## COMPACTLY SUPPORTED WAVELETS DERIVED FROM LEGENDRE POLYNOMIALSBook 4.96 MB | Ebook Pages: 119compactly supported wavelets derived from legendre polynomials: spherical harmonic wavelets m.m.s. lira 1, h.m. de oliveira 2, m.a. carvalho jr 1, r.m.c. de souza 2 |

## Numerical Solution of System of Linear Integral Equations by usingBook 1.62 MB | Ebook Pages: 1773.2 Legendre wavelets method for solving System of lin-ear Volterra integral equations: For solving the system of linear Volterra integral equations (2), we consider |

## Optimal Control of Time-Varying Linear Systems Using WaveletsBook 2.38 MB | Ebook Pages: 143closed form are the Legendre wavelets which are pro-posed in [10,11]. Razzaghi and Youseﬁ [12] deﬁned functions which they called Legendre wavelets, however, these |

## NUMERICAL SOLUTION OF FREDHOLM INTEGRAL EQUATION OF THE SECONDBook 3.81 MB | Ebook Pages: 134A general Legendre wavelets method is applied to Fredholm integral equation of the second kind. Using the general operational matrix of integration we approximate |

## Legendre Wavelets for Systems of Fredholm Integral Equations ofBook 1.91 MB | Ebook Pages: 113Legendre Wavelets for Systems of Fredholm Integral Equations of the Second Kind J. Biazar and H. Ebrahimi Department of Mathematics, Faculty of Science, |

## A New Algorithm for Optimal Control of Time-Delay SystemsBook 2.86 MB | Ebook Pages: 122of the Legendre wavelets in such a way that the necessary conditions for extremity of performance index is imposed. Illustrative examples are given to |

## A quadrature rule for numerical integration based on Haar waveletsBook 2 MB | Ebook Pages: 77kind by using linear legendre multi-wavelets, App. Math. Comp. 191 (2007), 440–444. |

## Numerical Computation Method in Solving Integral Equation by UsingBook 6.87 MB | Ebook Pages: 81second Chebyshev wavelets to those of Legendre wavelets and CAS wavelets. It shows higher accuracy of the second Chebyshev wavelets method. Keywords: |

## A NEW WAVELET OPERATIONAL METHOD USING BLOCK PULSE AND HAARBook 4.2 MB | Ebook Pages: 217A NEW WAVELET OPERATIONAL METHOD USING BLOCK [21], Legendre polynomials [22], Chebyshev polynomials [23], Fourier series [24] and Haar wavelets functions [25]. |

## An Iterative Technique for Solving Nonlinear Optimal ControlBook 4.01 MB | Ebook Pages: 66Equation Using Legendre Wavelets”, Proceedings of the 6th IMT-GT Conference on Mathematics, Statistics and its Applications, Malaysia. [7] H |

## RATIONAL CHEBYSHEV COLLOCATION METHOD FOR SOLVING NONLINEARBook 4.48 MB | Ebook Pages: 208properties of Legendre wavelet together with the Gaussian integration method are utilized to reduce the integral equations to the solution of algebraic equations. By |

## NUMERICAL SOLUTION OF FREDHOLM-VOLTERRA INTEGRAL EQUATION IN TWOBook 2.48 MB | Ebook Pages: 75Yousefi and M. Razzaghi, Legendre wavelet method for the nonlinear Volterra-Fredholm integral equations, Appl. Math. Comput. Simul> 70 (2005) 1-8. [16]. S |

## Legendre multi-scaling Ritz Method for solving Boundary ValueBook 3.81 MB | Ebook Pages: 194Legendre multi-scaling Ritz Method for solving Boundary Value Variational Problems [10] introduced the Legendre wavelets method to variational problems. |

## Taylor series expansion of nonlinear integrodifferential equationsBook 1.62 MB | Ebook Pages: 130Here the continuous Legendre wavelets constructed on the interval [0, 1] is used to solve the nonlinear Volterra and integral equation of the second kind. |

## Numerical solution of Fredholm integral equations of the secondBook 4.39 MB | Ebook Pages: 199Legendre wavelets method for the nonlinear Volterra–Fredholm integral equations. Math. Comput. Simul., 70: 1–8. Author: user Created Date: 3/12 |

