61. University Of Padova: Massimo Fornasier Home-Page 2002 2004. Scientific interests abstract and Numerical harmonic analysis. Functionalanalysis. Approximation theory, signal analysis and image processing. http://www.math.unipd.it/~mfornasi/

MASSIMO FORNASIER Lo sabes, ... Hay mas necesidad de santos que de heroes My most used links: Mathematics library at Dept. Maths UniPD NuHAG - Numerical Harmonic Analysis Group Wavelet Digest revival Amazon: book seller ... Interesting links Name : Massimo Fornasier Position : Fellowship at the Dept. Math. University of Vienna Subject : Numerical Harmonic Analysis University : Padova Department : Matematica Pura ed Applicata Address : Via Belzoni, 7 City : 35131 Padova - ITALY Telephone : Fax : e-mail : fornasier@math.unipd.it Academic experience: Scientific prize scholarship working at Progetto Mantegna, University of Padova, 1998-1999 Laurea in Mathematics, University of Padova, 1999. Exercises lecturer of Mathematical Analysis, Facolta' di Ingegneria, University of Padova, 1999. PhD student, Dottorato in Matematica Computazionale, University of Padova, 1999-2002 Fellowship at NuHAG (Numerical Harmonic Analysis Group), Dept. Maths., University of Vienna, Austria, Nov. 2002 -2004 Scientific interests: Abstract and Numerical Harmonic Analysis Functional Analysis Approximation theory, signal analysis and image processing

62. Harmonic Analysis Literature Notes, or possibly Gerald B. Folland, A Course in abstract HarmonicAnalysis, CRC PRESS. Boca Raton, Ann Arbor, London, Tokyo 1995. http://www.imf.au.dk/Mathematics/education/F2001/courses2/node21.html

Next: Complex manifolds Up: C courses - introductory Previous: The arithmetic of elliptic Harmonic analysis 3-4 hours of lectures and seminars per week. Lecturer: Henrik Stetk r Content: Harmonic analysis is analysis of functions defined on a group G , where the analysis is done with due respect to the underlying group structure. The group structure comes into play, because the functions will be written as a superposition of the continuous group characters. So group characters will be our fundamental building blocks. If G R , +) or T (the circle group), then these building blocks are the exponential functions exp , and exp , and so the harmonic analysis becomes the classical Fourier analysis. We shall start the course by proving uniqueness and existence of the so-called Haar measure on locally compact groups. This measure plays the role for general groups that the Lebesgue measure plays for the special case of the group R . By help of the Haar measure we shall make a detailed analysis of functions on two special types of groups, namely abelian groups and compact groups. The latter type will show that characters do not suffice, which leads us further to the theory of representations of groups and *-algebras on Hilbert spaces. Prerequisites: Corresponding to the course Analysis II from the Fall term 2000.

63. LogEc: Access Statistics For Harmonic Analysis: The Aplication Of ‘Theoretical for the journal article harmonic analysis The Aplication of Cycles’ to the Economicanalysis Portillo Pérez of Economic Cycles Read abstract and download http://logec.hhs.se/scripts/paperstat.pl?h=repec:rec:cycles:v:2:y:2001:i:1_1

64. Citations: Abstract Harmonic Analysis - Hewitt, Ross (ResearchIndex) Similar pages DC MetaData forharmonic analysis on Discrete Generalized harmonic analysis on Discrete Generalized Hypergroups. abstract A concept of discretegeneralized hypergroups is developped and discussed in the context of http://citeseer.nj.nec.com/context/25758/0

