I would like to calculate a density function of a distribution whose characteristics function is known. As a simple example take the normal distribution.

norm.char<-function(t,mu,sigma) exp((0+1i)*t*mu-0.5*sigma^2*t^2)

and then I would like to use R's fft function. but I don't get the multiplicative constants right and I have to reorder the result (take the 2nd half and then the first half of the values). I tried something like

 xmax = 5
 xmin = -5
 deltat = 2*pi/(xmax-xmin)
 deltax = (xmax-xmin)/(N-1)
 x = xmin + deltax*seq(0,N-1)
 t = deltat*seq(0,N-1)
 density = Re(fft(norm.char(t*2*pi,mu,sigma)))
 density = c(density[(N/2+1):N],density[1:(N/2)])

But this is still not correct. Does anybody know a good reference on the fft in R in the context of density calculations? Obviously the problem is the mixture of the continuous FFT and the discrete one. Can anybody recommend a procedure? Thanks

  • 1
    The density function help pages says it uses FFT. Why not review the code?
    – IRTFM
    Commented Apr 5, 2012 at 14:18
  • What exactly is not correct? And if your real question is simply "what constants are applied during a discrete Fourier transform?" then check the help page for fft which I believe gives the equations. Commented Apr 5, 2012 at 19:48

1 Answer 1


It is just cumbersome: take a pen and paper, write the integral you want to compute (the Fourier transform of the characteristic function), discretize it, and rewrite the terms so that they look like a discrete Fourier transform (the FFT assumes that the interval starts at zero).

Note that fft is an unnormalized transform: there is no 1/N factor.

characteristic_function_to_density <- function(
  phi, # characteristic function; should be vectorized
  n,   # Number of points, ideally a power of 2
  a, b # Evaluate the density on [a,b[
) {
  i <- 0:(n-1)            # Indices
  dx <- (b-a)/n           # Step size, for the density
  x <- a + i * dx         # Grid, for the density
  dt <- 2*pi / ( n * dx ) # Step size, frequency space
  c <- -n/2 * dt          # Evaluate the characteristic function on [c,d]
  d <-  n/2 * dt          # (center the interval on zero)
  t <- c + i * dt         # Grid, frequency space
  phi_t <- phi(t)
  X <- exp( -(0+1i) * i * dt * a ) * phi_t
  Y <- fft(X)
  density <- dt / (2*pi) * exp( - (0+1i) * c * x ) * Y
    i = i,
    t = t,
    characteristic_function = phi_t,
    x = x,
    density = Re(density)

d <- characteristic_function_to_density(
    exp( (0+1i)*t*mu - sigma^2/2*t^2 ),
  -3, 3
plot(d$x, d$density, las=1)
curve(dnorm(x,1,.5), add=TRUE)

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