<--- Back to Details
First PageDocument Content
Telecommunications engineering / Mathematics / Turbo code / Additive white Gaussian noise / Puncturing / Information theory / Interleaving / Code / Hamming / Error detection and correction / Information / Convolutional code
Date: 2009-08-03 10:26:18
Telecommunications engineering
Mathematics
Turbo code
Additive white Gaussian noise
Puncturing
Information theory
Interleaving
Code
Hamming
Error detection and correction
Information
Convolutional code

Add to Reading List

Source URL: www.cl.cam.ac.uk

Download Document from Source Website

File Size: 246,04 KB

Share Document on Facebook

Similar Documents

Some Solutions, Homework 4, Statistical Analysis, Spring 2018 Problem 5: (from Rice) Appending three extra (binary) bits to a 4-bit word in a particular way (a Hamming Code) allows detection and correction of up

DocID: 1vhu8 - View Document

RANDOM SUBGRAPHS OF THE 2D HAMMING GRAPH: THE SUPERCRITICAL PHASE REMCO VAN DER HOFSTAD AND MALWINA J. LUCZAK CDAM Research report LSE-CDAMAbstract. We study random subgraphs of the 2-dimensional Hamming graph H

DocID: 1uXax - View Document

CDAM research report LSE-CDAMRANDOM SUBGRAPHS OF THE 2D HAMMING GRAPH: THE SUPERCRITICAL PHASE REMCO VAN DER HOFSTAD AND MALWINA J. LUCZAK Abstract. We study random subgraphs of the 2-dimensional Hamming graph H

DocID: 1uNj5 - View Document

CDAM research report LSE-CDAMTHE SECOND LARGEST COMPONENT IN THE SUPERCRITICAL 2D HAMMING GRAPH MALWINA J. LUCZAK AND JOEL SPENCER Abstract. The 2-dimensional Hamming graph H(2, n) consists of the n2 vertices (i

DocID: 1uaKw - View Document

Symmetric chains, Gelfand-Tsetlin chains, and the Terwilliger algebra of the binary Hamming scheme Murali K. Srinivasan Department of Mathematics Indian Institute of Technology, Bombay Powai, Mumbai, INDIA

DocID: 1u94Z - View Document