52 citations found. Retrieving documents... E.Hewitt, K.A.Ross, Abstract harmonic analysis , vol. I, Springer-Verlag, Berlin etc., 1963. Home/Search Document Not in Database Summary Related Articles Check This paper is cited in the following contexts: First 50 documents Next 50 Harmonic Analysis On Totally Disconnected Groups And.. - Skriganov (2002) (Correct) ....of the Cantor type group Z p = fZ p g ; 1.1) which is the full direct product of countably many copies of the additive cyclic group Z p of order p 2. In particular, U 2 is known as the diadic Cantor group. A detailed study of totally disconnected groups can be found in Hewitt and Ross [HR] The group of characters for U p is isomorphic to a discrete countable group p , the product of d copies of the weak direct product Y Z p : 1.2) Furthermore, the characters of the group U p can be identified with the Walsh functions in base p. See Golubov et al. GES] and Schipp et .... ....purposess of the present paper we have selected the simplest form of possible explicit constructions. 4. Harmonic Analysis on the Cantor type Groups In this section, we shall briefly discuss basic concepts and facts on harmonic analysis on the group U p .

65. SIAG OP-SF Summer School 2001 courses in advanced research topics on orthogonal polynomials, harmonic analysis,approximation and own results to send us as soon as possible the abstract. http://www.gsf.de/ibb/homepages/forsterb/Summerschool/

To the SIAM Homepage The SIAM Activity Group on Orthogonal Polynomials and Special Functions invites to the To the SIAG OP-SF Homepage Summer School on Orthogonal Polynomials, Harmonic Analysis, Approximation and Applications September 17 - 21, 2001 at Inzell, Germany Third Announcement General Information Lecturers Scientific Program List of Participants ... Photos General Information The SIAM Activity Group (SIAG) on Orthogonal Polynomials and Special Functions organizes a series of summer schools. The first of this series was the school in Laredo, Spain, in 2000. This year we kindly invite You to Inzell, Germany, in the Alps southeast of Munich. It is planed to continue the series in 2002 in Leuven, Belgium ( contact Erik Koelink ), and 2003 in Aveiro, Portugal ( contact Amilcar Branquinho The goal of the Summer School is to give four introductory courses in advanced research topics on orthogonal polynomials, harmonic analysis, approximation and applications. Some free discussions and some informal seminars will also be available. The expected audience are graduate and recent postgraduate students as well as young active researchers. The topics to be considered will be: Orthogonal Polynomials

66. Applications Of Noncommutative Harmonic Analysis of Noncommutative harmonic analysis in Robot Kinematics and Image Processing GregoryS. Chirikjian Assistant Professor Johns Hopkins University abstract http://www.galaxy.gmu.edu/stats/colloquia/colljan31.html

Applications of Noncommutative Harmonic Analysis in Robot Kinematics and Image Processing Gregory S. Chirikjian Assistant Professor Johns Hopkins University ABSTRACT In this talk, it will be shown how the convolution product and fourier transform of functions on the group of rigid-body motions can be used in robotics and image processing. In robotics, these tools are used to determine the positions and orientations that a robot arm can reach. In image analysis, these same mathematical techniques have applications in template matching and target recognition. Numerical approximations of the convolution product are discussed, as well as inverse problems which are naturally addressed using techniques from non-Abelian harmonic analysis. Biography Dr. Greg Chirikjian is an assistant professor of mechanical engineering (with a joint appointment in computer science) at the Johns Hopkins University. He started the robotics program at JHU in 1992. In 1993 he was chosen to be an NSF Young Investigator, and in 1994 he was named an NSF Presidential Faculty Fellow. His interests are in robot kinematics and motion planning, image analysis, inverse problems, and applications of group theory in engineering.

67. Publication List Of Bin Han and Zuowei Shen, Framelets MRAbased constructions of wavelet frames, Applied andComputational harmonic analysis , to appear, (2001), abstract, PS, Journal http://www.ualberta.ca/~bhan/publ.htm

Bin Han's Publication List Address Teaching Research Publication ... Email Me Check [ Software ] for maple routines and C programs to construct pairs of dual wavelet frames, to implement the CBC algorithms, to compute smoothness of refinable functions using symmetry. Recent Preprints Bin Han and Qun Mo, Splitting a matrix of Laurent polynomials with symmetry and its application to symmetric framelet filter banks. Abstract PS PDF Dao-Qing Dai, Bin Han, Rong-Qing Jia, Galerkin analysis for schroedinger equation by wavelets Abstract PS PDF Bin Han, Vector cascade algorithms and refinable function vectors in Sobolev spaces Abstract PS PDF Bin Han, Thomas P.-Y. Yu, and Bruce Piper, Multivariate refinable Hermite interpolants Abstract PS PDF Bin Han, Symmetric real-valued orthonormal scaling functions with compact support in L_2(R^s) Abstract PS PDF (Revised) Ingrid Daubechies and Bin Han, Pairs of dual wavelet frames from any two refinable functions Abstract PS PDF old version ... software Journal Papers Bin Han and Qun Mo, Tight wavelet frames generated by three symmetric B-spline functions with high vanishing moments Proceedings of the American Mathematical Society , to appear. [

68. DIMACS Workshop On Source Coding And Harmonic Analysis DIMACS Workshop on Source Coding and harmonic analysis. Authors are invited to submita 1page camera-ready abstract electronically to vivek@digitalfountain.com http://dimacs.rutgers.edu/Workshops/Modern/participation.html

DIMACS Workshop on Source Coding and Harmonic Analysis May 8 - 10, 2002 DIMACS Center, Rutgers University, Piscataway, NJ Organizers: Vivek Goyal , Digital Fountain, v.goyal@ieee.org Jelena Kovacevic , Bell Labs, jelena@bell-labs.com Presented under the auspices of the Special Year on Computational Information Theory and Coding. Call for Participation: Authors are invited to submit a 1-page camera-ready abstract electronically to vivek@digitalfountain.com . Postscript and PDF formats are acceptable. Suggested format (not required): - Use the IEEE Transactions style file, available online at: http://www.ieee.org/organizations/pubs/transactions/stylesheets.htm Previous: Announcement Next: Program Workshop Index DIMACS Homepage Contacting the Center Document last modified on January 28, 2002.

69. Small-Signal Harmonic Analysis Of Nonlinear Circuits 325343. Authors. Hannu Jokinen and Martti Valtonen. abstract. An approximateharmonic analysis method of nonlinear circuits is introduced. http://www.aplac.hut.fi/publications/ijcta-1995/main.html

Small-Signal Harmonic Analysis of Nonlinear Circuits Paper in International Journal of Circuit Theory and Applications August 1995, Vol 23, pp. 325-343 Authors Hannu Jokinen and Martti Valtonen Abstract An approximate harmonic analysis method of nonlinear circuits is introduced. The method solves the steady-state time-domain representation as well as the frequency response of nonlinear circuits. It allows simulation of nonideal switched capacitor circuits composed of any kinds of linear components and nonlinear transistors as switches. All switches must have the same period, but they can be opened and closed at any time. The method proposed may also be applied to mixer analysis for the case of strong LO and weak RF signal. Examples are given to demonstrate that the method is efficient and sufficiently fast to be used in circuit design. The simulation results show good agreement with those obtained by harmonic balance and transient analysis. Other publications webmaster@www.aplac.hut.fi

70. Small-Signal Harmonic Analysis Of Nonlinear Circuits Authors. Hannu Jokinen and Martti Valtonen. abstract. An approximateharmonic analysis method of nonlinear circuits is introduced. http://www.aplac.hut.fi/publications/ct-23/main.html

Small-Signal Harmonic Analysis of Nonlinear Circuits Circuit Theory Laboratory Report CT-23, January 1995 Authors Hannu Jokinen and Martti Valtonen Abstract An approximate harmonic analysis method of nonlinear circuits is introduced. The method solves the steady-state time-domain representation as well as the frequency response of nonlinear circuits. It allows simulation of nonideal switched capacitor circuits composed of any kinds of linear components and nonlinear transistors as switches. All switches must have the same period, but they can be opened and closed at any time. The method proposed may also be applied to mixer analysis for the case of strong LO and weak RF signal. Examples are given to demonstrate that the method is efficient and sufficiently fast to be used in circuit design. The simulation results show good agreement with those obtained by harmonic balance and transient analysis. Report in DVI format (the included PostScript pictures are missing) in PostScript format Other publications webmaster@www.aplac.hut.fi

