Listing 1 - 10 of 10 |
Sort by
|
Choose an application
Recent Progress in Fourier Analysis
Harmonic analysis. Fourier analysis --- Fourier analysis --- 517.52 --- 517.52 Series and sequences --- Series and sequences --- Analysis, Fourier --- Mathematical analysis --- Congresses
Choose an application
Fourier Analysis and Boundary Value Problems provides a thorough examination of both the theory and applications of partial differential equations and the Fourier and Laplace methods for their solutions. Boundary value problems, including the heat and wave equations, are integrated throughout the book. Written from a historical perspective with extensive biographical coverage of pioneers in the field, the book emphasizes the important role played by partial differential equations in engineering and physics. In addition, the author demonstrates how efforts to deal with these problems hav
Fourier analysis. --- Boundary value problems --- Numerical solutions. --- Analysis, Fourier --- Mathematical analysis
Choose an application
Real variable methods in Fourier analysis
Harmonic analysis. Fourier analysis --- Fourier analysis. --- Functions of real variables. --- Operator theory. --- Fourier analysis --- Functions of real variables --- Operator theory --- 517.51 --- 517.51 Functions of a real variable. Real functions --- Functions of a real variable. Real functions --- Functional analysis --- Real variables --- Functions of complex variables --- Analysis, Fourier --- Mathematical analysis
Choose an application
Fourier analysis and approximation
Harmonic analysis. Fourier analysis --- Approximation theory. --- Fourier analysis. --- Fourier Analysis --- Approximation theory --- Theory of approximation --- Functional analysis --- Functions --- Polynomials --- Chebyshev systems --- Analysis, Fourier --- Mathematical analysis --- Fourier analysis --- 517.44 --- 517.518.8 --- 519.6 --- 681.3*G12 --- 517.518.8 Approximation of functions by polynomials and their generalizations --- Approximation of functions by polynomials and their generalizations --- 681.3*G12 Approximation: chebyshev; elementary function; least squares; linear approximation; minimax approximation and algorithms; nonlinear and rational approximation; spline and piecewise polynomial approximation (Numerical analysis) --- Approximation: chebyshev; elementary function; least squares; linear approximation; minimax approximation and algorithms; nonlinear and rational approximation; spline and piecewise polynomial approximation (Numerical analysis) --- 519.6 Computational mathematics. Numerical analysis. Computer programming --- Computational mathematics. Numerical analysis. Computer programming --- 517.44 Integral transforms. Operational calculus. Laplace transforms. Fourier integral. Fourier transforms. Convolutions --- Integral transforms. Operational calculus. Laplace transforms. Fourier integral. Fourier transforms. Convolutions
Choose an application
An introduction to nonharmonic Fourier series
Fourier series. --- Fourier analysis. --- Analysis, Fourier --- Mathematical analysis --- Fourier integrals --- Series, Fourier --- Series, Trigonometric --- Trigonometric series --- Calculus --- Fourier analysis --- Harmonic analysis --- Harmonic functions --- Fourier series --- 517.44 --- 517.518.4 --- 517.518.5 --- 517.52 --- 517.52 Series and sequences --- Series and sequences --- 517.518.5 Theory of the Fourier integral --- Theory of the Fourier integral --- 517.518.4 Trigonometric series --- 517.44 Integral transforms. Operational calculus. Laplace transforms. Fourier integral. Fourier transforms. Convolutions --- Integral transforms. Operational calculus. Laplace transforms. Fourier integral. Fourier transforms. Convolutions
Choose an application
Mallat's book is the undisputed reference in this field - it is the only one that covers the essential material in such breadth and depth. - Laurent Demanet, Stanford UniversityThe new edition of this classic book gives all the major concepts, techniques and applications of sparse representation, reflecting the key role the subject plays in today's signal processing. The book clearly presents the standard representations with Fourier, wavelet and time-frequency transforms, and the construction of orthogonal bases with fast algorithms. The central concept of sparsity is explaine
Harmonic analysis. Fourier analysis --- Mathematical control systems --- Electronics --- Computer science --- Artificial intelligence. Robotics. Simulation. Graphics --- geluidsleer --- digitale signaalverwerking --- beeldverwerking --- Fourieranalyse --- signaalverwerking --- Statistical methods --- Mathematical models --- Data processing --- signals --- Signal processing --- Wavelets (Mathematics) --- Mathematics. --- Mathematics --- 534 --- 534 Vibrations. Acoustics --- Vibrations. Acoustics --- Wavelet analysis --- Harmonic analysis --- Signal processing - Mathematics
Choose an application
Distributions and Fourier transforms
