The Multi-Dimensional Decomposition with Constraints

Abstract

We search for the best fit in Frobenius norm of A ∈ Cm × n by a matrix product B C*, where B ∈ Cm × r and C ∈ Cn × r, r m so B = \bij\, (i=1, …, m,~ j=1, …, r) definite by some unknown parameters σ1, …, σk, k << mr and all partial derivatives of δbijδσl are definite, bounded and can be computed analytically. We show that this problem transforms to a new minimization problem with only k unknowns, with analytical computation of gradient of minimized function by all σ. The complexity of computation of gradient is only 4 times bigger than the complexity of computation of the function, and this new algorithm needs only 3mr additional memory. We apply this approach for solution of the three-way decomposition problem and obtain good results of convergence of Broyden algorithm.