autocovariance

In statistics, given a time series or continuous signal X_t, the autocovariance is simply the covariance of the signal against a time-shifted version of itself. If the series has a constant mean, EX_t = μ, then the autcovariance is given by

\, \gamma(i,j) = E - \mu)(X_j - \mu) .\,

Where E is the expectation operator. If X_t is second-order stationary then the following definition becomes the more familiar:

\, \gamma(k) = E - \mu)(X_{i+k} - \mu) .\,

The k is the amount the signal has been shifted and is usually referred to as the lag. When normalised by dividing by the variance σ² then the autocovariance becomes the autocorrelation R(k). That is

R(k) = \frac{\gamma(k)}{\sigma^2}.\,

Note, however, that some disciplines use the terms autocovariance and autocorrelation interchangably. The autocovariance can be thought of as a measure of how similar a signal is to a time-shifted version of itself with an autocovariance of σ² indicating perfect correlation at that lag. The normalisation with the variance will put this into the range −1, 1.

References

P. G. Hoel (1984): Mathematical Statistics, New York, Wiley

<< Previous

Word Browser

Next >>

examilia
illinois state route 6
ectomorphed works
rhodonite
real (album)
software patents under trips agreement
neochori (zacharo), greece
first confederate congress
salt lake city school district
personal software process
watanabe

dunbar (catch 22)
united states navy working capital fund
clicked singles best 13
kybo
phenacite
n379p
european committee of domestic equipment manufacturers
jo siffert
star trek further reading
synanon
blueillusion os

second confederate congress
daring class destroyer
bill phipps
crowninshield family
star tower
new millennium program
orava river
united indoor football
orava (castle)
alberta senate nominee election, 2004
orava (reservoir)

power window
sissiboo river
zensunni
orava (village)
black rock mountain state park
natrolite
orava (county)
list of medal of honor recipients
galaxy trek
lkab
scolecite