Bibliografias temáticas / Wavelets (Mathematics) / Artigos de revistas
Siga este link para ver outros tipos de publicações sobre o tema: Wavelets (Mathematics).

Artigos de revistas sobre o tema "Wavelets (Mathematics)"

Autor: Grafiati
Publicado: 4 de junho de 2021
Última modificação: 30 de julho de 2024

Crie uma referência precisa em APA, MLA, Chicago, Harvard, e outros estilos

Selecione um tipo de fonte:

Veja os 50 melhores artigos de revistas para estudos sobre o assunto "Wavelets (Mathematics)".

Ao lado de cada fonte na lista de referências, há um botão "Adicionar à bibliografia". Clique e geraremos automaticamente a citação bibliográfica do trabalho escolhido no estilo de citação de que você precisa: APA, MLA, Harvard, Chicago, Vancouver, etc.

Você também pode baixar o texto completo da publicação científica em formato .pdf e ler o resumo do trabalho online se estiver presente nos metadados.

Veja os artigos de revistas das mais diversas áreas científicas e compile uma bibliografia correta.

1

Battle, Guy. "Osiris wavelets and Set wavelets." Journal of Applied Mathematics 2004, no. 6 (2004): 495–528. http://dx.doi.org/10.1155/s1110757x04404070.

Texto completo da fonte
Resumo:
An alternative to Osiris wavelet systems is introduced in two dimensions. The basic building blocks are continuous piecewise linear functions supported on equilateral triangles instead of on squares. We refer to wavelets generated in this way as Set wavelets. We introduce a Set wavelet system whose homogeneous mode density is2/5. The system is not orthonormal, but we derive a positive lower bound on the overlap matrix.
Estilos ABNT, Harvard, Vancouver, APA, etc.
2

Lal, Shyam, and Harish Yadav. "Approximation of functions belonging to Hölder’s class and solution of Lane-Emden differential equation using Gegenbauer wavelets." Filomat 37, no. 12 (2023): 4029–45. http://dx.doi.org/10.2298/fil2312029l.

Texto completo da fonte
Resumo:
In this paper, a very new technique based on the Gegenbauer wavelet series is introduced to solve the Lane-Emden differential equation. The Gegenbauer wavelets are derived by dilation and translation of an orthogonal Gegenbauer polynomial. The orthonormality of Gegenbauer wavelets is verified by the orthogonality of classical Gegenbauer polynomials. The convergence analysis of Gegenbauer wavelet series is studied in H?lder?s class. H?lder?s class H?[0,1) and H?[0,1) of functions are considered, H?[0,1) class consides with classical H?lder?s class H?[0, 1) if ?(t) = t?, 0 < ? ? 1. The Gegenb
Estilos ABNT, Harvard, Vancouver, APA, etc.
3

Kathuria, Leena, Shashank Goel, and Nikhil Khanna. "Fourier–Boas-Like Wavelets and Their Vanishing Moments." Journal of Mathematics 2021 (March 6, 2021): 1–7. http://dx.doi.org/10.1155/2021/6619551.

Texto completo da fonte
Resumo:
In this paper, we propose Fourier–Boas-Like wavelets and obtain sufficient conditions for their higher vanishing moments. A sufficient condition is given to obtain moment formula for such wavelets. Some properties of Fourier–Boas-Like wavelets associated with Riesz projectors are also given. Finally, we formulate a variation diminishing wavelet associated with a Fourier–Boas-Like wavelet.
Estilos ABNT, Harvard, Vancouver, APA, etc.
4

Olphert, Sean, and Stephen C. Power. "Higher Rank Wavelets." Canadian Journal of Mathematics 63, no. 3 (June 1, 2011): 689–720. http://dx.doi.org/10.4153/cjm-2011-012-1.

Texto completo da fonte
Resumo:
Abstract A theory of higher rank multiresolution analysis is given in the setting of abelian multiscalings. This theory enables the construction, from a higher rank MRA, of finite wavelet sets whose multidilations have translates forming an orthonormal basis in L2(ℝd). While tensor products of uniscaled MRAs provide simple examples we construct many nonseparable higher rank wavelets. In particular we construct Latin square wavelets as rank 2 variants of Haar wavelets. Also we construct nonseparable scaling functions for rank 2 variants of Meyer wavelet scaling functions, and we construct the a
Estilos ABNT, Harvard, Vancouver, APA, etc.
5

Jiang, Zhuhan, and Xiling Guo. "A note on the extension of a family of biorthogonal Coifman wavelet systems." ANZIAM Journal 46, no. 1 (July 2004): 111–20. http://dx.doi.org/10.1017/s1446181100013717.

Texto completo da fonte
Resumo:
AbstractWavelet systems with a maximum number of balanced vanishing moments are known to be extremely useful in a variety of applications such as image and video compression. Tian and Wells recently created a family of such wavelet systems, called the biorthogonal Coifman wavelets, which have proved valuable in both mathematics and applications. The purpose of this work is to establish along with direct proofs a very neat extension of Tian and Wells' family of biorthogonal Coifman wavelets by recovering other “missing” members of the biorthogonal Coifman wavelet systems.
Estilos ABNT, Harvard, Vancouver, APA, etc.
6

Ahmad, Owais. "Characterization of tight wavelet frames with composite dilations in L2(Rn)." Publications de l'Institut Math?matique (Belgrade) 113, no. 127 (2023): 121–29. http://dx.doi.org/10.2298/pim2327121a.

