Litcius/Paper detail

New fractional-order shifted Gegenbauer moments for image analysis and recognition

Khalid M. Hosny, Mohamed Darwish, Mohamed Meselhy Eltoukhy

2020Journal of Advanced Research27 citationsDOIOpen Access PDF

Abstract

Orthogonal moments are used to represent digital images with minimum redundancy. Orthogonal moments with fractional-orders show better capabilities in digital image analysis than integer-order moments. In this work, the authors present new fractional-order shifted Gegenbauer polynomials. These new polynomials are used to define a novel set of orthogonal fractional-order shifted Gegenbauer moments (FrSGMs). The proposed method is applied in gray-scale image analysis and recognition. The invariances to rotation, scaling and translation (RST), are achieved using invariant fractional-order geometric moments. Experiments are conducted to evaluate the proposed FrSGMs and compare with the classical orthogonal integer-order Gegenbauer moments (GMs) and the existing orthogonal fractional-order moments. The new FrSGMs outperformed GMs and the existing orthogonal fractional-order moments in terms of image recognition and reconstruction, RST invariance, and robustness to noise.

Topics & Concepts

Velocity MomentsGegenbauer polynomialsMathematicsOrthogonal polynomialsZernike polynomialsImage momentLegendre polynomialsRobustness (evolution)Invariant (physics)Discrete orthogonal polynomialsAlgorithmClassical orthogonal polynomialsApplied mathematicsMathematical analysisImage processingComputer scienceImage (mathematics)Artificial intelligencePhysicsOpticsChemistryWavefrontMathematical physicsGeneBiochemistryImage Retrieval and Classification TechniquesImage Processing Techniques and ApplicationsImage and Signal Denoising Methods