Displaced Multiwavelets and Splitting Algorithms

Shumilov, B. M.

doi:10.1002/9781119242567.ch14

Advanced Engineering Materials and Modeling 2016

DOI: 10.1002/9781119242567.ch14

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Displaced Multiwavelets and Splitting Algorithms

B. M. Shumilov

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2020

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Shifted Cubic Spline Wavelets with Two Vanishing Moments on the Interval and a Splitting Algorithm

Shumilov

2020

Wseas Transactions on Systems

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This paper deals with the use of the first two vanishing moments for constructing cubic spline-wavelets orthogonal to polynomials of the first degree. A decrease in the supports of these wavelets is shown in comparison with the classical semiorthogonal wavelets. For splines with homogeneous Dirichlet boundary conditions of the second order, an algorithm of the shifted wavelet transform is obtained in the form of a solution of a tridiagonal system of linear equations with a strict diagonal dominance

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Shifted Cubic Spline Wavelets with Two Vanishing Moments on the Interval and a Splitting Algorithm

Shumilov

2020

Wseas Transactions on Systems

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show abstract

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Displaced Multiwavelets and Splitting Algorithms

Cited by 1 publication

References 38 publications

Shifted Cubic Spline Wavelets with Two Vanishing Moments on the Interval and a Splitting Algorithm

Shifted Cubic Spline Wavelets with Two Vanishing Moments on the Interval and a Splitting Algorithm

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