Texto completo da fonte
Resumo:
Tight wavelet frames are different from the orthonormal wavelets because of redundancy. By sacrificing orthonormality and allowing redundancy, the tight wavelet frames become much easier to construct than the orthonormal wavelets. Guo, Labate, Lim, Weiss, and Wilson [Electron. Res. Announc. Am. Math. Soc. 10 (2004), 78-87] introduced the theory of wavelets with composite dilations in order to provide a framework for the construction of waveforms defined not only at various scales and locations but also at various orientations. In this paper, we provide the characterization of composite wavelet
Estilos ABNT, Harvard, Vancouver, APA, etc.
7

ASHUROV, RAVSHAN. "CONVERGENCE OF THE CONTINUOUS WAVELET TRANSFORMS ON THE ENTIRE LEBESGUE SET OF Lp-FUNCTIONS." International Journal of Wavelets, Multiresolution and Information Processing 09, no. 04 (July 2011): 675–83. http://dx.doi.org/10.1142/s0219691311004262.

Texto completo da fonte
Resumo:
The almost everywhere convergence of wavelets transforms of Lp-functions under minimal conditions on wavelets is well known. But this result does not provide any information about the exceptional set (of Lebesgue measure zero), where convergence does not hold. In this paper, under slightly stronger conditions on wavelets, we prove convergence of wavelet transforms everywhere on the entire Lebesgue set of Lp-functions. On the other hand, practically all the wavelets, including Haar and "French hat" wavelets, used frequently in applications, satisfy our conditions. We also prove that the same co
Estilos ABNT, Harvard, Vancouver, APA, etc.
8

Cattani, Carlo. "Shannon Wavelets Theory." Mathematical Problems in Engineering 2008 (2008): 1–24. http://dx.doi.org/10.1155/2008/164808.

Texto completo da fonte
Resumo:
Shannon wavelets are studied together with their differential properties (known as connection coefficients). It is shown that the Shannon sampling theorem can be considered in a more general approach suitable for analyzing functions ranging in multifrequency bands. This generalization coincides with the Shannon wavelet reconstruction ofL2(ℝ)functions. The differential properties of Shannon wavelets are also studied through the connection coefficients. It is shown that Shannon wavelets areC∞-functions and their any order derivatives can be analytically defined by some kind of a finite hypergeom
Estilos ABNT, Harvard, Vancouver, APA, etc.
9

ZHAN, YINWEI, and HENK J. A. M. HEIJMANS. "NON-SEPARABLE 2D BIORTHOGONAL WAVELETS WITH TWO-ROW FILTERS." International Journal of Wavelets, Multiresolution and Information Processing 03, no. 01 (March 2005): 1–18. http://dx.doi.org/10.1142/s0219691305000713.

Texto completo da fonte
Resumo:
In the literature 2D (or bivariate) wavelets are usually constructed as a tensor product of 1D wavelets. Such wavelets are called separable. However, there are various applications, e.g. in image processing, for which non-separable 2D wavelets are prefered. In this paper, we investigate the class of compactly supported orthonormal 2D wavelets that was introduced by Belogay and Wang.2 A characteristic feature of this class of wavelets is that the support of the corresponding filter comprises only two rows. We are concerned with the biorthogonal extension of this kind of wavelets. It turns out t
Estilos ABNT, Harvard, Vancouver, APA, etc.
10

Fu, Shengyu, B. Muralikrishnan, and J. Raja. "Engineering Surface Analysis With Different Wavelet Bases." Journal of Manufacturing Science and Engineering 125, no. 4 (November 1, 2003): 844–52. http://dx.doi.org/10.1115/1.1616947.

Texto completo da fonte
Resumo:
Traditional surface texture analysis involves filtering surface profiles into different wavelength bands commonly referred to as roughness, waviness and form. The primary motivation in filtering surface profiles is to map each band to the manufacturing process that generated the part and the intended functional performance of the component. Current trends in manufacturing are towards tighter tolerances and higher performance standards that require close monitoring of the process. Thus, there is a need for finer bandwidths for process mapping and functional correlation. Wavelets are becoming in
Estilos ABNT, Harvard, Vancouver, APA, etc.
11

Benedetto, John J., Michael W. Frazier, and Bruno Torrésani. "Wavelets: Mathematics and Applications." Physics Today 47, no. 11 (November 1994): 90–91. http://dx.doi.org/10.1063/1.2808703.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
12

Dremin, I. M. "Wavelets: Mathematics and applications." Physics of Atomic Nuclei 68, no. 3 (March 2005): 508–20. http://dx.doi.org/10.1134/1.1891202.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
13

OTHMANI, MOHAMED, WAJDI BELLIL, CHOKRI BEN AMAR, and ADEL M. ALIMI. "A NEW STRUCTURE AND TRAINING PROCEDURE FOR MULTI-MOTHER WAVELET NETWORKS." International Journal of Wavelets, Multiresolution and Information Processing 08, no. 01 (January 2010): 149–75. http://dx.doi.org/10.1142/s0219691310003353.

