Correlatioii Fimctions 423 time can be absolutely integrated see Chapter 9 2.2.. This property is not giveri for auto-correlation fimctions, how~ver, it the linear average p, is non-~ero
Trang 117.4 Correlatioii Fimctions 423
time can be absolutely integrated (see Chapter 9 2.2) t h i s is suficieiit condition for the c3xistcnce of the cleterministic functions This property is not giveri for auto-correlation fimctions, how~ver, it the linear average p, is non-~ero
In order to o'vercorrie I b e difficulty statcd a l m ~ e , the linear average can be rernovt-itl horn thc outsct and instead of the signal .c(t>, the zero mean srgrd
( r ( f ) - ~ 1 % ) can be cousidereti Its aiito correlation function is called t l i ~ auto-
covurmrm functzon of r ( l ) and is drnoktl by V J , ~ ( r):
ui/?,(T) = E{(z(t) - PTl(.V(l - z) - p 5 ) ) (17.38) IJsing the calculation rules from Section 17.2.3 WP obtain
just as in (17 8) The properties of the airto-rovariance function col-iespor~d to
those of the auto-wrrelation function for z e ~ o mean signals
17.4.1.3 Cross-Correlation Function
The ailto-correlation funrtion is given by tlie expected value of two sigrral va1ue.i that arc take11 from 07ic Iandorri proccss at LIYO tliffercnt times This idea can lie extcndcd to signal value:, from different rsncloni pr
expecled vitluc is called tlie crosr;-correluhon finct/on cnt i t s propertics correctly we have to extencl the earlicr defintions of se.cmd-
statiomry and ergodic rnndoni processes t o ded with two random pzoccsses A
sccond-oidergoznt exper Led valur~ is the expectd valiir of a function j ( ~ ( i ' ~ ) , CL)) formed with sigiials from two diffeient raztdoiii proce
(17.44)
For the cross-correlation function y, , / ( t l , t z ) it holds in general !.hat (comparc
i p l y G i l l z ! =- hi { d t l ) ' "!"U (1 7.45) The rf(i~s-e0rr~7131ioii ftinction i.i denoted like the auto-correlation limrtion but the second random process i s irrdimtcd by another letter in t h e indcx
(17.10)):
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