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         Operator Theory:     more books (100)
  1. A Glimpse at Hilbert Space Operators: Paul R. Halmos in Memoriam (Operator Theory: Advances and Applications)
  2. Partial Differential Equations VII: Spectral Theory of Differential Operators (Encyclopaedia of Mathematical Sciences)
  3. The Analysis of Linear Partial Differential Operators I: Distribution Theory and Fourier Analysis (Classics in Mathematics) (Pt.1) by Lars Hörmander, 2003-08-13
  4. Fixed Point Theory (Springer Monographs in Mathematics) by Andrzej Granas, James Dugundji, 2010-11-02
  5. Partial Differential Equations and Spectral Theory (Operator Theory: Advances and Applications / Advances in Partial Differential Equations)
  6. Theory and Applications of Nonlinear Operators of Accretive and Monotone Type (Lecture Notes in Pure and Applied Mathematics)
  7. K-Theory for Operator Algebras (Mathematical Sciences Research Institute Publications) by Bruce Blackadar, 1998-09-13
  8. Spectral Theory and Differential Operators (Cambridge Studies in Advanced Mathematics) by Davies E. Brian, 1996-11-28
  9. Applications of Functional Analysis and Operator Theory, Volume 200, Second Edition (Mathematics in Science and Engineering) by V. Hutson, J. Pym, et all 2005-04-22
  10. Methods of Spectral Analysis in Mathematical Physics: Conference on Operator Theory, Analysis and Mathematical Physics (OTAMP) 2006, Lund, Sweden (Operator Theory: Advances and Applications)
  11. Fundamentals of the Theory of Operator Algebras, Vol. 1: Elementary Theory (Pure and Applied Mathematics) by Richard V. Kadison, John R. Ringrose, 1983-05-12
  12. Spectral Theory of Random Schrödinger Operators (Probability and its Applications) by R. Carmona, J. Lacroix, 1990-01-01
  13. Introduction to Spectral Theory: With Applications to Schrödinger Operators (Applied Mathematical Sciences) by P.D. Hislop, I.M. Sigal, 1995-11-16
  14. Operator Theory, Systems Theory and Scattering Theory: Multidimensional Generalizations (Operator Theory: Advances and Applications)

41. 2.1. Operator Theory And Applications
2.1. operator theory and Applications. Ph.D. Theses. J. KOS, Time dependentproblems in linear operator theory, 1995, Free University Amsterdam.
http://www.math.leidenuniv.nl/~stieltjes/archief/biennial9596/frame/node79.html
Next: 2.2. Lie GroupsSpecial Up: Analysis Previous: Analysis
2.1. Operator Theory and Applications
Papers in journals and proceedings J.-B. B AILLON , P H . C L EMENT , A. G REVEN , F. DEN H OLLANDER , On the attracting orbit of a non-linear transformation arising from renormalization of hierarchically interacting diffusions. I. The compact case, Canad. J. Math. , Vol 47 1995, 3-27. J.A. B ALL , I. G OHBERG AND M.A. K AASHOEK , Input-output operators of J -unitary time-varying continuous time systems, in: Operator Theory in functions spaces and Banach lattices J.A. B ALL , I. G OHBERG AND M.A. K AASHOEK , Two-sided Nudelman interpolation for input-output operators of discrete time-varying system, Integral Equations and Operator Theory , vol 21 1995, 174-211. J.A. B ALL , I. G OHBERG AND M.A. K AASHOEK , A frequency response function for linear time-varying systems, Math Control Signals Systems , vol 8 1995, 334-351. J.A. B ALL , I. G OHBERG AND M.A. K AASHOEK , The band method and Grassmannian approach for completion and extension problems, in: Recent developments in operator theory and its applications H. B

