Title :
The Gaussian Erasure Channel
Author :
Tulino, A. ; Verdu, Sergio ; Caire, G. ; Shamai, S.
Author_Institution :
Univ. di Napoli, Naples
Abstract :
This paper finds the capacity of linear time-invariant systems observed in additive Gaussian noise through a memoryless erasure channel. This problem requires obtaining the asymptotic spectral distribution of a submatrix of a nonnegative definite Toeplitz matrix obtained by retaining each column/row independently and with identical probability. We show that the optimum normalized power spectral density is the water filling solution for reduced signal-to-noise ratio, where the gap to the actual signal-to-noise ratio depends on both the erasure probability and the channel transfer function. We find asymptotic expressions for the capacity in the sporadic erasure and sporadic non-erasure regimes as well as the low and high signal-to-noise regimes.
Keywords :
AWGN channels; Gaussian channels; Toeplitz matrices; channel capacity; linear systems; probability; transfer function matrices; Gaussian erasure channel; additive Gaussian noise; asymptotic spectral distribution; channel transfer function; erasure probability; identical probability; linear time-invariant systems; memoryless erasure channel; nonnegative definite Toeplitz matrix; optimum normalized power spectral density; signal-to-noise ratio; sporadic erasure regime; sporadic nonerasure regime; submatrix; water filling solution; Additive noise; Channel capacity; Codes; Gaussian channels; Gaussian noise; Information theory; Linear systems; Power system modeling; Signal to noise ratio; Transfer functions;
Conference_Titel :
Information Theory, 2007. ISIT 2007. IEEE International Symposium on
Conference_Location :
Nice
Print_ISBN :
978-1-4244-1397-3
DOI :
10.1109/ISIT.2007.4557470
