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Algebraic testing and weight distributions of codes

✍ Scribed by M. Kiwi

Publisher
Elsevier Science
Year
2003
Tongue
English
Weight
296 KB
Volume
299
Category
Article
ISSN
0304-3975

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✦ Synopsis

We study the testing problem, that is, the problem of determining (maybe probabilistically) if a function to which one has oracle access satisΓΏes a given property.

We propose a framework in which to formulate and carry out the analysis of several known tests. This framework establishes a connection between testing and the theory of weight distributions of codes. We illustrate this connection by giving a coding theoretic interpretation of several tests that fall under the label of low-degree tests. We also show how the connection naturally suggests a new way of testing for linearity over ΓΏnite ΓΏelds.

We derive from the MacWilliams Theorems a general result, the Duality Testing Lemma, and use it to analyze the simpler tests that fall into our framework. In contrast to other analyses of tests, the ones we present elicit the fact that a test's probability of rejecting a function depends on how far away the function is from every function that satisΓΏes the property of interest.

πŸ“œ SIMILAR VOLUMES

Description of Minimum Weight Codewords
Description of Minimum Weight Codewords of Cyclic Codes by Algebraic Systems
✍ Daniel Augot πŸ“‚ Article πŸ“… 1996 πŸ› Elsevier Science 🌐 English βš– 272 KB

We consider cyclic codes of length n over ‫ކ‬ q , n being prime to q. For such a cyclic code C, we describe a system of algebraic equations, denoted by S C (w), where w is a positive integer. The system is constructed from Newton's identities, which are satisfied by the elementary symmetric function