Abstract
A novel three-dimensional Clef chaotic attractor system is proposed in this paper and the consistent occurring dynamical behaviors of the attractor is analyzed and the subsequent Lyapunov exponents, Poincare´ maps etc., are computed accordingly. The attractor is named Clef as it resembles the shape of the musical notation Clef. Quest on dynamical systems has led the researchers to invent various dynamical systems and strange attractors solving conservative applications in engineering science. Principally in shielding the superabundant multimedia content for data encryption and compression imposing greater complexity to the crypto systems and also strange attractors outperforms in the material science field for instance identifying the metal corrosion, controlling vibroformers, controlling turbulence etc., supplementary to the above, chaos expands its rays of hope and lucrative in economics, stock market, psychology and much more scientific fields.
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