71. Citation abstract In classical harmonic analysis, the tidal signal is modelled as the sumof a finite set of sinusoids at specific frequencies related to astronomical http://portal.acm.org/citation.cfm?id=607453&coll=portal&dl=ACM&CFID=11111111&CF

72. Thomas Wolff Abstract Some connections between harmonic analysis and combinatorial geometry.Thomas Wolff California Institute of Technology. I will discuss http://www.mth.msu.edu/Research/1997-8_Seminars/colloq/wolff-abstract.html

MSU Math Home Mathematics Research Colloquium, Fall 1997 Colloquium, Spring 1998 Some connections between harmonic analysis and combinatorial geometry Thomas Wolff California Institute of Technology I will discuss some situations where techniques from combinatorics can be used to prove L p estimates in harmonic analysis or conversely estimates familiar in L p harmonic analysis can be used in connection with geometrical problems - more specifically, aspects of recent work on the Kakeya problem, and joint work with M. Kolountzakis on the so-called Steinhaus tiling problem.

73. Metadaten Für Vector-valuedextentions Of Some Classical Theorems In Harmonic An Vectorvaluedextentions of some classical theorems in harmonic analysis Girardi,Maria Weis, Lutz facul_01; 34 abstract This paper surveys some recent results http://www.mathematik.uni-karlsruhe.de/~mathnet/MetaMaker/Preprint/About/facul_0

Vector-valuedextentions of some classical theorems in harmonic analysis Girardi, Maria Weis, Lutz Abstract This paper surveys some recent results on vector-valued Fourier multiplier theorems and pseudo differential operators, which have found important application in the theory of evolution equations. The approach used combines methods from Fourier analysis and the geometry of Banach spaces, such as R-boundedness. Primary MSC: 42B15 Multipliers, 46E40 Spaces of vector- and operator-valued functions, 46B09 Probabilistic methods in Banach space theory Secondary MSC: 46B20 Geometry and structure of normed linear spaces, 46E35 Sobolev spaces and other spaces of ``smooth'' functions, embedding theorems, trace theorems Keywords: R-boundedness, Mihlin multiplier theorem,pseudo differential operators,Fourier type, Littlewood-Paley decomposition, vector-valued Besov spaces Notes To appear: Analysis and Applications - ISAAC 2001, eds. H.G.W. Begehr, R.P. Gilbert, M.W.Wong. Kluwer, Dordrecht

74. Abstract Of Series Of Lectures BY Grigori Olshanski, Moscow abstract The model examples of big groups are theinfinite symmetric group and the What is harmonic analysis on a big group. http://w3rep.math.h.kyoto-u.ac.jp/project97/abstract_mini_workshop.html

Abstract of Series of Lectures Grigori Olshanski TITLE: Representations of big groups: combinatorial and probabilistic aspects BY: Grigori Olshanski, Moscow ABSTRACT: The model examples of big groups are the infinite symmetric group and the infinite-dimensional unitary group. The tentative plan of the talks is as follows: Introduction. Thoma's and Voiculescu's character formulas. Asymptotical theory of characters and spherical functions. Generalizations involving branching graphs with formal multiplicities of edges and multivariate orthogonal polynomials. What is harmonic analysis on a big group. Stochastic point processes (=measures on point configurations) arising in harmonic analysis and their correlation functions. The talks are based on joint works with A.Borodin, S.Kerov, A.Okounkov, and A.Vershik. EXPECTED NUMBER OF TALKS: 4 M. Eastwood Invariant Differential Operators on Homogeneous Spaces. Invariant Differential Operators in Conformal Geometry. Invariant Differential Operators and the Translation Principle. Each lecture would be for one hour (well 50 minutes allowing 10 minutes for questions) and here is an abstract for the whole series: An invariant linear differential operator on a homogeneous space G/P is a linear differential operator between homogeneous vector bundles invariant under the action of G. It is well-known that such operators correspond to homomorphisms of induced modules and, in many cases, this allows a classification. Of particular interest is the n-sphere under the action of SO(n+1,1) since this is the flat model of conformal differential geometry. In this case, there are close links between the G-invariant differential operators on the sphere and those differential operators on a general conformal manifold defined intrinsically by the geometry. The construction of these conformally invariant differential operators may often be achieved by variations on the Jantzen-Zuckerman translation principle.

