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CORR
2010
Springer
2010
Springer
Dense Error-Correcting Codes in the Lee Metric
Several new applications and a number of new mathematical techniques have increased the research on errorcorrecting codes in the Lee metric in the last decade. In this work we consider several coding problems and constructions of error-correcting codes in the Lee metric. First, we consider constructions of dense error-correcting codes in relatively small dimensions over small alphabets. The second problem we solve is construction of diametric perfect codes with minimum distance four. We will construct such codes over various lengths and alphabet sizes. The third problem is to transfer an n-dimensional Lee sphere with large radius into a shape, with the same volume, located in a relatively small box. Hadamard matrices play an essential role in the solutions for all three problems. A construction of codes based on Hadamard matrices will start our discussion. These codes approach the sphere packing bound for very high rate range and appear to be the best known codes over some sets of para...
Real-time TrafficCORR 2010 | Dense Error-correcting Codes | Diametric Perfect Codes | Education | N-dimensional Lee Sphere |
| Added | 01 Feb 2011 |
| Updated | 01 Feb 2011 |
| Type | Journal |
| Year | 2010 |
| Where | CORR |
| Authors | Tuvi Etzion, Alexander Vardy, Eitan Yaakobi |
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