Open AccessEnergy Tensors: Quadratic, Phase Invariant Image Operators
Author(s) -
Michael Felsberg,
Erik Jonsson
Publication year - 2005
Publication title -
lecture notes in computer science
Language(s) - English
Resource type - Book series
SCImago Journal Rank - 0.249
H-Index - 400
eISSN - 1611-3349
pISSN - 0302-9743
ISBN - 3-540-28703-5
DOI - 10.1007/11550518_61
Subject(s) - invariant (physics) , computer science , quadratic equation , energy (signal processing) , algorithm , mathematics , mathematical physics , geometry , statistics
In this paper we briefly review a not so well known quadratic, phase invariant image processing operator, the energy operator, and describe its tensor-valued generalization, the energy tensor. We present relations to the real-valued and the complex valued energy operators and discuss properties of the three operators. We then focus on the discrete implementation for estimating the tensor based on Teager’s algorithm and frame theory. The kernels of the real-valued and the tensor-valued operators are formally derived. In a simple experiment we compare the energy tensor to other operators for orientation estimation. The paper is concluded with a short outlook to future work
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