In this paper the differential properties of Shannon wavelets are investigated. The connection coefficients of Shannon wavelets are explicitly computed with a finite formula up to any order. First Published Online: 14 Oct 201
One of the key issues which makes the waveletGalerkin method unsuitable for solving general electrom...
An application of discrete wavelet analysis and connection coefficients to parametric system identif...
In this paper the sinc-fractional derivative is extended to the Hilbert space based on Shannon wavel...
In this paper the differential properties of Shannon wavelets are investigated. The connection coeff...
Shannon wavelets are studied together with their differential properties known as connection coeffi...
Shannon wavelets are used to define a method for the solution of integrodifferential equations. Thi...
Shannon wavelets are used to define a method for the solution of integrodifferential equations. Thi...
In this paper an explicit analytical formula for the any order fractional derivative of Shannon wave...
The computation of connection coefficients is an important issue in the wavelet numerical solution o...
Daubechies wavelet basis functions have many properties that make them desirable as a basis for a Ga...
. Inner products of wavelets and their derivatives are presently known as connection coefficients. T...
AbstractA definition of connection coefficients is introduced and techniques of computation are pres...
International audienceInner products of wavelets and their derivatives are presently known as connec...
ABSTRACT It is proved that associated with every wavelet set is a closely related "regularized&...
It is well known that the 2pi minimally supported frequency scaling function phi(alpha)(x) satisfyin...
One of the key issues which makes the waveletGalerkin method unsuitable for solving general electrom...
An application of discrete wavelet analysis and connection coefficients to parametric system identif...
In this paper the sinc-fractional derivative is extended to the Hilbert space based on Shannon wavel...
In this paper the differential properties of Shannon wavelets are investigated. The connection coeff...
Shannon wavelets are studied together with their differential properties known as connection coeffi...
Shannon wavelets are used to define a method for the solution of integrodifferential equations. Thi...
Shannon wavelets are used to define a method for the solution of integrodifferential equations. Thi...
In this paper an explicit analytical formula for the any order fractional derivative of Shannon wave...
The computation of connection coefficients is an important issue in the wavelet numerical solution o...
Daubechies wavelet basis functions have many properties that make them desirable as a basis for a Ga...
. Inner products of wavelets and their derivatives are presently known as connection coefficients. T...
AbstractA definition of connection coefficients is introduced and techniques of computation are pres...
International audienceInner products of wavelets and their derivatives are presently known as connec...
ABSTRACT It is proved that associated with every wavelet set is a closely related "regularized&...
It is well known that the 2pi minimally supported frequency scaling function phi(alpha)(x) satisfyin...
One of the key issues which makes the waveletGalerkin method unsuitable for solving general electrom...
An application of discrete wavelet analysis and connection coefficients to parametric system identif...
In this paper the sinc-fractional derivative is extended to the Hilbert space based on Shannon wavel...