42. Stieltjes Courses And Activities - Operator Theory And Evolutionary Systems
Thomas Stieltjes Institute for Mathematics. operator theory and Applications.Courses and Activities in 2000/2001. Stieltjes Analyse
http://www.math.leidenuniv.nl/~verduyn/stieltjes_operatortheory/
Thomas Stieltjes Institute for Mathematics
Operator Theory and Applications
Courses and Activities in 2000/2001
  • Stieltjes Analyse Colloquium
    • organizers: S.M. Verduyn Lunel
    • location: Universiteit Leiden (during 2000)
    • period: three times a year. The meeting are on Thursday June 8, September 28 and December 7, 2000.
  • Stieltjesonderwijsweek - Stochastische differentiaalvergelijkingen
    • organizers: P. Clement, B. de Pagter, O. van Gaans, J. van Neerven, S. Verduyn Lunel
    • location: Lorentz Center (February 19 Februari 23)
    • period: one week of courses.
  • Regularity Theory for Elliptic Partial Differential Equations (course)
    • lecturers: Ph. Clement and E. Koelink, various lectures
    • location: Technische Universiteit Delft
    • period: biweekly on Monday 14-17, starting September 11, 2000.
  • Seminarium Analyse en Operatorentheorie
    • organizers: A.C.M. Ran
    • location: Vrije Universiteit
    • period: weekly on Thursday morning at 9.15
  • Stochastic Differential Equations in Hilbert Space (course)
    • lecturer: Ph. Clement
    • location: Technische Universiteit Delft
    • period: January May 2000
  • Fundamental Issues of Nonlinear Laser Dynamics
    • organizers: Daan Lentra and Bernd Krauskopf
    • location: Texel
    • period: April 1619, 2000.
  • 43. CM2414   -   Operator TheoryCMMS08     Operator Theory    
    CMMS08 operator theory. CM2414 operator theory. Semester 1.
    http://www.mth.kcl.ac.uk/courses/cmms08.html
    CMMS08 Operator Theory CM2414 Operator Theory
    Semester 1
    Lecturer: Dr J A Erdos
    Information Sheet Course Notes Summer 2002 Examination ... Edit this page [Return to: List of courses Dept. home page , or the College home page

    44. CM2414/MS08 OPERATOR THEORY
    CM2414/CMMS08 operator theory. Lecturer Dr. JA Erdos. Room 416. I.Gohberg and S. Goldberg, Basic operator theory, Birkhauser 1981.
    http://www.mth.kcl.ac.uk/courses/cmms08/2414.htm
    CM2414/CMMS08 OPERATOR THEORY Lecturer : Dr. J.A. Erdos Room : Office hours : Monday 12 – 1, Wednesday 11 – 12, Thursday 2 – 3. E-mail : john.erdos@kcl.ac.uk WWW material : via links from King’s Maths home page Other staff who you can consult on this course are : Professor Yuri Safarov (Room 417) and Dr. S.G. Scott (Room 409) Lecture times : Thursdays 12 to 2 in Room 436. (Informal tutorial Thursday 11 to 11.30 in Room 429) Prerequisites : CM321A and CM222A or equivalents (that is, a course in analysis using normed spaces and a course in linear algebra) Assessment : The courses will be assessed by two hour written examinations at the end of the academic year. Assignments : Exercise sheets will be given out. Solutions handed in will be marked and difficulties discussed in class. In addition, it is essential that students work through the theory as the course progresses. Course description : This course will introduce you to the terminolgy, notation and the basic results and concepts of Hilbert space. The goal is to establish one major theoretical result (the spectral theorem for compact selfadjoint operators) and demonstrate some applications. The realation of the subject with other branches of mathematics (Fourier analysis, complex functions, differential equations) will be indicated.

    45. A GENERALIZED COLLECTIVELY COMPACT OPERATOR THEORY WITH AN APPLICATION TO INTEGR
    A GENERALIZED COLLECTIVELY COMPACT operator theory WITH AN APPLICATIONTO INTEGRAL EQUATIONS ON UNBOUNDED DOMAINS. A GENERALIZED
    http://math.la.asu.edu/~rmmc/jie/Vol14-1/CHA/CHA.html
    A GENERALIZED COLLECTIVELY
    COMPACT OPERATOR THEORY
    WITH AN APPLICATION
    TO INTEGRAL EQUATIONS
    ON UNBOUNDED DOMAINS
    SIMON N. CHANDLER-WILDE AND BO ZHANG
    Abstract:
    In this paper a generalization of collectively compact operator theory in Banach spaces is developed. A feature of the new theory is that the operators involved are no longer required to be compact in the norm topology. Instead it is required that the image of a bounded set under the operator family is sequentially compact in a weaker topology. As an application, the theory developed is used to establish solvability results for a class of systems of second kind integral equations on unbounded domains, this class including in particular systems of Wiener-Hopf integral equations with convolutions kernels.

