Your search keyword '"Statistics Theory"' showing total 2 results

1. Fast high dimensional approximation via random embeddings

Author

Kennedy, Christopher Garrett

Subjects

Data structures and algorithms, Computational geometry, Statistics theory, Information theory

Abstract

In the big data era, dimension reduction techniques have been a key tool in making high dimensional geometric problems tractable. This thesis focuses on two such problems - hashing and parameter estimation. We study locality sensitive hashing(LSH), which is a framework for randomized hashing that efficiently solves an approximate version of nearest neighbor search. We propose an efficient and provably optimal hash function for LSH that builds on a simple existing hash function called cross-polytope LSH. In the context of parameter estimation, we focus on regression, for which the well-known LASSO requires precise knowledge of the unknown noise variance. We provide an estimator for this noise variance when the signal is sparse that is consistent and faster than a single iteration of LASSO. Finally, we discuss notions of distance between probability distributions for the purposes of quantization and propose a distance metric called the Rényi divergence, that achieves both large and small scale bounds.

Published

2018

2. Fast high dimensional approximation via random embeddings

Author

Kennedy, Christopher Garrett

Subjects

Data structures and algorithms, Computational geometry, Statistics theory, Information theory

Abstract

In the big data era, dimension reduction techniques have been a key tool in making high dimensional geometric problems tractable. This thesis focuses on two such problems - hashing and parameter estimation. We study locality sensitive hashing(LSH), which is a framework for randomized hashing that efficiently solves an approximate version of nearest neighbor search. We propose an efficient and provably optimal hash function for LSH that builds on a simple existing hash function called cross-polytope LSH. In the context of parameter estimation, we focus on regression, for which the well-known LASSO requires precise knowledge of the unknown noise variance. We provide an estimator for this noise variance when the signal is sparse that is consistent and faster than a single iteration of LASSO. Finally, we discuss notions of distance between probability distributions for the purposes of quantization and propose a distance metric called the Rényi divergence, that achieves both large and small scale bounds.

Published

2018