Geometry.Net - the online learning center
Home  - Pure_And_Applied_Math - Approximations Expansions

e99.com Bookstore
  
Images 
Newsgroups
Page 4     61-72 of 72    Back | 1  | 2  | 3  | 4 

         Approximations Expansions:     more books (94)
  1. Discrete Hamiltonian Systems: Difference Equations, Continued Fractions, and Riccati Equations (Texts in the Mathematical Sciences) by Calvin Ahlbrandt, A.C. Peterson, 2010-11-02
  2. Parametric Continuation and Optimal Parametrization in Applied Mathematics and Mechanics by V.I. Shalashilin, E. B. Kuznetsov, 2010-11-02
  3. Number Theory: Tradition and Modernization (Developments in Mathematics)
  4. Geometric Properties for Incomplete Data (Computational Imaging and Vision)
  5. Recent Progress in Inequalities (Mathematics and Its Applications)
  6. Non-Connected Convexities and Applications (Applied Optimization) by G. Cristescu, L. Lupsa, 2002-05-31
  7. Wavelets in Signal and Image Analysis: From Theory to Practice (Computational Imaging and Vision)
  8. Variational Theory of Splines by Anatoly Yu. Bezhaev, Vladimir A. Vasilenko, 2010-11-02
  9. Summability of Multi-Dimensional Fourier Series and Hardy Spaces (Mathematics and Its Applications) by Ferenc Weisz, 2002-03-31
  10. Developments and Applications of Block Toeplitz Iterative Solvers (Combinatorics and Computer Science) by Xiao-Qing Jin, 2010-11-02
  11. Orthogonal Polynomials and Special Functions: Computation and Applications (Lecture Notes in Mathematics) (Volume 0)
  12. Walsh Equiconvergence of Complex Interpolating Polynomials (Springer Monographs in Mathematics) by Amnon Jakimovski, Ambikeshwar Sharma, et all 2010-11-02
  13. Explorations in Harmonic Analysis: With Applications to Complex Function Theory and the Heisenberg Group (Applied and Numerical Harmonic Analysis) by Steven G. Krantz, 2009-05-05
  14. Theory and Applications of Special Functions: A Volume Dedicated to Mizan Rahman (Developments in Mathematics)

61. Unit Description: M.Sci/M.Sc.Asymptotics
if they converge very slowly. Instead, asymptotic expansions can yieldgood approximations. They are typically divergent if summed
http://www.maths.bris.ac.uk/~madhg/unitinfo/current/l4_units/asympt.htm
Undergrad page Level 1 Level 2 Level 3 ... Level 4
Bristol University Mathematics Department
Undergraduate Unit Description for 2002/2003
Asymptotics (MATH 44700)
Contents of this document:
Administrative information
Unit aims
General Description , and Relation to Other Units
Teaching methods
and Learning Objectives
Assessment methods
and Award of Credit Points
Transferable skills

Texts
and Syllabus
Administrative Information
  • Unit number and title: MATH 44700 Asymptotics Level: 4 (also available for M.Sc. students) Credit point value: 20 credit points Year: First Given: Lecturer/organiser: Dr. M. Sieber Semester: 1 (weeks 1-12) Timetable: Tuesday 12.10, Thursday 10.00, Friday 10:00. Prerequisites: MATH 30800 Mathematical Methods , and MATH 33000 Complex Function Theory
  • , but if MATH 20900 Calculus 2 was taken in 2001-2, then Complex Function Theory is not required.
    Unit Aims
    This unit aims to enhance students' ability to solve the type of equations that arise from applications of mathematics to natural and technological problems by giving a grounding in perturbation techniques. Emphasis is placed on methods of developing asymptotic solutions.
    General Description of the Unit
    For most equations that arise in modelling applications it is unlikely that exact solutions can be found. Even convergent series approximations are often not available, or they are of limited use if they converge very slowly. Instead, asymptotic expansions can yield good approximations. They are typically divergent if summed to infinity but a few terms can often give excellent and well defined approximations.

