A new Algorithm for Overcomplete Tensor Decomposition based on Sums-of-Squares Optimisation
Abstract
In this thesis, a new class of algorithms based on Sums of Squares Programming is developed. These allow to reduce a degree-d homogeneous polynomial T = Σi = 1m ai, X d to a quadratic form being close to a rank-1 form via a low-degree reduction polynomial W∈Σ R[X]2. W can be thought of as a `weight function' attaining high values on merely one of the components ai. The component can then be extracted by running an eigenvalue decomposition on the quadratic form Σi=1m W(ai) ai, X 2.
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