    46. Harmonic Analysis And Operator Theory Research Page
    HARMONIC ANALYSIS AND operator theory The following faculty are currently workingin areas related to harmonic analysis and the theory of operators.
    http://www.math.unc.edu/research/Harmonic/
    HARMONIC ANALYSIS AND OPERATOR THEORY
    The following faculty are currently working in areas related to harmonic analysis and the theory of operators. Idris Assani Norberto Kerzman Michael E. Taylor Warren R. Wogen ... Return to the research page. This page was created and is maintained by the Mathematics Department Webmaster

    47. Institut Für Mathematik - Research Group Operator Theory And Stochastic Spectra
    Research Group operator theory and Stochastic Spectral Analysis. Members. Prof. Address.Research Group operator theory and Stochastic Spektral Analysis Prof.
    http://www.math.tu-clausthal.de/Arbeitsgruppen/Operatortheorie/Welcome_en.html
    General Information Services Studies Research Groups ... Staff
    Research Group Operator Theory and Stochastic Spectral Analysis
    Members
    Prof. Dr. Michael Demuth
    Dr. Eckhard Giere

    cand. math. Michael Baro
    Address
    Research Group Operator Theory and Stochastic Spektral Analysis
    Prof. Dr. Michael Demuth
    Institute of Mathematics
    Clausthal University of Technology
    Erzstr. 1
    Clausthal-Zellerfeld
    Germany
    Tel.: ++49 5323 72-2411
    Fax: ++49 5323 72-3598
    e-mail: demuth@math.tu-clausthal.de
    What is Stochastic Spectral Analysis?
    Publications
    M. Demuth
    E. Giere Former members:
    S. Eder
    I. McGilliwray
    A. Noll

    W. Renger

    E. Teske
    Teaching
    Analysis III
    Analysis IV

    Funktionalanalysis
    Spektraltheorie
    Colloquium
    Colloquium Mathematical Physics
    Stellenausschreibung in der Arbeitsgruppe
    Workshop
    PDE 2000, 24.-28. July 2000, Clausthal Last Change: 20-Dec-2000 Administrator

    48. C*-Algebras And Operator Theory
    C*Algebras and operator theory. The book C*-Algebras and operator theoryby Gerard J. Murphy was published in 1990 by Academic Press.
    http://maths.ucc.ie/staff/murphyg/book.html

    49. Operator Theory In Unit Disk
    operator theory in the Unit Disk. operator theory related to Bergmanspaces was mainly developed in the late 1980's. The following
    http://math.albany.edu:8000/~kzhu/operator.html
    Operator Theory in the Unit Disk
    Operator theory related to Bergman spaces was mainly developed in the late 1980's. The following classes of operators are the most prominent examples: Toeplitz operators, Hankel operators, and composition operators. Zhu's book "Operator Theory in Function Spaces" describes the main achievements for that period. The following are several widely studied problems and results in these areas, some of which occured after Zhu's book.
    Toeplitz Operators
    It is easy to see that the only compact Toeplitz operator on the Hardy space is the zero operator, while there exist a lot of compact Toeplitz operators on the Bergman space. Thus the first natural problem here is to characterize the compact Toeplitz operators on the Bergman space. A satisfactory characterization in the general case is still lacking, but several important special cases are completely understood now. If the symbol function f is continuous on the maximal ideal space of H-infinity (this includes the case of continuous functions on the closed disk and bounded harmonic functions in the open disk), then it is simple to show that the corresponding Toeplitz operator on the Bergman space is compact if and only if f uniformly vanishes on the boundary. If the symbol function f is nonnegative, then the compactness (and more generally membership in Schatten classes) of Toeplitz operators was characterized by Luecking