    62. Contents Page
    3 Finding polynomial approximations by Taylor expansions 3.1 Taylor polynomials(near x = 0) 3.2 Taylor series about zero 3.3 Taylor polynomials (near x = a
    http://physics.open.ac.uk/flap/schools/M4_5cl.html
    Contents List
      Module M4.5 Taylor expansions and polynomial approximations 1 Opening items 2 Polynomial approximations
      2.1 Polynomials
      2.2 Increasingly accurate approximations for sin( x
      2.3 Increasingly accurate approximations for exp( x 3 Finding polynomial approximations by Taylor expansions
      3.1 Taylor polynomials (near x
      3.2 Taylor series about zero
      3.3 Taylor polynomials (near x a
      3.4 Taylor series about a general point
      3.5 Some useful Taylor series
      3.6 Simplifying the derivation of Taylor expansions
      3.7 Applications and examples 4 Closing items 5 Answers and comments
    Return to Previous page (c) 1998, The Open University

    63. List KWIC DDC22 510 And MSC+ZDM E-N Lexical Connection
    discrete 49M25 approximations methods of successive 49Mxx approximations smooth57R12 approximations and expansions 511.4 approximations and expansions 41
    http://www.math.unipd.it/~biblio/kwic/msc-cdd/dml2_11_04.htm
    applications of computability and recursion theory
    applications of design theory
    applications of diffusion theory (population genetics, absorption problems, etc.)
    applications of discrete Markov processes (social mobility, learning theory, industrial processes, etc.)
    applications of Eilenberg - Moore spectral sequences
    applications of functional analysis # miscellaneous
    applications of functional analysis to matrix theory # norms of matrices, numerical range,
    applications of game theory
    applications of global analysis to structures on manifolds, Donaldson and Seiberg - Witten invariants
    applications of graph theory
    applications of group representations to physics applications of Lie groups to physics; explicit representations applications of logic applications of logic # other applications of logic to commutative algebra applications of logic to group theory applications of Markov renewal processes (reliability, queueing networks, etc.) applications of mathematical programming applications of mathematics # mathematical modelling

    64. Document Sans Titre
    Historical Remarks Distribution of R in Nonnormal Populations and Robustness Tablesand approximations (Asymptotic expansions) _Tables _approximations
    http://www.mnhn.fr/mnhn/lop/BIBLIO/OUTI/JOHN_KOTZ.html
    Norman L. JOHNSON, Samuel KOTZ et N. BALAKRISHNAN
    Continuous Univariate Distributions (Volume 2, 2nd Edition)
    New York (USA), 1995

    TABLE DES MATIERES Preface List of Tables Extreme Value Distributions
    Genesis
    Introduction
    Limiting Distributions of Extremes
    Distribution Function and Moments
    Order Statistics
    Record Values
    Generation, Tables, and Probability Paper Characterizations Methods of Inference Moment Estimation Simple Linear Estimation Best Linear Unbiased (Invariant) Estimation Asymptotic Best Linear Unbiased Estimation Linear Estimation with Polynomial Coefficients Maximum Likelihood Estimation Conditional Method Method of Probability-Weighted Moments "Block-Type" Estimation A Survey of Other Developments Tolerance Limits and Intervals Prediction Limits and Intervals Outliers and Robustness Probability Plots, Modifications, and Model Validity Applications Generalized Extreme Value Distributions Other Related Distributions References Logistic Distribution Historical Remarks and Genesis Definition Generating Functions and Moments Properties Order Statistics Methods of Inference Record Values Tables Applications Generalizations Related Distributions References Laplace (Double Exponential) Distributions Definition, Genesis, and Historical Remarks

    65. Analysis Research Group, Univ. Of Calgary
    behavior. approximations and expansions. Alex Brudnyi. 41A17, 46Jxx. Inequalities algebras;.approximations and expansions. Len Bos. 41A30, 41A05. Numerical
    http://www.math.ucalgary.ca/~cunning/analysis.html

