Properties of a general quaternion-valued gradient operator and its applications to signal processing

Meng-di JIANG; Yi LI; Wei LIU

Front. Inform. Technol. Electron. Eng ›› 2016, Vol. 17 ›› Issue (02) : 83 -95.

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Abstract

The gradients of a quaternion-valued function are often required for quaternionic signal processing algorithms. The HR gradient operator provides a viable framework and has found a number of applications. However, the applications so far have been limited to mainly real-valued quaternion functions and linear quaternionvalued functions. To generalize the operator to nonlinear quaternion functions, we define a restricted version of the HR operator, which comes in two versions, the left and the right ones. We then present a detailed analysis of the properties of the operators, including several different product rules and chain rules. Using the new rules, we derive explicit expressions for the derivatives of a class of regular nonlinear quaternion-valued functions, and prove that the restricted HR gradients are consistent with the gradients in the real domain. As an application, the derivation of the least mean square algorithm and a nonlinear adaptive algorithm is provided. Simulation results based on vector sensor arrays are presented as an example to demonstrate the effectiveness of the quaternion-valued signal model and the derived signal processing algorithm.

Keywords

Quaternion / Gradient operator / Signal processing / Least mean square (LMS) algorithm / Nonlinear adaptive filtering / Adaptive beamforming

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Meng-di JIANG, Yi LI, Wei LIU. Properties of a general quaternion-valued gradient operator and its applications to signal processing. Front. Inform. Technol. Electron. Eng, 2016, 17(02): 83-95 DOI:

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