    50. Springer LINK - Integral Equations And Operator Theory - About This Journal
    LINK, Forum Birkhäuser IEOT. Forum What's New Search Orders HelpdeskUp. Editorial Board; Aims Scope; Subscription Information; Instructions
    http://link.springer-ny.com/link/service/journals/00020/about.htm


    LINK Helpdesk

    Last update: 12.07.2001

    51. Springer LINK - Integral Equations And Operator Theory - Aims & Scope
    Integral Equations and operator theory (IEOT) appears monthly and is devoted to thepublication of current research in integral equations, operator theory and
    http://link.springer-ny.com/link/service/journals/00020/aims.htm
    Integral Equations and Operator Theory (IEOT) appears monthly and is devoted to the publication of current research in integral equations, operator theory and related topics with emphasis on the linear aspects of the theory. The journal reports on the full scope of current developments from abstract theory to numerical methods and applications to analysis, physics, mechanics, engineering and others. The journal consists of two sections: a main section consisting of refereed papers and a second consisting of short announcements of important results, open problems, information, etc. Abstracted/Indexed in:
    Bibliographic Data
    Integr. equ. oper. theory
    ISSN 0378-620X
    First published in 1978
    3 volumes per year, 4 issues per volume
    Format: 17 x 24 cm
    Back volumes are available
    e-mail: subscriptions@birkhauser.ch
    LINK Helpdesk

    Last update: 12.07.2001

    52. OPERATOR THEORY, SYSTEM THEORY AND SCATTERING THEORY: MULTIDIMENSIONAL GENERALIZ
    operator theory, SYSTEM THEORY AND SCATTERING THEORY MULTIDIMENSIONAL GENERALIZATIONS. Positivityplays an important role in the Hilbert space operator theory.
    http://www.cs.bgu.ac.il/~dany/abst3/abst3.html
    Next: About this document ...
    OPERATOR THEORY, SYSTEM THEORY AND SCATTERING THEORY: MULTIDIMENSIONAL GENERALIZATIONS
    Organizers: D. Alpay and V. Vinnikov
    Date: Ben-Gurion University of the Negev, Beer-Sheva
    truecm June 11 - 13, 2001 truecm ABSTRACTS
    Some finite dimensional backward shift invariant subspaces of the ball and related interpolation problems
    D. Alpay
    We solve Gleason's problem in the reproducing kernel Hilbert space with reproducing kernel . We define and study some finite-dimensional resolvent-invariant subspaces that generalize the finite-dimensional de Branges-Rovnyak spaces to the setting of the ball.
    A. Aytuna
    Let M be a Stein manifold and O(M) be space of analytic functions on M equipped with the the topology of uniform convergence on compact subsets of M. In the first part of talk I will look at these spaces from the nuclear Fre`chet space theory point of view and for certain M 's, identify the linear topological type of O(M). In the second part of the talk I will give some results along the theme " How much and what sort of information does O(M) carry about the complex analytic structure of M ? ". In the last part of the talk (if time permits) some applications of these considerations will be given. . Unitary colligations, Lax-Phillips scattering and operator model theory: the ball

    53. OPERATOR THEORY, SYSTEM THEORY AND SCATTERING THEORY: MULTIDIMENSIONAL GENERALIZ
    operator theory, SYSTEM THEORY AND SCATTERING THEORY MULTIDIMENSIONALGENERALIZATIONS. Organizers D. Alpay and V. Vinnikov. BenGurion
    http://www.cs.bgu.ac.il/~dany/prog3.html
    OPERATOR THEORY, SYSTEM THEORY AND SCATTERING THEORY: MULTIDIMENSIONAL GENERALIZATIONS
    Organizers: D. Alpay and V. Vinnikov
    Ben-Gurion University of the Negev, Beer-Sheva
    June 11 - 13, 2001
    PROGRAM
    Acknowledgments
    It is a pleasure to thank the Center for Advanced Studies in Mathematics of Ben-Gurion University and his director Dr. Amnon Besser for supporting the Conference. The visits of Professor Ball and Professor Pavlov were supported by the Binational Science Foundation and the Dozor fellowships program of the Faculty of Sciences of Ben-Gurion University respectively.
    We also take this opportunity to thank Prof. Beno Eckmann for his suggestion to establish the Center for Advanced Studies in Mathematics and to thank Mrs Lis Gaines for her supporting the project, her enthousiam, and her contribution.
    We thank Prof. Miriam Cohen, Dean of the Faculty of Natural Sciences, for her efforts and dedication to the establishment of the Center for Advanced Studies in Mathematics in our Faculty.
    Last but not least, it is a pleasure to thank the administrative staff of the department of mathematics and in particular its administrative coordinator Mrs Ann Finaly for their help in the organization of the conference.

