Estimations of the nonnormalized spectral density of a stationary time series based on specified periodogram weights given the periodogram.

Routine SWEP estimates the nonnormalized spectral density function of a stationary time series using a fixed sequence of weights given the modified periodogram of the appropriately centered and padded data

The routine PFFT may be used to obtain the modified periodogram

over the discrete set of nonnegative frequencies

(Here, ⌊a⌋ means the greatest integer less than or equal to a.) The symmetry of the periodogram is used to recover the ordinates at negative frequencies.

Consider the sequence of m = NWT weights {wj} for j = ‑⌊m/2⌋, …, (m ‑⌊m/2⌋ ‑1) where Σjwj = 1. These weights are fixed in the sense that they do not depend on the frequency ω at which to estimate the nonnormalized spectral density hX(ω). The estimate of the nonnormalized spectral density is computed according to

where

and k(ω) is the integer such that ωk,0 is closest to ω. The weights specified by argument WT may be relative since they are normalized to sum to one in the actual computation of

Usually, m is odd with the weights symmetric about the middle weight w0. If m is even, the weight to the right of the middle is considered w0. Note that periodogram ordinate

is replaced by

and the sum reflects at each end.

The nonnormalized spectral density estimate is computed over the set of frequencies

where nƒ = NF. These frequencies are in the scale of radians per unit time. The time sampling interval Δt is assumed to be equal to one.

Approximate confidence intervals for h(ω) can be computed using formulas given in the introduction.

Consider the Wölfer Sunspot Data (Anderson 1971, page 660) consisting of the number of sunspots observed each year from 1749 through 1924. The data set for this example consists of the number of sunspots observed from 1770 through 1869. Application of routine SWEP to these data produces the following results: