Linear canonical Fourier–Bessel wavelet transform: properties and inequalities
Hasnah Mohamed, A. Saoudi
Abstract
The purpose of this paper is to introduce and study the linear canonical Fourier–Bessel wavelet transform. We prove an orthogonality relation, inversion formula and some inequality for linear canonical Fourier–Bessel wavelet transform. We first present a direct relationship between the linear canonical Bessel wavelet transform and ordinary Bessel wavelet transform. Based on this relation, we provide an alternative proof of the orthogonality relation for the linear canonical Bessel wavelet transform. Some of its essential properties are also studied in detail. Finally, we explicitly derive several versions of inequalities associated with the linear canonical Bessel wavelet transform.
Topics & Concepts
MathematicsHarmonic wavelet transformWaveletBessel functionWavelet transformMathematical analysisDiscrete wavelet transformFourier transformBessel's inequalityStationary wavelet transformBessel processPure mathematicsOrthogonal polynomialsLinear inequalityComputer scienceArtificial intelligenceGegenbauer polynomialsInequalityClassical orthogonal polynomialsKantorovich inequalityMathematical Analysis and Transform MethodsMathematical functions and polynomialsImage and Signal Denoising Methods