Maximum relative distance between real rank-two and rank-one tensors
Abstract
It is shown that the relative distance in Frobenius norm of a real symmetric order-d tensor of rank two to its best rank-one approximation is upper bounded by 1-(1-1/d)d-1. This is achieved by determining the minimal possible ratio between spectral and Frobenius norm for symmetric tensors of border rank two, which equals (1-1/d)(d-1)/2. These bounds are also verified for arbitrary real rank-two tensors by reducing to the symmetric case.
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