    Research at the Department of Mathematics
    Analysis research group
    Research category Researcher AMS subject classification Research topics Several complex variables and analytic spaces Alex Brudnyi Complex manifolds; Other spaces of holomorphic functions (e.g. bounded mean oscillation, vanishing mean oscillation); Plurisubharmonic functions and generalizations. Several complex variables and analytic spaces Len Bos Real-analytic manifolds, real-analytic spaces. Differential equations Paul Binding Sturm-Liouville theory; Boundary value problems for second-order, elliptic equations; Boundary value problems for higher-order, elliptic equations; General spectral theory of PDE. Differential equations Igov V. Nikolaev Location of integral curves, singular points, limit cycles; Structural stability and analogous concepts Differential equations Kok Wah Chang Singular perturbations, general theory; Nonlinear boundary value problems Differential equations Peter Lancaster Stability theory; Lyapunov stability; Nonlinear equations and systems, general Differential equations W.E. Couch

    66. A General Theorem In The Theory Of Asymptotic Expansions As Approximations To Th
    Author(s) Phillips, Peter C B Abstract No abstract available
    http://netec.wustl.edu/WoPEc/data/Articles/ecmemetrpv:45:y:1977:i:6:p:1517-34.ht
    mirrored in Providing the latest research results since 1993 Search tips: title=fiscal or author=levine Working Papers Series Journals Authors JEL Classification ... Econometrica >> A General Theorem in the Theory of Asymptotic Expansions as Approximations to the Finite Sample Distributions of Econometric Estimators.
    A General Theorem in the Theory of Asymptotic Expansions as Approximations to the Finite Sample Distributions of Econometric Estimators. Phillips, Peter C B
    Author(s) registered at HoPEc PETER C. B. PHILLIPS
    Econometrica
    web site
    (RePEc:ecm:emetrp:v:45:y:1977:i:6:p:1517-34)
    Pages: 1517-34
    Volume: 45
    Month: Sept.
    Year: 1977
    Issue: 6 Restriction: Access to full text is restricted to JSTOR subscribers. See http://www.jstor.org for details. go top Information for authors:
    Are you an author of this paper? Please take the time and register at our new service. Read all about it at: http://netec.mcc.ac.uk/HoPEc/geminiabout.html . Note you do not need to register in order to use the search service!! Download (full text) Get a printed copy Access statistics WoPEc is a RePEc service managed by Jose Manuel Barrueco and Thomas Krichel contact us Last updated: 2003-03-17 16:40:03

    67. DLMF: §AI.20(ii) Expansions In Chebyshev Series
    AI.20(ii) expansions in Chebyshev Series About §AI.20(ii). These expansionsare for real arguments and are supplied in sets of four
    http://dlmf.nist.gov/Contents/AI/AI.20_ii.html
    AI Airy and Related Functions by Frank W. J. Olver Computation

    AI.20(ii) Expansions in Chebyshev Series
    These expansions are for real arguments and are supplied in sets of four for each function, corresponding to intervals . The constants and are chosen numerically, with a view to equalizing the effort required for summing the series in each of the four cases. The notation 8S, or 8D, signifies 8 significant figures, or decimal digits, respectively.
    • Prince (1975) covers . The Chebyshev coefficients are given to 10-11D. Fortran programs are included. covers , and integrals (see also ( AI.10.19 ) and ( AI.10.20 )). The Chebyshev coefficients are given to 15D. Chebysev coefficients are also given for expansions of the second and higher (real) zeros of , again to 15D. Razaz and Schonfelder (1981) covers . The Chebyshev coefficients are given to 30D.

    Translated on 2001-06-11
    DLMF_feedback@nist.gov

    68. EEVL | Mathematics Section | Subject Classification A To Z
    manifolds; Applications to science and engineering; approximations andexpansions; Argentina Maths Departments and Institutions; Associative
    http://www.eevl.ac.uk/mathematics/atozmaths.htm
    HOME MATHEMATICS Discover the Best of the Web
    Mathematics Subject Classification - A to Z
    A B C D ... Z A [top] B

