Partha P. Mitra and Jason B. Stark. Nonlinear limits to the information capacity of optical fibre communications. Nature, Home/Search Document Not in Database Summary Related Articles Check |
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Circuit Switching In The Internet - Fernandez (2003) (Correct)
....it takes to reference a new memory location. Finally, the capacity of fiber optics has been doubling every 7 to 8 months since the advent of DWDM in 1996. However, the growth rate is expected to decrease to doubling every year as we start approaching the maximum capacity per fiber of 100 Tbit s [124]. Despite this future growth slowdown of DWDM, the long term growth rate of link capacity will still be above that of Internet traffic at least past the year 2007 [116] Figure 1.3 shows the mismatch in the evolution rates of optical forwarding, traffic demand, electronic processing, and ....
Partha P. Mitra and Jason B. Stark. Nonlinear limits to the information capacity of optical fibre communications. Nature, 411:1027--1030, June 2001.
On The Evolution of PON-Based FTTH Solutions - Kim (2003) (1 citation) (Correct)
....and lightness, and immunity to electromagnetic interference of optical fibers. For example, it is shown that the information capacity of an optical fiber can exceed 100 Tb s under propagation nonlinearity for a typical Dense Wavelength Division Multiplexing (DWDM) system with coherent detection [1]. Because optical fibers are widely used in backbone networks, Wide Area Networks (WANs) and Metropolitan Area Networks (MANs) and are also being deployed in Local Area Networks (LANs) with the introduction of new optical Ethernet standards, the implementation of the FTTH in access Email ....
P. P. Mitra, J. B. Stark, Nonlinear limits to the information capacity of optical fibre communications, Nature 411 (2001) 1027--1030.
The Gaussian Watermarking Game - Cohen, Lapidoth (2000) (22 citations) (Correct)
....Gaussian random variables with covariance matrix K V Z . Let Y be another (not necessarily Gaussian) random variable related to V via the covariance matrix K V Y . If K V Y = K V Z , then I(V ; Y ) # I(V ; Z) 60 Remark: Similar lemmas have been given in a preliminary version of [40] and in [41], assuming that V and Y have a joint density. Proof. It su#ces to prove the lemma when all random variables are zero mean. If I(V ; Y ) is infinite then there is nothing to prove. Thus, we only consider the case where I(V ; Y ) #. 126) For the fixed covariance matrix K = K V Y = K V Z , ....
P. P. Mitra and J. B. Stark, "Nonlinear limits to the information capacity of optical fibre communications, " Nature, vol. 411, pp. 1027--1030, June 2001. 73
Reconfigurable wavelength-switched optical networks for the.. - Granger (2003) (2 citations) (Correct)
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Partha P. Mitra and Jason B. Stark. Nonlinear limits to the information capacity of optical fibre communications. Nature,
The Diffusion Mediated Biochemical Signal - Relay Channel Peter (2003) (Correct)
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Mitra, P.P. & Stark, J.B. (2001) Nonlinear limits to the information capacity of optical fibre communications. Nature411:1027-1030.
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