## Numerical Solution of Singular Integral Equations Using OrthogonalBook 6.58 MB | Ebook Pages: 73functions for singular integral equations. In [9], Legendre wavelets approximation have been used for numerically solution of Abel’s integral equations. |

## Legendre polynomials Triple Product Integral and lower-degreeBook 6.87 MB | Ebook Pages: 246Legendre polynomials Triple Product Integral and lower-degree approximation of polynomials using Chebyshev polynomials as compared to Haar Wavelets which |

## Translation and Scale Invariant of Legendre Moments for ImagesBook 1.53 MB | Ebook Pages: 92using generic Fourier, Legendre moments, and Wavelet Zernike moment descriptors and recognition using joint transform correlator. Optics & Laser Technology , 40(3), |

## Comparison between Karhunen–Loeve and wavelet expansions forBook 7.15 MB | Ebook Pages: 243and wavelet expansions for simulation of Gaussian processes K.K. Phoon *, H.W. Huang, S.T. Quek Legendre polynomials [5], and wavelets [6] have been used. |

## An efﬁcient computational algorithm for solving the nonlinearBook 1.72 MB | Ebook Pages: 249applied Legendre wavelet approximations. Bataineh et al. [2] presented an algorithm based on homo-topy analysis method (HAM) [14] to obtain the exact and/or |

## A second look at separation of variablesBook 5.44 MB | Ebook Pages: 123– Legendre polynomials & Laplace in spherical polars Walsh, Bessel, Legendre, …, wavelets. Legendre orthogonal functions & SL equation ( ) () (5 3) 2 ( ) |

## Frequency Analysis of Laser-Generated Pressure Waves Using WaveletBook 5.82 MB | Ebook Pages: 114Legendre et al [6] have proposed a wavelet-based method to perform the NDE ultrasonic signal. By combining the time domain and the classical Fourier analysis, |

## WAVELET LEADER MULTIFRACTAL ANALYSIS FOR TEXTURE CLASSIFICATIONBook 1.62 MB | Ebook Pages: 62Then, the Legendre transform of (q) is taken, which deﬁnes the multifractal spectrum L(h) = inf wavelet-based method for multifractal image analysis. |

## Numerical Solution of Singular IVPs of Lane-Emden Type UsingBook 2.29 MB | Ebook Pages: 217Youseﬁ, Legendre wavelet method for solving diﬀerential equations of Lane-Emden type, Appl. Math. Comput. 181 (2006) 1417-1422. Created Date: |

## Personal InformationBook 6.1 MB | Ebook Pages: 120The Legendre wavelet method for solving fractional differential equations(with Mujeeb ur Rehman), Communications in nonlinear Sciences and numerical |

## Wavelets Entropy and Zero-Crossing White-Noise Test Applied toBook 4.58 MB | Ebook Pages: 175Wavelets Entropy and Zero-Crossing White-Noise Test Applied to Ultrasonic S.Legendre and co. [8] proposed a wavelet-based method to perform the analysis of NDE |

## Volume 3, Number 2, Pages 243{250 - University of AlbertaBook 4.67 MB | Ebook Pages: 60[10] Razzaghi, M. and Youseﬂ, S. legendre wavelets Direct Method for Variational Problems Math-ematics and Computers in Simulation vol 53 pages 185-192 (2000). |

## Methodology for Multifractal Analysis of Heart Rate VariabilityBook 1.43 MB | Ebook Pages: 108From LF=HF Ratio to Wavelet Leaders P. Abry, H. Wendt, S. Jaffard, H. Helgason, P. Goncalves, E. Pereira, Cl. Legendre transform, both positive and negative values of |

## Ridgelets: a key to higher-dimensional intermittency?Book 5.15 MB | Ebook Pages: 143wavelets deal e–ciently only with one type of intermittency { singularities at and Legendre representations; but the singularity causes highly localized, or con- |

## Numerical Solution of Two-Dimensional Volterra Integral EquationsBook 5.91 MB | Ebook Pages: 160have introduced two-dimensional Legendre wavelets method for the numerical treatment of nonlinear mixed two-dimensional VFIEs. Yet so far, to the authors knowledge, |

