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AAECC
2005
Springer
2005
Springer
Noisy interpolation of sparse polynomials in finite fields
Abstract We consider a polynomial analogue of the hidden number problem introduced by Boneh andVenkatesan, namely the sparse polynomial noisy interpolation problem of recovering an unknown polynomial f (X) IFp[X] with at most w non-zero terms from approximate values of f (t) at polynomially many points t IFp selected uniformly at random. We extend the polynomial time algorithm of the first author for polynomials f (X) of sufficiently small degree to polynomials of almost arbitrary degree. Our result is based on a combination of some number theory tools such as bounds of exponential sums and the number of solutions of congruences with the lattice reduction technique. The new idea is motivated by Waring's problem and uses a recent bound on exponential sums of Cochrane, Pinner, and Rosenhouse. Keywords Noisy interpolation
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| Added | 15 Dec 2010 |
| Updated | 15 Dec 2010 |
| Type | Journal |
| Year | 2005 |
| Where | AAECC |
| Authors | Igor Shparlinski, Arne Winterhof |
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