75. Bernhard Krötz: Abstract Bernhard Krötz Holomorphic aspects of harmonic analysis on Riemanniansymmetric spaces abstract We will report on joint work http://www.und.edu/dept/math/mgc2002/abs/Kroetz.html

Holomorphic aspects of harmonic analysis on Riemannian symmetric spaces Abstract: We will report on joint work with Simon Gindikin and Robert Stanton. Web Site Information and Return Links Contact person: Larry Peterson E-mail: lawrence_peterson@und.nodak.edu Phone: (701) 777-4609 Date of most recent update: March 23, 2002 Midwest Geometry Conference North Dakota State University Home page University of North Dakota home page

76. Characterization Of Nodular Cast Iron Properties By Harmonic Analysis Of Eddy Cu abstract. Frequency domain evaluation of eddy current signals (harmonic analysis)in ferromagnetic materials has been introduced in the last years as an http://www.ndt.net/article/ecndt98/nuclear/245/245.htm

NDT.net - October 1998, Vol.3 No.10 Table of Contents ECNDT '98 Session: Nuclear Industry Characterization of Nodular Cast Iron Properties by Harmonic Analysis of Eddy Current Signals Feiste, K. L., Fetter Marques, P. , Reichert, Ch., Reimche, W., Stegemann,D. Institute of Nuclear Engeneering and Non-destructive Testing, University of Hanover Rebello, A. J. M. , Krüger, E. S. Laboratory of Non-destructive Testing - LABOEND/COPPE, Federal University of Rio de Janeiro Corresponding Author Contact: Ch.Reichert, Hannover Germany, Phone: ++49 511 762 8085, Fax: ++49 511 762 2741, nhkpreic@mbox.ikph.uni-hannover.de TABLE OF CONTENTS Abstract Introduction Materials and Methods Hysteresis loop and Harmonic Analysis ... References Abstract The main characteristics of the harmonic analysis system are the high measuring velocity and the high accuracy of measuring values which can be compared to destructive testing methods. Introduction Increasing quality requirements and low production costs demand additionally a quality assurance during the production of semifinished products. Due to this, the importance of process integrated non-destructive testing, which offers additionally the possibility of non-destructive material characterization, increased progressively the last years. Mechanical properties of casted iron result from influencing parameters like the graphite form and the microstrucure of the material /1,2/ which is mainly influenced by the alloy composition and heat treatment.

77. Global Analysis Research Center Hayashimoto. AfterSchool. MiniBanquet. Titles of Talks. December 16th (Wednesday).Steven G. Krantz, harmonic analysis on domains in complex space I abstract. http://garc.snu.ac.kr/garc/seminar/web.html

The 3rd KSCV Symposium International Conference on Several Complex Variables December 16-19, 1998 Organizers Chong-Kyu Han (Seoul National U.), Chair Boo-Rim Choe (Korea U.) Sanghyun Cho (Sogang U.) Young-Bok Chung (Chonnam National U.) Kang-Tae Kim (Pohang U. of Science and Technology) Steven G. Krantz (Washington U. in St. Louis) Speakers Lev Aizenberg (Bar-Ilan U., Israel ) Peter Ebenfelt (Royal Institute of Technology, Sweden ) Atsushi Hayashimoto (Nagoya U., Japan) Jun-Muk Hwang (Seoul National U., Korea) Alexander V. Isaev (Australian National U., Australia) Kang-Tae Kim (Pohang U. of Science and Technology, Korea) Akio Kodama (Kanazawa U., Japan ) Steven G. Krantz (Washington U. in St. Louis, USA) Kimio Miyajima (Kagoshima U., Japan) Takeo Ohsawa (Nagoya U., Japan) Peter Pflug (U. of Oldenburg, Germany ) Website http://www.garc.snu.ac.kr e-mail ckhan@math.snu.ac.kr