Texto completo da fonte
Resumo:
This paper deals with the features of a new wavelet network structure founded on several mother wavelets families. This new structure is similar to the classic wavelets network but it admits some differences eventually. The wavelet network basically uses the dilations and translations versions of only one mother wavelet to construct the network, but the new one uses several mother wavelets and the objective is to maximize the probability of selection of the best wavelets. Two methods are presented to assist the training procedure of this new structure. On one hand, we have an optimal selection
Estilos ABNT, Harvard, Vancouver, APA, etc.
14

Zhang, Xi, and Noriaki Fukuda. "Lossy to lossless image coding based on wavelets using a complex allpass filter." International Journal of Wavelets, Multiresolution and Information Processing 12, no. 04 (July 2014): 1460002. http://dx.doi.org/10.1142/s0219691314600029.

Texto completo da fonte
Resumo:
Wavelet-based image coding has been adopted in the international standard JPEG 2000 for its efficiency. It is well-known that the orthogonality and symmetry of wavelets are two important properties for many applications of signal processing and image processing. Both can be simultaneously realized by the wavelet filter banks composed of a complex allpass filter, thus, it is expected to get a better coding performance than the conventional biorthogonal wavelets. This paper proposes an effective implementation of orthonormal symmetric wavelet filter banks composed of a complex allpass filter for
Estilos ABNT, Harvard, Vancouver, APA, etc.
15

Zhang, Xinming, Jiaqi Liu, and Ke'an Liu. "A Wavelet Galerkin Finite-Element Method for the Biot Wave Equation in the Fluid-Saturated Porous Medium." Mathematical Problems in Engineering 2009 (2009): 1–18. http://dx.doi.org/10.1155/2009/142384.

Texto completo da fonte
Resumo:
A wavelet Galerkin finite-element method is proposed by combining the wavelet analysis with traditional finite-element method to analyze wave propagation phenomena in fluid-saturated porous medium. The scaling functions of Daubechies wavelets are considered as the interpolation basis functions to replace the polynomial functions, and then the wavelet element is constructed. In order to overcome the integral difficulty for lacking of the explicit expression for the Daubechies wavelets, a kind of characteristic function is introduced. The recursive expression of calculating the function values o
Estilos ABNT, Harvard, Vancouver, APA, etc.
16

Low, Yin Fen, and Rosli Besar. "Optimal Wavelet Filters for Medical Image Compression." International Journal of Wavelets, Multiresolution and Information Processing 01, no. 02 (June 2003): 179–97. http://dx.doi.org/10.1142/s0219691303000128.

Texto completo da fonte
Resumo:
Recently, the wavelet transform has emerged as a cutting edge technology, within the field of image compression research. The basis functions of the wavelet transform are known as wavelets. There are a variety of different wavelet functions to suit the needs of different applications. Among the most popular wavelets are Haar, Daubechies, Coiflet and Biorthogonal, etc. The best wavelets (functions) for medical image compression are widely unknown. The purpose of this paper is to examine and compare the difference in impact and quality of a set of wavelet functions (wavelets) to image quality fo
Estilos ABNT, Harvard, Vancouver, APA, etc.
17

Cattani, Carlo, and Aleksey Kudreyko. "Application of Periodized Harmonic Wavelets towards Solution of Eigenvalue Problems for Integral Equations." Mathematical Problems in Engineering 2010 (2010): 1–8. http://dx.doi.org/10.1155/2010/570136.

Texto completo da fonte
Resumo:
This article deals with the application of the periodized harmonic wavelets for solution of integral equations and eigenvalue problems. The solution is searched as a series of products of wavelet coefficients and wavelets. The absolute error for a general case of the wavelet approximation was analytically estimated.
Estilos ABNT, Harvard, Vancouver, APA, etc.
18

Sharma, Vikram, and P. Manchanda. "WAVELET PACKETS ASSOCIATED WITH NONUNIFORM MULTIRESOLUTION ANALYSIS ON POSITIVE HALF LINE." Asian-European Journal of Mathematics 06, no. 01 (March 2013): 1350007. http://dx.doi.org/10.1142/s1793557113500071.

Texto completo da fonte
Resumo:
Gabardo and Nashed [Nonuniform multiresolution analysis and spectral pairs, J. Funct. Anal.158 (1998) 209–241] introduced the Nonuniform multiresolution analysis (NUMRA) whose translation set is not a group. Farkov [Orthogonal p-wavelets on ℝ+, in Proc. Int. Conf. Wavelets and Splines (St. Petersburg State University, St. Petersburg, 2005), pp. 4–26] studied multiresolution analysis (MRA) on positive half line and constructed associated wavelets. Meenakshi et al. [Wavelets associated with Nonuniform multiresolution analysis on positive half line, Int. J. Wavelets, Multiresolut. Inf. Process.10
Estilos ABNT, Harvard, Vancouver, APA, etc.
19

SHUKLA, N. K., and G. C. S. YADAV. "CONSTRUCTING NON-MSF WAVELETS FROM GENERALIZED JOURNÉ WAVELET SETS." Analysis and Applications 09, no. 02 (April 2011): 225–33. http://dx.doi.org/10.1142/s0219530511001820.

