A Levenberg-Marquardt Method for Solving the Tensor Split Feasibility Problem

This paper considers the tensor split feasibility problem. Let C and Q be non-empty closed convex set and A be a semi-symmetric tensor. The tensor split feasibility problem is to find x is an element of C such that Ax(m-1) is an element of Q. If we simply take this problem as a special case of the nonlinear split feasibility problem, then we can directly get a projection method to solve it. However, applying this kind of projection method to solve the tensor split feasibility problem is not so efficient. So we propose a LevenbergMarquardt method to achieve higher efficiency. Theoretical analyses are conducted, and some preliminary numerical results show that the Levenberg-Marquardt method has advantage over the common projection method.