A Power Method for Computing the Dominant Eigenvalue of a Dual Quaternion Hermitian Matrix
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In this paper, we first study the projections onto the set of unit dual quaternions, and the set of dual quaternion vectors with unit norms. Then we propose a power method for computing the dominant eigenvalue of a dual quaternion Hermitian matrix, and show its convergence and convergence rate under mild conditions. Based upon these, we reformulate the simultaneous localization and mapping (SLAM) problem as a rank-one dual quaternion completion problem. A two-block coordinate descent method is proposed to solve this problem. One block subproblem can be reduced to compute the best rank-one approximation of a dual quaternion Hermitian matrix, which can be computed by the power method. The other block has a closed-form solution. Numerical experiments are presented to show the efficiency of our proposed power method.
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