Texto completo da fonte
Resumo:
Dai and Larson [Mem. Amer. Math. Soc.134 (1998), no. 640] obtained a family of wavelet sets using the Journé wavelet set. In this paper, we expand this family and call its members to be generalized Journé wavelet sets. Furthermore, with the help of these wavelet sets, we provide a class of non-MSF wavelets which includes the one constructed by Vyas [Bull. Polish Acad. Sci. Math.57 (2009) 33–40]. Most of these non-MSF wavelets are found to be non-MRA.
Estilos ABNT, Harvard, Vancouver, APA, etc.
20

VYAS, APARNA, and RAJESHWARI DUBEY. "NON-MSF WAVELETS FROM SIX INTERVAL MSF WAVELETS." International Journal of Wavelets, Multiresolution and Information Processing 09, no. 03 (May 2011): 375–85. http://dx.doi.org/10.1142/s021969131100416x.

Texto completo da fonte
Resumo:
In this article, we obtain two classes of non-MSF wavelets by considering two different classes of six-interval wavelet sets provided by Arcozzi, Behera and Madan (J. Geom. Anal.13 (2003) 557–579). Out of these classes one is countable, the non-MSF wavelets of which are non-MRA and the other one is uncountable, the non-MSF wavelets of which are MRA. The set of all non-MSF MRA wavelets of the latter class is shown to be pathconnected.
Estilos ABNT, Harvard, Vancouver, APA, etc.
21

Gu, Qing, and Deguang Han. "Super-Wavelets and Decomposable Wavelet Frames." Journal of Fourier Analysis and Applications 11, no. 6 (November 1, 2005): 683–96. http://dx.doi.org/10.1007/s00041-005-5005-x.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
22

Ahmadi, H., G. Dumont, F. Sassani, and R. Tafreshi. "Performance of Informative Wavelets for Classification and Diagnosis of Machine Faults." International Journal of Wavelets, Multiresolution and Information Processing 01, no. 03 (September 2003): 275–89. http://dx.doi.org/10.1142/s0219691303000189.

Texto completo da fonte
Resumo:
This paper deals with an application of wavelets for feature extraction and classification of machine faults in a real-world machine data analysis environment. We have utilized informative wavelet algorithm to generate wavelets and subsequent coefficients that are used as feature variables for classification and diagnosis of machine faults. Informative wavelets are classes of functions generated from a given analyzing wavelet in a wavelet packet decomposition structure in which for the selection of best wavelets, concepts from information theory, i.e. mutual information and entropy are utilize
Estilos ABNT, Harvard, Vancouver, APA, etc.
23

HOU, YU. "A COMPACTLY SUPPORTED, SYMMETRICAL AND QUASI-ORTHOGONAL WAVELET." International Journal of Wavelets, Multiresolution and Information Processing 08, no. 06 (November 2010): 931–40. http://dx.doi.org/10.1142/s0219691310003900.

Texto completo da fonte
Resumo:
Based on the wavelet theory and optimization method, a class of single wavelets with compact support, symmetry and quasi-orthogonality are designed and constructed. Some mathematical properties of the wavelets, such as orthogonality, linear phase property and vanishing moments and so on, are studied. A speech compression experiment is implemented in order to investigate the performance of signal reconstruction and speech compression for the proposed wavelets. Comparison with some conventional wavelets shows that the proposed wavelets have a very good performance of signal reconstruction and sp
Estilos ABNT, Harvard, Vancouver, APA, etc.
24

Singh, Ashok Kumar, and Hemant Bhate. "Stochastic wavelets from minimizers of an uncertainty principle: An example." International Journal of Wavelets, Multiresolution and Information Processing 18, no. 06 (July 31, 2020): 2050046. http://dx.doi.org/10.1142/s0219691320500460.

Texto completo da fonte
Resumo:
This paper proposes a method through which a family of wavelets can be obtained. This is done by choosing each member based on a random variable. The method is preferred in situations where a single mother wavelet proves inadequate and an evolving sequence of mother wavelets is needed but a priori the next member in the sequence is uncertain. The adopted approach is distinct from the way spatiotemporal wavelets are used or even the way stochastic processes have been studied using spatiotemporal wavelets.
Estilos ABNT, Harvard, Vancouver, APA, etc.
25

HUANG, YONGDONG, and ZHENGXING CHENG. "PARAMETRIZATION OF COMPACTLY SUPPORTED TRIVARIATE ORTHOGONAL WAVELET FILTER." International Journal of Wavelets, Multiresolution and Information Processing 05, no. 04 (July 2007): 627–39. http://dx.doi.org/10.1142/s0219691307001938.

Texto completo da fonte
Resumo:
Multivariate wavelets analysis is a powerful tool for multi-dimensional signal processing, but tensor product wavelets have a number of drawbacks. In this paper, we give an algorithm of parametric representation compactly supported trivariate orthogonal wavelet filter, which simplifies the study of trivariate orthogonal wavelet. Four examples are also given to demonstrate the method.
Estilos ABNT, Harvard, Vancouver, APA, etc.
26

ZENG, LI, RUI MA, JIANYUAN HUANG, and P. R. HUNZIKER. "THE CONSTRUCTION OF 2D ROTATIONALLY INVARIANT WAVELETS AND THEIR APPLICATION IN IMAGE EDGE DETECTION." International Journal of Wavelets, Multiresolution and Information Processing 06, no. 01 (January 2008): 65–82. http://dx.doi.org/10.1142/s0219691308002227.

