Random modulation explained

In the theories of modulation and of stochastic processes, random modulation is the creation of a new signal from two other signals by the process of quadrature amplitude modulation. In particular, the two signals are considered as being random processes. For applications, the two original signals need have a limited frequency range, and these are used to modulate a third sinusoidal carrier signal whose frequency is above the range of frequencies contained in the original signals.

Details

The random modulation procedure starts with two stochastic baseband signals,

x_c(t)

and

x_s(t)

, whose frequency spectrum is non-zero only for

f\in[-B/2,B/2]

. It applies quadrature modulation to combine these with a carrier frequency

f₀

(with

f₀>B/2

) to form the signal

x(t)

given by

x(t)=x_c(t)\cos(2\pif₀t)-x_s(t)\sin(2\pif₀t)=\Re\left\{

	j2\pif₀t
\underline{x}(t)e

\right\},

where

\underline{x}(t)

is the equivalent baseband representation of the modulated signal

x(t)

\underline{x}(t)=x_c(t)+jx_s(t).

In the following it is assumed that

x_c(t)

and

x_s(t)

are two real jointly wide sense stationary processes. It can be shown that the new signal

x(t)

is wide sense stationary if and only if

\underline{x}(t)

is circular complex, i.e. if and only if

x_c(t)

and

x_s(t)

are such that

R
	x_cx_c

(\tau)=R
	x_sx_s

(\tau) and

R
	x_cx_s

(\tau)=-R
	x_sx_c

(\tau).

Bibliography

Book: Probability, random variables and stochastic processes . Papoulis. Athanasios. Athanasios Papoulis. S. Unnikrishna. Pillai . 2002. McGraw-Hill Higher Education. 4th. Random walks and other applications. 463–473.
Book: Segnali, Processi Aleatori, Stima . Scarano. Gaetano. 2009. Centro Stampa d'Ateneo. it.
Papoulis . A. . 10.1109/TASSP.1983.1164046 . Random modulation: A review . IEEE Transactions on Acoustics, Speech, and Signal Processing . 31 . 96–105. 1983 .