English

Learning 2D Gabor Filters by Infinite Kernel Learning Regression

Computer Vision and Pattern Recognition 2017-12-11 v1

Abstract

Gabor functions have wide-spread applications in image processing and computer vision. In this paper, we prove that 2D Gabor functions are translation-invariant positive-definite kernels and propose a novel formulation for the problem of image representation with Gabor functions based on infinite kernel learning regression. Using this formulation, we obtain a support vector expansion of an image based on a mixture of Gabor functions. The problem with this representation is that all Gabor functions are present at all support vector pixels. Applying LASSO to this support vector expansion, we obtain a sparse representation in which each Gabor function is positioned at a very small set of pixels. As an application, we introduce a method for learning a dataset-specific set of Gabor filters that can be used subsequently for feature extraction. Our experiments show that use of the learned Gabor filters improves the recognition accuracy of a recently introduced face recognition algorithm.

Keywords

Cite

@article{arxiv.1712.02974,
  title  = {Learning 2D Gabor Filters by Infinite Kernel Learning Regression},
  author = {Kamaledin Ghiasi-Shirazi},
  journal= {arXiv preprint arXiv:1712.02974},
  year   = {2017}
}
R2 v1 2026-06-22T23:12:03.891Z