Texto completo da fonte
Resumo:
Construction of rotationally invariant 2D wavelets is important in image processing, but is difficult. In this paper, the discrete form of a 2D rotationally invariant wavelet is constructed by back-projection from a 1D symmetrical wavelet. Such rotationally invariant 2D wavelets allow effective edge detection in any direction. These wavelets are combined with the 2D directional wavelets for the use in non-maximum suppression edge detection. The resulting binary edges are characterized by finer contours, differential detection characteristics and noise robustness compared to other edge detector
Estilos ABNT, Harvard, Vancouver, APA, etc.
27

TÜRÜKI, TURGHUNJAN ABDUKIRIM, MUHAMMAD HUSSAIN, KOICHI NIIJIMA, and SHIGERU TAKANO. "THE DYADIC LIFTING SCHEMES AND THE DENOISING OF DIGITAL IMAGES." International Journal of Wavelets, Multiresolution and Information Processing 06, no. 03 (May 2008): 331–51. http://dx.doi.org/10.1142/s0219691308002380.

Texto completo da fonte
Resumo:
The dyadic lifting schemes, which generalize Sweldens lifting schemes, have been proposed for custom-design of dyadic and bi-orthogonal wavelets and their duals. Starting with dyadic wavelets and exploiting the control provided in the form of free parameters, one can custom-design dyadic as well as bi-orthogonal wavelets adapted to a particular application. To validate the usefulness of the schemes, two construction methods have been proposed for designing dyadic wavelet filters with higher number of vanishing moments; using these design techniques, spline dyadic wavelet filters have been cust
Estilos ABNT, Harvard, Vancouver, APA, etc.
28

Jurado, F., and S. Lopez. "A wavelet neural control scheme for a quadrotor unmanned aerial vehicle." Philosophical Transactions of the Royal Society A: Mathematical, Physical and Engineering Sciences 376, no. 2126 (July 9, 2018): 20170248. http://dx.doi.org/10.1098/rsta.2017.0248.

Texto completo da fonte
Resumo:
Wavelets are designed to have compact support in both time and frequency, giving them the ability to represent a signal in the two-dimensional time–frequency plane. The Gaussian, the Mexican hat and the Morlet wavelets are crude wavelets that can be used only in continuous decomposition. The Morlet wavelet is complex-valued and suitable for feature extraction using the continuous wavelet transform. Continuous wavelets are favoured when high temporal and spectral resolution is required at all scales. In this paper, considering the properties from the Morlet wavelet and based on the structure of
Estilos ABNT, Harvard, Vancouver, APA, etc.
29

BHATT, GHANSHYAM, and FRITZ KEINERT. "COMPLETION OF MULTIVARIATE WAVELETS." International Journal of Wavelets, Multiresolution and Information Processing 05, no. 03 (May 2007): 485–500. http://dx.doi.org/10.1142/s0219691307001860.

Texto completo da fonte
Resumo:
The construction of wavelet functions from known scaling functions is called the 'completion problem'. Completion algorithms exist for univariate wavelets, including multiwavelets. For multivariate wavelets, however, completion is not always possible. We present a new algorithm (a generalization of a method of Lai) which works in many cases.
Estilos ABNT, Harvard, Vancouver, APA, etc.
30

Heinlein, Peter. "Discretizing continuous wavelet transforms using integrated wavelets." Applied and Computational Harmonic Analysis 14, no. 3 (May 2003): 238–56. http://dx.doi.org/10.1016/s1063-5203(03)00005-8.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
31

JIANG, YINGCHUN, and YOUMING LIU. "INTERPOLATORY CURL-FREE WAVELETS AND APPLICATIONS." International Journal of Wavelets, Multiresolution and Information Processing 05, no. 05 (September 2007): 843–58. http://dx.doi.org/10.1142/s0219691307002075.

Texto completo da fonte
Resumo:
Divergence-free and curl-free vector wavelets have many applications for the analysis and numerical simulation of incompressible flows and certain electromagnetic phenomena. Because special domains are required in those applications, Bittner and Urban constructed interpolating divergence-free multi-wavelets based on cubic Hermite splines in 2005. In this paper, we construct interpolating curl-free multi-wavelets and give two wavelet estimates for a class of vector Besov spaces.
Estilos ABNT, Harvard, Vancouver, APA, etc.
32

BAHRI, MAWARDI, and ECKHARD S. M. HITZER. "CLIFFORD ALGEBRA Cl3,0-VALUED WAVELET TRANSFORMATION, CLIFFORD WAVELET UNCERTAINTY INEQUALITY AND CLIFFORD GABOR WAVELETS." International Journal of Wavelets, Multiresolution and Information Processing 05, no. 06 (November 2007): 997–1019. http://dx.doi.org/10.1142/s0219691307002166.

