) - y(x - h))/2h
differentiate = function(h, y) {
len = length(y)
if (len >= 3) {
derivative = (y[3:len] - y[1:(len - 2)]) / (2 * h)
} else{
# if not possible... use (y(x+h)-y(x))/h
derivative = diff(y) / (h)
}
derivative
}
differentiateAxis = function(x) {
len = length(x)
if (len >= 3) {
# We have used the (y(x + h) - y(x - h)) / 2h rule
# Eliminate first and last
axis = x[-c(1, len)]
} else {
# We have used the (y(x + h) - y(x)) / h rule
# Eliminate last
axis = x[-c(len)]
}
axis
}
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