    54. Operator Theory For Quantum Physics
    The following are some details of linear operator theory that may be useful tothe students of PHY 571 Quantum Physics. Linear operator theory Overview.
    http://venables.asu.edu/quant/huzhan/qm_web.html
    The following are some details of linear operator theory that may be useful to the students of PHY 571: Quantum Physics . Many of the rigorous mathematical details have been omitted in the interest of brevity, although some details are indicated. The connection between the operator methods and the matrix methods is outlined in this page. Specific matrix methods are outlined in another page, whose link will be placed here.
    Linear Operator Theory Overview
    All wave or state functions will be considered to be square integrable, unless otherwise indicated. They can also be differentiable, even if very sharp (e.g., the unit step is considered to have the delta function as its derivative.) An operator A is linear if for every complex number c and functions u and v A c u v c A u A v A linear space or subspace is a collection of functions such that for all complex numbers c and d and all functions u and v in the linear space, c u +d v is also in the space. Two functions are called orthogonal if their scalar product (also called the "inner product") is zero; i.e., The magnitude (or "size") of a wave function is the scalar product of the function with itself; i.e.

    55. Operator Theory Seminar
    operator theory Seminar. Thursday November 26, 1998. 7.30pm. MathematicsSeminar Room 2.6. Dr. John Gough (Maynooth) Quantum Stochastic
    http://www.maths.tcd.ie/pub/Seminars/archive.98-99/1998.11.26.ot.html
    Operator Theory Seminar
    Thursday November 26, 1998
    Mathematics Seminar Room 2.6 Dr. John Gough
    (Maynooth)
    Quantum Stochastic Flows and Completely Positive Maps
    Enquiries: Dr. D. P. O'Donovan Back to seminar listing Maintained by R. Timoney. Last changed 11/19/98 .

    56. Operator Theory Seminar
    operator theory Seminar. Thursday December 10, 1998. 7.30pm. Mathematics SeminarRoom 2.6. Richard Timoney Standard presentations of Von Neumann Algebras.
    http://www.maths.tcd.ie/pub/Seminars/archive.98-99/1998.12.10.ot.html
    Operator Theory Seminar
    Thursday December 10, 1998
    Mathematics Seminar Room 2.6 Richard Timoney
    Standard presentations of Von Neumann Algebras.
    Enquiries: Dr. D. P. O'Donovan Back to seminar listing Maintained by R. Timoney. Last changed 12/08/98 .