Texto completo da fonte
Resumo:
In this paper, it is shown how continuous Clifford Cl3,0-valued admissible wavelets can be constructed using the similitude group SIM(3), a subgroup of the affine group of ℝ3. We express the admissibility condition in terms of a Cl3,0 Clifford Fourier transform and then derive a set of important properties such as dilation, translation and rotation covariance, a reproducing kernel, and show how to invert the Clifford wavelet transform of multivector functions. We invent a generalized Clifford wavelet uncertainty principle. For scalar admissibility constant, it sets bounds of accuracy in multiv
Estilos ABNT, Harvard, Vancouver, APA, etc.
33

TODA, HIROSHI, ZHONG ZHANG, and TAKASHI IMAMURA. "PERFECT-TRANSLATION-INVARIANT CUSTOMIZABLE COMPLEX DISCRETE WAVELET TRANSFORM." International Journal of Wavelets, Multiresolution and Information Processing 11, no. 04 (July 2013): 1360003. http://dx.doi.org/10.1142/s0219691313600035.

Texto completo da fonte
Resumo:
The theorems, giving the condition of perfect translation invariance for discrete wavelet transforms, have already been proven. Based on these theorems, the dual-tree complex discrete wavelet transform, the 2-dimensional discrete wavelet transform, the complex wavelet packet transform, the variable-density complex discrete wavelet transform and the real-valued discrete wavelet transform, having perfect translation invariance, were proposed. However, their customizability of wavelets in the frequency domain is limited. In this paper, also based on these theorems, a new type of complex discrete
Estilos ABNT, Harvard, Vancouver, APA, etc.
34

Toda, Hiroshi, Zhong Zhang, and Takashi Imamura. "Practical design of perfect-translation-invariant real-valued discrete wavelet transform." International Journal of Wavelets, Multiresolution and Information Processing 12, no. 04 (July 2014): 1460005. http://dx.doi.org/10.1142/s0219691314600054.

Texto completo da fonte
Resumo:
The real-valued tight wavelet frame having perfect translation invariance (PTI) has already proposed. However, due to the irrational-number distances between wavelets, its calculation amount is very large. In this paper, based on the real-valued tight wavelet frame, a practical design of a real-valued discrete wavelet transform (DWT) having PTI is proposed. In this transform, all the distances between wavelets are multiples of 1/4, and its transform and inverse transform are calculated fast by decomposition and reconstruction algorithms at the sacrifice of a tight wavelet frame. However, the r
Estilos ABNT, Harvard, Vancouver, APA, etc.
35

Bhat, Mohd Younus. "Dual wavelets associated with nonuniform MRA." Tamkang Journal of Mathematics 50, no. 2 (June 30, 2018): 119–32. http://dx.doi.org/10.5556/j.tkjm.50.2019.2646.

Texto completo da fonte
Resumo:
A generalization of Mallats classical multiresolution analysis, based on thetheory of spectral pairs, was considered in two articles by Gabardo and Nashed. In thissetting, the associated translation set is no longer a discrete subgroup of R but a spectrumassociated with a certain one-dimensional spectral pair and the associated dilation is aneven positive integer related to the given spectral pair. In this paper, we construct dualwavelets which are associated with Nonuniform Multiresolution Analysis. We show thatif the translates of the scaling functions of two multiresolution analyses are bio
Estilos ABNT, Harvard, Vancouver, APA, etc.
36

Ouda, Eman Hassan. "Direct Method for Variational Problems Using Boubaker Wavelets." Ibn AL-Haitham Journal For Pure and Applied Sciences 36, no. 3 (July 20, 2023): 427–36. http://dx.doi.org/10.30526/36.3.3048.

Texto completo da fonte
Resumo:
The wavelets have many applications in engineering and the sciences, especially mathematics. Recently, in 2021, the wavelet Boubaker (WB) polynomials were used for the first time to study their properties and applications in detail. They were also utilized for solving the Lane-Emden equation. The aim of this paper is to show the truncated Wavelet Boubaker polynomials for solving variation problems. In this research, the direct method using wavelets Boubaker was presented for solving variational problems. The method reduces the problem into a set of linear algebraic equations. The fundamental i
Estilos ABNT, Harvard, Vancouver, APA, etc.
37

DeVore, Ronald A., and Bradley J. Lucier. "Wavelets." Acta Numerica 1 (January 1992): 1–56. http://dx.doi.org/10.1017/s0962492900002233.

Texto completo da fonte
Resumo:
The subject of ‘wavelets’ is expanding at such a tremendous rate that it is impossible to give, within these few pages, a complete introduction to all aspects of its theory. We hope, however, to allow the reader to become sufficiently acquainted with the subject to understand, in part, the enthusiasm of its proponents toward its potential application to various numerical problems. Furthermore, we hope that our exposition can guide the reader who wishes to make more serious excursions into the subject. Our viewpoint is biased by our experience in approximation theory and data compression; we wa
Estilos ABNT, Harvard, Vancouver, APA, etc.
38

Mittal, R. C., and Sapna Pandit. "Quasilinearized Scale-3 Haar wavelets-based algorithm for numerical simulation of fractional dynamical systems." Engineering Computations 35, no. 5 (July 2, 2018): 1907–31. http://dx.doi.org/10.1108/ec-09-2017-0347.