78. Tatiana Toro's Talk Abstract Speaker, Tatiana Toro. Title, When harmonic analysis meets GeometricMeasure Theory. Date, February 22, 2001 345 PM Padelford C36. abstract, http://www.math.washington.edu/~chappa/cpm/winter01/abstracts/tatiana.html

Current Problems in Mathematics Speaker Tatiana Toro Title When Harmonic Analysis meets Geometric Measure Theory Date February 22, 2001 3:45 PM Padelford C-36 Abstract I will briefly describe how harmonic analysis, geometric measure theory and potential theory interact together to produce results concerning the regularity of free boundaries. The talk will be self contained and will not assume any previous knowledge of the field.

79. Special Analysis Seminar abstract harmonic maps are critical points of the energy functional in between manifolds themap have been a subject of intensive study in geometric analysis. http://www.math.princeton.edu/~seminar/oldseminar/11-11-weekly.html

Week of November 9 - 15, 1998 Presenter: Rafael Benguria, Catholic University, Santiago, Chile Presenter: Sun-Yung Alice Chang, Princeton University Abstract: Harmonic maps are critical points of the energy functional in between manifolds. Existence and regularity properties of the map have been a subject of intensive study in geometric analysis. A remarkable result of Helein in 1990 establishes that any weak harmonic map defined on a compact surface is already smooth. The original proof of Helein replies on a compensated compactness result of Coifman-Lions-Meyer-Semmes, which in turn is a consequence of duality of H^1 amd BMO. In this talk, I will survey results in the field, give a simplier proof of the result of Helein when the target manifold of the map is spheres and indicate the extension of the regularity results to bi-harmonic maps. Presenter: Alexander Barg, Bell Labs (Lucent Technologies) Abstract: This talk deals with a new application of Delsarte's linear programming method to obtaining lower bounds on invariants of codes related to their distance enumerator. The method proves useful in a variety of asymptotic problems of

80. Analysis In Quebec Complex and harmonic analysis, Operator Theory, jxiao@discrete.concordia.ca. S.Zaidman, UMontreal, Differential Equations (AlmostPeriodic, DE on abstract Spaces http://www.math.mcgill.ca/jakobson/analysish/analysis.html

Analysis in Quebec. Researchers in Analysis and Related Fields Name University Research Interests E-mail L. Baribeau Laval Complex Analysis, Banach Algebras, Complex Dynamics lbarib@mat.ulaval.ca J-M. Belley Sherbrooke Analysis jean-marc.belley@dmi.usherb.ca J.R. Choksi McGill Measure Theory, Ergodic Theory choksi@math.mcgill.ca G. Dafni Concordia Harmonic Analysis, PDE, Several Complex Variables gdafni@discrete.concordia.ca H. Darmon McGill Number Theory, Automorphic Forms, p-adic Analysis darmon@math.mcgill.ca J.M. De Koninck Laval Classical Number Theory jmdk@mat.ulaval.ca S. Drury McGill Harmonic Analysis, Matrix Theory drury@math.mcgill.ca S. Dubuc UMontreal Fractal Geometry, Geometric Modelling, Optimization dubucs@dms.umontreal.ca R. Duncan UMontreal Ergodic Theory, Probability duncanr@dms.umontreal.ca R. Fournier UMontreal Complex Analysis, Univalent Functions, Inequalities fournier@dms.umontreal.ca M. Frigon UMontreal Nonlinear Analysis, Critical Point Theory, Fixed Point Theory, Differential Equations and Inclusions frigon@dms.umontreal.ca M. Gander McGill Applied Mathematics, Numerical Analysis

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