    69. Personal
    10. Uniform approximations of Bernoulli and Euler polynomials in terms of hyperbolic Asymptoticexpansions of the Whittaker functions for large order parameter
    http://www.unavarra.es/personal/jl_lopez/
    Curriculum
    Professor of Mathematics Education Degree in Physics, 1990 . University of Zaragoza.
    Ph. Degree in Physics, 1995. University of Zaragoza.
    Degree in Mathematics, 1997 . University of Zaragoza.
    Employment History University of Zaragoza, 1995-1999. Associate Professor.
    State University of Navarra, 1999-present. Full Professor.
    Research Interests Asymptotic Approximation of Integrals.
    Analytical Aspects of Special Functions.
    Singular Perturbation Problems: Asymptotic Approximation.
    Limit Cycles of Dynamical Systems.
    Recent Publications (since 1998) 1. Several Series containing Gamma and Polygamma Functions. J. Comp. Appl. Math. 90 (1998) 15-23. 3. A family of multiple integrals analytically solvable. Appl. Math. Lett. 12 (1999) 119- 125. 4. The Whittaker function M as a function of k. Const. Approx. 15 (1998) 83-95. With J. Sesma

    70. Publications
    With Bente Clausen. 1994. {Saddlepoint approximations, Edgeworth expansionsand normal approximations from independence to dependence.} Memoirs No.
    http://home.imf.au.dk/jlj/publikation.html
    Publication list of Jens Ledet Jensen
    Arranged in reverse chronological order.
    Books
    • Saddlepoint Approximations. Clarendon Press, Oxford, 1995.
    Publications in journals and proceedings
    • Light, atoms, and singularities. Co-authors: O.E. Barndorff-Nielsen and F.E. Benth. Progress in Probability, 52,
    • A dependent rates model and MCMC based methodology for the maximum likelihood analysis of sequences with overlapping reading frames. Co-author: A-M.K. Pedersen. Mol Biol Evol, 18,
    • A class of risk neutral densities with heavy tails. Co-authors: N.V. Hartvig and J. Pedersen Finance and Stochastics, 5,
    • Markov jump processes with a singularity. Co-authors: O.E. Barndorff-Nielsen and F.E. Benth. Adv. Appl. Probab, 32,
    • Spatial mixture modelling of fMRI data. Co-author: N.V. Hartvig. Human Brain Mapping, 11,
    • Probabilistic models of DNA sequence evolution with context dependent rates of substitution. Co-author: A-M.K. Pedersen. Adv. Appl. Probab. 32,
    • Asymptotic normality of the maximum likelihood estimator in state space models. Co-author: N.V. Petersen. Ann. Statist. 27

    71. Binomial Distribution
    IV. approximations to Normal Distribution. Consider a series of binomialexpansions with increasing powers (0 to 4), as presented below.
    http://www.visualstatistics.us/hotheobinomial.htm
    Approximations to Normal Distribution
    Probability
    Probability is defined as a ratio of the number of expected (favorable or desired) outcomes to the number of possible outcomes.
    Binary Event
    A coin toss is an example of a binary event. There are only two possible outcomes (a head or a tail) on each trial and the probability of each outcome is .5. The two probabilities add up to 1.0.
    I. Toss one "Ideal" Coin
    All Possible Outcomes The number of possible outcomes, n, is given by the equation where k denotes the number of determinants and the base 2 stands for two mutually exclusive outcomes associated with each determinant. Toss a coin one time: k = 1 For one determinant, there are two possible outcomes. Probability of Each Unique Outcome Number of Heads Frequency and Proportion Probabilities Associated with the Pascal's Triangle Visualization Binomial Distribution for One Determinant Note that the abscissa for the binomial distribution is a discrete variable.
    II. Toss Two "Ideal" Coins
    All Possible Outcomes There are 4 possible outcomes: 2*2 = 4 Probability of Each Unique Outcome
    Each of the possible outcomes is equally likely.

    72. Citation
    2 2. RN Bhattacharya and NH Chan, Comparisons of chisquare, Edgeworth expansionsand bootstrap approximations to the distribution of the frequency chisquare
    http://portal.acm.org/citation.cfm?id=603419&coll=portal&dl=ACM&CFID=11111111&CF

    Page 4     61-72 of 72    Back | 1  | 2  | 3  | 4 

    free hit counter