Texto completo da fonte
Resumo:
Purpose The main purpose of this work is to develop a novel algorithm based on Scale-3 Haar wavelets (S-3 HW) and quasilinearization for numerical simulation of dynamical system of ordinary differential equations. Design/methodology/approach The first step in the development of the algorithm is quasilinearization process to linearize the problem, and then Scale-3 Haar wavelets are used for space discretization. Finally, the obtained system is solved by Gauss elimination method. Findings Some numerical examples of fractional dynamical system are considered to check the accuracy of the algorithm
Estilos ABNT, Harvard, Vancouver, APA, etc.
39

Verma, Amit, and Diksha Tiwari. "On some computational aspects of Hermite & Haar wavelets on a class of nonlinear singular BVPs." Applicable Analysis and Discrete Mathematics, no. 00 (2021): 20. http://dx.doi.org/10.2298/aadm191123020v.

Texto completo da fonte
Resumo:
We propose a new class of SBVPs which deals with exothermic reactions. We also propose four computationally stable methods to solve singular nonlinear BVPs by using Hermite wavelet collocation which are coupled with Newton's quasilinearization and Newton-Raphson method. We compare the results which are obtained by using Hermite wavelets with the results obtained by using Haar wavelets. The efficiency of these methods are verified by applying these four methods on Lane-Emden equations. Convergence analysis is also presented.
Estilos ABNT, Harvard, Vancouver, APA, etc.
40

Liu, Youming, and Xiaochen Zeng. "Strong Lp convergence of wavelet deconvolution density estimators." Analysis and Applications 16, no. 02 (February 5, 2018): 183–208. http://dx.doi.org/10.1142/s0219530517500154.

Texto completo da fonte
Resumo:
Using compactly supported wavelets, Giné and Nickl [Uniform limit theorems for wavelet density estimators, Ann. Probab. 37(4) (2009) 1605–1646] obtain the optimal strong [Formula: see text] convergence rates of wavelet estimators for a fixed noise-free density function. They also study the same problem by spline wavelets [Adaptive estimation of a distribution function and its density in sup-norm loss by wavelet and spline projections, Bernoulli 16(4) (2010) 1137–1163]. This paper considers the strong [Formula: see text] convergence of wavelet deconvolution density estimators. We first show the
Estilos ABNT, Harvard, Vancouver, APA, etc.
41

Lone, Waseem, and Firdous Shah. "Special affine biorthogonal wavelets on R and logarithmic regression curves." Filomat 37, no. 19 (2023): 6289–306. http://dx.doi.org/10.2298/fil2319289l.

Texto completo da fonte
Resumo:
In the article ?Special affine multiresolution analysis and the construction of orthonormal wavelets in L2(R)?, [Appl Anal. 2022; D.O.I: 10.1080/00036811.2022.2030723], we introduced the notion of multiresolution analysis (MRA) in the realm of the special affine Fourier transform. In continuation to the study, our aim is to present the construction of special affine biorthogonal wavelets in L2(R). Besides, we provide a complete characterization for the biorthogonality of the translates of the scaling functions of two special affine MRA?s and the associated special affine biorthogonal wavelet f
Estilos ABNT, Harvard, Vancouver, APA, etc.
42

Ďuriš, Viliam, Vladimir I. Semenov, and Sergey G. Chumarov. "Wavelets and digital filters designed and synthesized in the time and frequency domains." Mathematical Biosciences and Engineering 19, no. 3 (2022): 3056–68. http://dx.doi.org/10.3934/mbe.2022141.

Texto completo da fonte
Resumo:
<abstract> <p>The relevance of the problem under study is due to the fact that the comparison is made for wavelets constructed in the time and frequency domains. The wavelets constructed in the time domain include all discrete wavelets, as well as continuous wavelets based on derivatives of the Gaussian function. This article discusses the possibility of implementing algorithms for multiscale analysis of one-dimensional and two-dimensional signals with the above-mentioned wavelets and wavelets constructed in the frequency domain. In contrast to the discrete wavelet transform (Malla
Estilos ABNT, Harvard, Vancouver, APA, etc.
43

Cattani, Carlo, and Luis M. Sánchez Ruiz. "Discrete differential operators in multidimensional Haar wavelet spaces." International Journal of Mathematics and Mathematical Sciences 2004, no. 44 (2004): 2347–55. http://dx.doi.org/10.1155/s0161171204307234.

Texto completo da fonte
Resumo:
We consider a class of discrete differential operators acting on multidimensional Haar wavelet basis with the aim of finding wavelet approximate solutions of partial differential problems. Although these operators depend on the interpolating method used for the Haar wavelets regularization and the scale dimension space, they can be easily used to define the space of approximate wavelet solutions.
Estilos ABNT, Harvard, Vancouver, APA, etc.
44

Sahu, P. K., and S. Saha Ray. "A New Bernoulli Wavelet Method for Numerical Solutions of Nonlinear Weakly Singular Volterra Integro-Differential Equations." International Journal of Computational Methods 14, no. 03 (April 13, 2017): 1750022. http://dx.doi.org/10.1142/s0219876217500220.

