B. Hochwald and S. Vishwanath. Space-time multiple access: Linear growth in sum rate. In Proceedings of 40th Annual Allerton Conference on Commun., Control and Computing, Oct. 2002.  Home/Search   Document Details and Download   Summary   Related Articles   Check

....zero and variance close to unity for large n (since, for r given by (20) 1 4r) 1, for large n) Thus, is nearly distributed as F 2; 2( 2 1) which has mean (1 2 2 ) and variance (1 (1 (see Theorem 3.3. 28 [15] and its generalization to complex vectors in [19]) Furthermore, it is easy to show that, for F 2;2K ; K 1, and 0, E [log(1 ) e log(1 ) Hence, 22) holds if Therefore, rate R is feasible from s to d with high probability if ( 1) 1 = Wn) 23) 3. Lastly, destination d should be able to ....

B. Hochwald and S. Vishwanath, \Space-time multiple access: linear growth in the sumrate, " in Proc. 40th Annual Allerton Conf. Communications, Control, & Computing, Allerton, IL, Oct. 2002.

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B. Hochwald and S. Vishwanath. Space-time multiple access: Linear growth in sum rate. In Proceedings of 40th Annual Allerton Conference on Commun., Control and Computing, Oct. 2002.

No context found.

B. M. Hochwald and S. Vishwanath, "Space-time multiple access: Linear growth in the sum rate," in Proceedings 40th Allerton Conference on Computers, Communications and Control, (Monticello, Illinois), October 2002.

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B. M. Hochwald and S. Vishwanath, "Space-time multiple access: Linear growth in the sum rate," in Proceedings 40th Allerton Conference on Computers, Communications and Control, (Monticello, Illinois), October 2002.

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