2012Zhao Denoising: Difference between revisions

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== Abstract ==
== Abstract ==


We present an efficient and accurate algorithm for principal component analysis (PCA) of a large set of two-
We present an efficient and accurate algorithm for principal component analysis(PCA) of a large set of two-dimensional images, and, for each image, the set of its uniform rotations in the plane and its reflection. The
dimensional images, and, for each image, the set of its uniform rotations in the plane and its reflection. The
algorithm starts by expanding each image, originally given
algorithm starts by expanding each image, originally given
on a Cartesian grid, in the Fourier-Bessel basis for
on a Cartesian grid, in the Fourier-Bessel basis for
Line 23: Line 22:
== Links ==
== Links ==


http://arxiv.org/abs/1211.1968
http://www.ncbi.nlm.nih.gov/pubmed/23695317


== Related software ==
== Related software ==
ASPIRE


== Related methods ==
== Related methods ==


== Comments ==
== Comments ==

Latest revision as of 18:22, 16 July 2014

Citation

Zhao, Z. & Singer, A. Fourier-Bessel rotational invariant eigenimages J. Optical Soc. America A, 2012, 30, 871-877

Abstract

We present an efficient and accurate algorithm for principal component analysis(PCA) of a large set of two-dimensional images, and, for each image, the set of its uniform rotations in the plane and its reflection. The algorithm starts by expanding each image, originally given on a Cartesian grid, in the Fourier-Bessel basis for the disk. Because the images are essentially bandlimited in the Fourier domain, we use a sampling criterion to truncate the Fourier-Bessel expansion such that the maximum amount of information is preserved without the effect of aliasing. The constructed covariance matrix is invariant to rotation and reflection and has a special block diagonal structure. PCA is efficiently done for each block separately. This Fourier-Bessel based PCA detects more meaningful eigenimages and has improved denoising capability compared to traditional PCA for a finite number of noisy images.

Keywords

Denoising, PCA, rotational invariant basis

Links

http://www.ncbi.nlm.nih.gov/pubmed/23695317

Related software

ASPIRE

Related methods

Comments