@inproceedings{d7b9cba5b9874b79bc7b1e2f20cd2eb9,
title = "Sparse multivariate function recovery from values with noise and outlier errors",
abstract = "Error-correcting decoding is generalized to multivariate sparse rational function recovery from evaluations that can be numerically inaccurate and where several evaluations can have severe errors ({"}outliers{"}). The generalization of the Berlekamp- Welch decoder to exact Cauchy interpolation of univariate rational functions from values with faults is by Kaltofen and Pernet in 2012 [to be submitted]. We give a different univariate solution based on structured linear algebra that yields a stable decoder with floating point arithmetic. Our multivariate polynomial and rational function interpolation algorithm combines Zippel's symbolic sparse polynomial interpolation technique [Ph.D. Thesis MIT 1979] with the numeric algorithm by Kaltofen, Yang, and Zhi [Proc. SNC 2007], and removes outliers ({"}cleans up data{"}) through techniques from error correcting codes. Our multivariate algorithm can build a sparse model from a number of evaluations that is linear in the sparsity of the model.",
keywords = "Cauchy interpolation, Error correcting coding, Fault tolerance, Rational function",
author = "Kaltofen, \{Erich L.\} and Zhengfeng Yang",
year = "2013",
doi = "10.1145/2465506.2465524",
language = "英语",
isbn = "9781450320597",
series = "Proceedings of the International Symposium on Symbolic and Algebraic Computation, ISSAC",
pages = "219--226",
booktitle = "ISSAC 2013 - Proceedings of the 38th International Symposium on Symbolic and Algebraic Computation",
note = "38th International Symposium on Symbolic and Algebraic Computation, ISSAC 2013 ; Conference date: 26-06-2013 Through 29-06-2013",
}