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Abstract
In this paper, we study the mean square convergence of the kernel least mean square (KLMS). The fundamental energy conservation relation has been established in feature space. Starting from the energy conservation relation, we carry out the mean square convergence analysis and obtain several important theoretical results, including an upper bound on step size that guarantees the mean square convergence, the theoretical steady-state excess mean square error (EMSE), an optimal step size for the fastest convergence, and an optimal kernel size for the fastest initial convergence. Monte Carlo simulation results agree with the theoretical analysis very well.
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