Welcome to our site! EDAboard.com is an international Electronics Discussion Forum focused on EDA software, circuits, schematics, books, theory, papers, asic, pld, 8051, DSP, Network, RF, Analog Design, PCB, Service Manuals... and a whole lot more! To participate you need to register. Registration is free. Click here to register now.
firstly i must say i dont know extremely well OFDM but i can say something that can be useful for you
if notation Y=XH+W ;
LS estimation makes X^-1 Y = H + X^-1 W so if channel has no noise we get H perfectly but this is imposibble in real life so we want to reduce effect of noise.. if W was square matrice we dont need hermitian but NOT!!
(for this notation) W also is not square matrice always so its inverse does not exist so to minimize W hermitian is used.
A complex number can be viewed as a 2-dimensional quantity (with real on the x-axis and imaginary on the y-axis). If we were to consider a magnitude for this 2D quantity (i.e. distance from the origin), it would be the square root of the sum of the squares of the x and y components. In other words, the square root of the sum of the real and imaginary parts... or the square root of the complex number multiplied by its conjugate.
With your matrix equation, you are already working in N dimensions (for Nx1 columns). To be clear, these are complex dimensions. You could reformulate your problem in 2N real dimensions and re-write all your proofs in 2N real dimensions. If you were to do so, you would find that (the real-space equivalents of) these conjugates were required.
Numbers are a human invention designed to help us solve problems. Complex numbers are a human invention designed to help us solve problems. You could solve all the problems of signal processing using real numbers, it just so happens that complex numbers sometimes simplify matters significantly.
For me personally, I think the same about vector and matrix notation: we could represent everything as scalars if we wanted, it would just be a pain in the... neck.
This site uses cookies to help personalise content, tailor your experience and to keep you logged in if you register.
By continuing to use this site, you are consenting to our use of cookies.