Texto completo da fonte
Resumo:
In this paper, Bernoulli wavelet method has been developed to solve nonlinear weakly singular Volterra integro-differential equations. Bernoulli wavelets are generated by dilation and translation of Bernoulli polynomials. The properties of Bernoulli wavelets and Bernoulli polynomials are first presented. The present wavelet method reduces these integral equations to a system of nonlinear algebraic equations and again these algebraic systems have been solved numerically by Newton’s method. Convergence analysis of the present method has been discussed in this paper. Some illustrative examples ha
Estilos ABNT, Harvard, Vancouver, APA, etc.
45

Abeyratne, M. K., W. Freeden, and C. Mayer. "Multiscale deformation analysis by Cauchy-Navier wavelets." Journal of Applied Mathematics 2003, no. 12 (2003): 605–45. http://dx.doi.org/10.1155/s1110757x03206033.

Texto completo da fonte
Resumo:
A geoscientifically relevant wavelet approach is established for the classical (inner) displacement problem corresponding to a regular surface (such as sphere, ellipsoid, and actual earth surface). Basic tools are the limit and jump relations of (linear) elastostatics. Scaling functions and wavelets are formulated within the framework of the vectorial Cauchy-Navier equation. Based on appropriate numerical integration rules, a pyramid scheme is developed providing fast wavelet transform (FWT). Finally, multiscale deformation analysis is investigated numerically for the case of a spherical bound
Estilos ABNT, Harvard, Vancouver, APA, etc.
46

Shumilov, Boris M. "Construction of an Effective Preconditioner for the Even-odd Splitting of Cubic Spline Wavelets." WSEAS TRANSACTIONS ON MATHEMATICS 20 (December 28, 2021): 717–28. http://dx.doi.org/10.37394/23206.2021.20.76.

Texto completo da fonte
Resumo:
In this study, the method for decomposing splines of degree m and smoothness C^m-1 into a series of wavelets with zero moments is investigated. The system of linear algebraic equations connecting the coefficients of the spline expansion on the initial scale with the spline coefficients and wavelet coefficients on the embedded scale is obtained. The originality consists in the application of some preconditioner that reduces the system to a simpler band system of equations. Examples of applying the method to the cases of first-degree spline wavelets with two first zero moments and cubic spline w
Estilos ABNT, Harvard, Vancouver, APA, etc.
47

Cohen, Albert, Ingrid Daubechies, and Pierre Vial. "Wavelets on the Interval and Fast Wavelet Transforms." Applied and Computational Harmonic Analysis 1, no. 1 (December 1993): 54–81. http://dx.doi.org/10.1006/acha.1993.1005.

Texto completo da fonte
Estilos ABNT, Harvard, Vancouver, APA, etc.
48

Izuki, Mitsuo. "Wavelets and Modular Inequalities in Variable 𝐿𝑝 Spaces". gmj 15, № 2 (червень 2008): 281–93. http://dx.doi.org/10.1515/gmj.2008.281.

Texto completo da fonte
Resumo:
Abstract The aim of this paper is to characterize variable 𝐿𝑝 spaces 𝐿𝑝(·)() using wavelets with proper smoothness and decay. We obtain conditions for the wavelet characterizations of 𝐿𝑝(·)() with respect to the norm estimates and modular inequalities.
Estilos ABNT, Harvard, Vancouver, APA, etc.
49

MAHARAJ, ELIZABETH ANN. "USING WAVELETS TO COMPARE TIME SERIES PATTERNS." International Journal of Wavelets, Multiresolution and Information Processing 03, no. 04 (December 2005): 511–21. http://dx.doi.org/10.1142/s0219691305000993.

Texto completo da fonte
Resumo:
In this paper, a procedure for comparing the patterns of time series using wavelets is developed. Randomization tests based on the ratio of the sum of squared wavelet coefficients of pairs of time series at different scales are used. A simulation study using pairs of different types of time series using the Haar and Daubechies wavelets is carried out. The results reveal that the tests perform fairly well at scales where there are a sufficient number of wavelet coefficients. The tests are applied to a set of financial time series.
Estilos ABNT, Harvard, Vancouver, APA, etc.
50

EHLER, MARTIN. "COMPACTLY SUPPORTED MULTIVARIATE, PAIRS OF DUAL WAVELET FRAMES OBTAINED BY CONVOLUTION." International Journal of Wavelets, Multiresolution and Information Processing 06, no. 02 (March 2008): 183–208. http://dx.doi.org/10.1142/s0219691308002306.

Texto completo da fonte
Resumo:
In this paper, we present a construction of compactly supported multivariate pairs of dual wavelet frames. The approach is based on the convolution of two refinable distributions. We obtain smooth wavelets with any preassigned number of vanishing moments. Their underlying refinable function is fundamental. In the examples, we obtain symmetric wavelets with small support from optimal refinable functions, i.e. the refinable function has minimal mask size with respect to smoothness and approximation order of its generated multiresolution analysis. The wavelet system has maximal approximation orde
Estilos ABNT, Harvard, Vancouver, APA, etc.
Você também pode estar interessado em listas de outros tipos de fontes sobre o assunto "Wavelets (Mathematics)":
Teses / dissertações Livros
Oferecemos descontos em todos os planos premium para autores cujas obras estão incluídas em seleções literárias temáticas. Contate-nos para obter um código promocional único!

Vá para a bibliografia