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## Sennur Ulukus

### Professor

University of Maryland

## Wai Ho Mow

### Prof.

Hong Kong University of Science and Technology

## Mahesh K Varanasi

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### Latest Paper Awards

Information Theory Society Paper Award
C. Bennett , I. Devetak , A. Harrow , P. Shor , A. Winter , "The Quantum Reverse Shannon Theorem and Resource Tradeoffs for Simulating Quantum Channels", IEEE Transactions on Information Theory, May. 2014
Jack Keil Wolf ISIT Student Paper Award
O. Peled , O. Sabag , H. Permuter , "Feedback Capacity and Coding for the (0,k)-RLL Input-Constrained BEC", Proceedings of the 2017 IEEE International Symposium on Information Theory, Aachen, Germany, Jun. 2017
Jack Keil Wolf ISIT Student Paper Award
J. Li , X. Tang , C. Tian , "A Generic Transformation for Optimal Repair Bandwidth and Rebuilding Access in MDS Codes", Proceedings of the 2017 IEEE International Symposium on Information Theory, Aachen, Germany, Jun. 2017
Jack Keil Wolf ISIT Student Paper Award
Q. Yu , M. Maddah-Ali , S. Avestimehr , "The Exact Rate-Memory Tradeoff for Caching with Uncoded Prefetching", Proceedings of the 2017 IEEE International Symposium on Information Theory, Aachen, Germany, Jun. 2017
Communications Society & Information Theory Society Joint Paper Award
I. Tal , A. Vardy , "List Decoding of Polar Codes", IEEE Transactions on Information Theory, May. 2015
Thomas M. Cover Dissertation Award
L. Wang , "Channel Coding Techniques for Network Communication", Ph.D. Thesis, University of California, San Diego, Dec. 2015
cs.IT updates on arXiv.org
Secrecy Analysis of Physical Layer over $\kappa-\mu$ Shadowed Fading Scenarios. (arXiv:1804.09208v1 [cs.IT])
On the construction of sparse matrices from expander graphs. (arXiv:1804.09212v1 [cs.IT])
Unified approaches based effective capacity analysis over composite $\alpha-\eta-\mu$/gamma fading channels. (arXiv:1804.09213v1 [cs.IT])
Hybrid LISA for Wideband Multiuser Millimeter Wave Communication Systems under Beam Squint. (arXiv:1804.09223v1 [cs.IT])
The set of dimensions for which there are no linear perfect 2-error-correcting Lee codes has positive density. (arXiv:1804.09290v1 [cs.IT])

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