Litcius/Paper detail

A Nonlinear Noise-Resistant Zeroing Neural Network Model for Solving Time-Varying Quaternion Generalized Lyapunov Equation and Applications to Color Image Processing

Lin Xiao, Xiangru Yan, Yongjun He, Biao Luo, Qiya Song

2025IEEE Transactions on Neural Networks and Learning Systems16 citationsDOI

Abstract

The time-varying Lyapunov equation (TVLE) plays a crucial role in control design and system stability. However, there has been limited research conducted on the time-varying generalized Lyapunov equation in the quaternion field. To tackle the time-varying quaternion generalized Lyapunov equation, a nonlinear noise-resistant zeroing neural network (NNR-ZNN) model with a novel power activation function (NPAF) is devised. The issue of non-commutativity within quaternion is circumvented by utilizing the real representation. The theoretical analyses provide a sufficient explanation for the global stability, fixed-time convergence, and robustness of the NNR-ZNN model. Under several different kinds of noises, the exceptional robustness of the NNR-ZNN model is highlighted by comparison with other existing models. In the end, the successful applications of the NNR-ZNN model to color image fusion and color image denoising confirm the practical value of the NNR-ZNN model.

Topics & Concepts

QuaternionLyapunov functionRobustness (evolution)Control theory (sociology)Nonlinear systemLyapunov equationArtificial neural networkMathematicsLyapunov redesignComputer scienceArtificial intelligenceGeometryControl (management)BiochemistryGeneQuantum mechanicsChemistryPhysicsImage and Signal Denoising MethodsMathematical Analysis and Transform MethodsAdvanced Image Fusion Techniques