Legendre wavelet

Known as: Spherical wavelets 
In functional analysis, compactly supported wavelets derived from Legendre polynomials are termed Legendre wavelets or spherical harmonic wavelets… (More)
Wikipedia

Papers overview

Semantic Scholar uses AI to extract papers important to this topic.
2016
2016
This paper first introduces Legendre wavelet bases and derives their rich properties. Then these properties are applied to… (More)
  • figure 1
Is this relevant?
2015
2015
Abstract– In this paper, a new method is investigated for model order reduction of high order systems based on moment matching… (More)
  • figure 1
  • figure 2
  • figure 3
  • figure 4
  • table 1
Is this relevant?
2015
2015
This paper presents a new numerical approach, i.e., discontinuous Legendre wavelet Galerkin (DLWG) technique, to solve the Lane… (More)
  • table 1
  • table 2
  • figure 3
  • table 3
  • table 4
Is this relevant?
2014
2014
In this paper, a novel technique for power amplifier (PA) linearization is presented. The Legendre wavelet neural networks (LWNN… (More)
  • figure 1
  • figure 5
  • figure 6
Is this relevant?
2013
2013
Power system stability can significantly be enhanced by installing a Static Synchronous Series Compensator (SSSC) using… (More)
  • figure 1
  • figure 2
  • figure 4
  • figure 5
  • figure 8
Is this relevant?
2013
2013
In this paper, we propose an iterative spectral method for solving differential equations with initial values on large intervals… (More)
  • table 1
  • table 3
  • table 4
  • table 2
Is this relevant?
2013
2013
The purpose of this paper is to solve delay differential equations (DDEs) using Legendre wavelet method (LWM). The orthonormality… (More)
  • table 1
  • table 2
  • table 4
Is this relevant?
2006
2006
A numerical method for solving Abel s integral equation as singular Volterra integral equations is presented. The method is based… (More)
  • table 1
Is this relevant?
Highly Cited
2005
Highly Cited
2005
A numerical method for solving the nonlinear Volterra–Fredholm integral equations is presented. The method is based upon Legendre… (More)
  • table 2
Is this relevant?
2000
2000
  • M. Razzaghia, S. Yousefib
  • 2000
A direct method for solving variational problems using Legendre wavelets is presented. An operational matrix of integration is… (More)
  • table 1
Is this relevant?