Open AccessMATLAB tensor classes for fast algorithm prototyping.
Author(s) -
Brett W. Bader,
Tamara G. Kolda
Publication year - 2004
Publication title -
osti oai (u.s. department of energy office of scientific and technical information)
Language(s) - English
Resource type - Reports
DOI - 10.2172/974890
Subject(s) - tensor (intrinsic definition) , matlab , tensor contraction , matrix multiplication , computer science , tensor calculus , matrix (chemical analysis) , computational science , cartesian tensor , class (philosophy) , algorithm , variety (cybernetics) , tensor density , tensor product , mathematics , exact solutions in general relativity , tensor field , artificial intelligence , pure mathematics , physics , programming language , mathematical analysis , chemistry , quantum mechanics , quantum , chromatography
Tensors (also known as mutidimensional arrays or N-way arrays) are used in a variety of applications ranging from chemometrics to psychometrics. We describe four MATLAB classes for tensor manipulations that can be used for fast algorithm prototyping. The tensor class extends the functionality of MATLAB's multidimensional arrays by supporting additional operations such as tensor multiplication. The tensor as matrix class supports the 'matricization' of a tensor, i.e., the conversion of a tensor to a matrix (and vice versa), a commonly used operation in many algorithms. Two additional classes represent tensors stored in decomposed formats: cp tensor and tucker tensor. We descibe all of these classes and then demonstrate their use by showing how to implement several tensor algorithms that have appeared in the literature
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