    57. AMCA: 18th International Conference On Operator Theory - List Of Speakers
    AMCA 18th International Conference on operator theory June 27 July1, 2000 University of the West Timisoara, Romania. Conference
    http://at.yorku.ca/c/a/e/o/01.htm
    Atlas Mathematical Conference Abstracts Conferences Abstracts Organizers ... About AMCA 18th International Conference on Operator Theory
    June 27 - July 1, 2000
    University of the West
    Timisoara, Romania Conference Organizers
    Dumitru Gaspar, Traian Ceausu, Aurelian Craciunescu, Aurelian Gheondea, Radu-Nicolae Gologan, Ciprian Pop, Dan Popovici, Nicolae Suciu, Alexandru Terescenco, Dan Timotin and Flavius Turcu
    Conference Homepage
    View Abstracts
    This is an archive of abstracts accepted to this conference. For more listing and sorting options, see the dynamic list. A. Abdollahi Finite codimensional invariant subspaces of analytic Lipschitz algebras
    Jim Agler
    Interpolation on domains in C^n
    Cristina Antonescu
    Properties of a new class of absolutely summing operators
    Aharon Atzmon
    The Existence of Translation Invariant Subspaces of Symmetric Self-Adjoint Sequence Spaces on Z
    Mihaly Bakonyi
    On Extensions of Positive Definite Operator-Valued Functions on Ordered Groups
    Edwin J. Beggs
    Maximal abelian subalgebras of Cuntz algebras Daniel Beltita Analytic joint spectral radius in a solvable Lie algebra of operators Chafiq Benhida From standard to non-standard perturbations of contractions Etienne Blanchard Non simple purely infinite C*-algebras Florin Boca Convergence of probability measures and the distribution of Farey points Laura Burlando Generalizations of Cesaro means and poles of the resolvent Gilles Cassier Generalized von Neumann inequalities and applications T. Ceausu

    58. AMCA: 19th Annual Great Plains Operator Theory Symposium - List Of Speakers
    About AMCA 19th Annual Great Plains operator theory Symposium May 2630,1999 Iowa State University Ames, Iowa, USA. Conference Organizers
    http://at.yorku.ca/c/a/c/w/01.htm
    Atlas Mathematical Conference Abstracts Conferences Abstracts Organizers ... About AMCA 19th Annual Great Plains Operator Theory Symposium
    May 26-30, 1999
    Iowa State University
    Ames, Iowa, USA Conference Organizers
    Justin Peters, Yiu Tung Poon and Bruce Wagner
    Conference Homepage
    View Abstracts
    This is an archive of abstracts accepted to this conference. For more listing and sorting options, see the dynamic list. Sriwulan Adji Primitive Ideal Space of Toeplitz Algebras of Totally Ordered Groups
    Mohamed R. Alaimia
    Some Semicrossed Products and their Automorphisms
    Michael Anshelevich
    Free Stochastic Measures via Noncrossing Partitions
    Martin Argerami
    Orbits of Conditional Expectations
    William Arveson
    Curvature in Multivariable Operator Theory
    William Arveson
    Eigenvalue Lists of Noncommutative Probability Distributions Andriy Blazhievskiy Fourier and Hankel Operators in Summation of Functional Series. Ola Bratteli Homogeneity of the Pure State Space of the Cuntz Algebra Berndt Brenken Representations of Cuntz-Krieger Algebras and Endomorphisms of Sums of Type I Factors Nathanial Brown Dynamical Entropy via Approximation Man-Duen Choi Dilations and Numerical Ranges Towards a Model Theory for 2-Hyponormal Operators Marius Dadarlat K-theory and Quasidiagonality Alfons Van Daele The Development of Locally Compact Quantum Groups Valentin Deaconu C*-algebras Associated with Branched Coverings Allan Donsig Semisimplicity and Semi-crossed Products Ronald G. Douglas

    59. Structured Matrices In Operator Theory, Numerical Analysis, Control, Signal And
    Structured Matrices in operator theory, Numerical Analysis, Control,Signal and Image Processing. next Next Introduction. Structured
    http://www.cs.gsu.edu/~matvro/500w/500w.html
    Next: Introduction
    Structured Matrices in Operator Theory, Numerical Analysis, Control, Signal and Image Processing

    Vadim Olshevsky
    Sun Sep 20 23:04:34 EDT 1998

    60. 31st Annual Canadian Operator Theory And Operator Algebras Symposium
    31st Annual Canadian operator theory and Operator Algebras Symposium. Month May2003 Name 31st Annual Canadian operator theory and Operator Algebras Symposium.
    http://www.ams.org/mathcal/info/2003_may20-24_fredericton.html
    31st Annual Canadian Operator Theory and Operator Algebras Symposium
    Month: May 2003 Date: May 2024 Name: 31st Annual Canadian Operator Theory and Operator Algebras Symposium Location: UNB, Fredericton, New Brunswick, Canada.
    Information
    http://www.math.unb.ca/cos.html

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