Abstract
This paper develops the theory of generalized anti-synchronization (GAS) of discrete chaotic Hénon maps via linear transformations. This anti-synchronization method is based on the stability criteria of the linear system. The necessary and sufficient condition of GAS of chaotic maps using linear transformation is established. This paper suggests a method to study GAS through linear transformation in drive-response system. Our proposed method is able to find the relationship between the drive variables and response variables after anti-synchronization.
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