## Click Here Full Article Revisiting multifractality of highBook 4.86 MB | Ebook Pages: 154Legendre transform z(q) = inf h>0 [qh +1 D(h)]. The wavelet transform and show how it can be used to extract singularities of a signal. We then demonstrate that by |

## ALGORITHMS AND BASIS FUNCTIONS IN TOMOGRAPHIC RECONSTRUCTION OFBook 3.34 MB | Ebook Pages: 88tions, namely Haar Wavelets, Scaled Legendre Polynomials and Cut-Legendre Polynomials. The electron density is mod-elled by the IRI-95 for |

## Fractals and Wavelets: what can we learn on transcription andBook 4.48 MB | Ebook Pages: 142the D(h) singularity spectrum via the Legendre transform of the scaling exponents τ(q) (q WAVELET TRANSFORM MICROSCOPE TO THE MODELING OF REPLICA- |

## Chebyshev Wavelet Method for Numerical Solution of FredholmBook 1.72 MB | Ebook Pages: 150Legendre wavelets 150.0 0.0000000000 0.0000000002 −0.0000080915 −0.0000623203 0.1 0.1000000000 0.0999467145 0.0999919084 0.0999399803 |

## Solving an Integro-Di erential Equation by Legendre Polynomial andBook 4.48 MB | Ebook Pages: 134hybrid Legendre and Block-Pulse functions the accuracy of system will improve Wavelets and Other Orthogonal Systems, Studies in Advanced Mathematics, |

## An important interrelation between fast solvers for spectral andBook 5.44 MB | Ebook Pages: 162induced by the nodes of Gauss-Lobatto-Legendre or Gauss-Lobatto-Chebyshev quadrature rules. The and fast multiresolution wavelet solver of Beuchler/Schneuder |

## LOSSY COMPRESSION BY POST-TRANSFORMS IN THE WAVELET DOMAINBook 1.34 MB | Ebook Pages: 230Post-transform bases of R16 are obtained using discrete orthogonal Legendre polynomial bases on wavelet transform and the bandelet transform with the |

## MODELLING AND SIMULATION OF EARTHQUAKE GROUND MOTION VIABook 3.91 MB | Ebook Pages: 156to a subspace spanned by discrete Legendre polynomials have been used for earthquake ground ture, the wavelet functional basis used, |

## Implementation of Karhunen–Loeve expansion for simulation usingBook 1.53 MB | Ebook Pages: 147For polynomial basis function, Legendre polynomials up wavelets at a given resolution do not overlap which greatly simpliﬁes numerical computation. |

## ROTATIONALLY INVARIANT QUADRATURES FOR THEBook 5.25 MB | Ebook Pages: 202angle and Gauss-Legendre discretization in polar angle, leading to an unrea- of wavelets. Several proposals for local and multiresolution representations |

## A Numerical Scheme to Solve Nonlinear Volterra Integral EquationsBook 2.48 MB | Ebook Pages: 171Legendre wavelets method for the nonlinear Volterra-Fredholm integral equations, Mathematics and Computers in Simulation, 70 (2005), pp. 1-8. |

## Electric Power Systems Research - Home | University of CalgaryBook 1.81 MB | Ebook Pages: 247than traditional Legendre, Fourier and wavelet representa-tions [17]. Thus, the RNN is an appropriate choice for wind power forecast |

## Adaptive Solution of Partial Differential Equations inBook 3.62 MB | Ebook Pages: 115approximation; integrodifferential operators; Legendre polynomials; Runge phe-nomenon. 1. to the Haar basis and in contrast to wavelets with regularity. |

## AN EFFICIENT SPECTRAL METHOD FOR HIGH-ORDERBook 6.48 MB | Ebook Pages: 172In the proposed method, orthogonal Legendre polynomials and their properties are tion methods, wavelet-Galerkin method, the block-pulse functions (BPFs) method |

## Volumes-IJOPCM-2010 Friday, 12 March 2010 14:38 - Last UpdatedBook 4.2 MB | Ebook Pages: 107Numerical Solution of System of Linear Integral Equations by using Legendre Wavelets 15 / 19. Volumes-IJOPCM-2010 Friday, 12 March 2010 14:38 |

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