517.982.4 --- Theory of generalized functions (distributions) --- Fourier transformations. --- Theory of distributions (Functional analysis) --- Theory of distributions (Functional analysis). --- 517.982.4 Theory of generalized functions (distributions) --- Transformations, Fourier --- Transforms, Fourier --- Fourier analysis --- Transformations (Mathematics) --- Distribution (Functional analysis) --- Distributions, Theory of (Functional analysis) --- Functions, Generalized --- Generalized functions --- Functional analysis
Choose an application
RiemannÆs zeta function
Number theory. --- Functions, Zeta. --- Zeta functions --- Number study --- Numbers, Theory of --- Algebra --- Functions, Zeta --- Number theory --- 511 --- 511 Number theory --- 511.3 --- 511.3 Analytical, additive and other number-theory problems. Diophantine approximations --- Analytical, additive and other number-theory problems. Diophantine approximations --- Numbers, Prime --- Nombres premiers --- Number Theory --- Numbers, Prime. --- Fonctions zêta --- Riemann, B. --- Fourier analysis --- Numerical analysis --- Fonctions speciales --- Fonctions zeta
Choose an application
Structural Biology Using Electrons and X-rays is the perfect book to provide advanced undergraduates or graduate students with an accessible introduction to the two major diffraction-based techniques of structural biology. While concentrating on electron cryo-microscopy with image analysis, it also includes X-ray crystallography in a coherent survey of fundamental principles. Starting with Fourier transforms and progressing through optics and imaging principles, symmetry and three-dimensional reconstruction theory, Structural Biology Using Electrons and X-rays ends in an accou
Biology. --- Biomolecules - Structure. --- Biomolecules --Structure. --- Diffraction. --- Electron optics. --- Electron probe microanalysis. --- Electrons. --- X-ray spectroscopy. --- X-rays. --- Biomolecules --- X-ray spectroscopy --- Electron optics --- Electron probe microanalysis --- Genetics --- Signal Processing, Computer-Assisted --- Mathematical Concepts --- Investigative Techniques --- Biochemistry --- Spectrum Analysis --- Chemistry --- Analytical, Diagnostic and Therapeutic Techniques and Equipment --- Biological Science Disciplines --- Computing Methodologies --- Biology --- Chemistry Techniques, Analytical --- Phenomena and Processes --- Magnetic Resonance Spectroscopy --- Fourier Analysis --- Molecular Biology --- Natural Science Disciplines --- Information Science --- Disciplines and Occupations --- Human Anatomy & Physiology --- Engineering & Applied Sciences --- Health & Biological Sciences --- Animal Biochemistry --- Biophysics --- Applied Physics --- Structure --- Fourier transform optics. --- Fourier transform nuclear magnetic resonance spectroscopy. --- Structure. --- Analysis. --- Mathematical models. --- FT-NMR spectroscopy --- Fourier transform spectroscopy --- Nuclear magnetic resonance spectroscopy --- Fourier optics --- Fourier transformations --- Optics --- Biological molecules --- Molecules --- Molecular biology
Choose an application
Evolving from an elementary discussion, this book develops the Euclidean algorithm to a very powerful tool to deal with general continued fractions, non-normal Padé tables, look-ahead algorithms for Hankel and Toeplitz matrices, and for Krylov subspace methods. It introduces the basics of fast algorithms for structured problems and shows how they deal with singular situations. Links are made with more applied subjects such as linear system theory and signal processing, and with more advanced topics and recent results such as general bi-orthogonal polynomials, minimal Padé approximation, poly
Ordered algebraic structures --- Numerical approximation theory --- Computer science --- lineaire algebra --- Algebras, Linear --- Euclidean algorithm --- Orthogonal polynomials --- Padé approximant --- #TELE:SISTA --- 519.6 --- 681.3*G11 --- 681.3*G12 --- 681.3*G13 --- Algorithm of Euclid --- Continued division --- Division, Continued --- Euclid algorithm --- Euclidian algorithm --- Euclid's algorithm --- Algorithms --- Number theory --- Linear algebra --- Algebra, Universal --- Generalized spaces --- Mathematical analysis --- Calculus of operations --- Line geometry --- Topology --- 681.3*G13 Numerical linear algebra: conditioning; determinants; Eigenvalues; error analysis; linear systems; matrix inversion; pseudoinverses; sparse and very largesystems --- Numerical linear algebra: conditioning; determinants; Eigenvalues; error analysis; linear systems; matrix inversion; pseudoinverses; sparse and very largesystems --- 681.3*G12 Approximation: chebyshev; elementary function; least squares; linear approximation; minimax approximation and algorithms; nonlinear and rational approximation; spline and piecewise polynomial approximation (Numerical analysis) --- Approximation: chebyshev; elementary function; least squares; linear approximation; minimax approximation and algorithms; nonlinear and rational approximation; spline and piecewise polynomial approximation (Numerical analysis) --- 681.3*G11 Interpolation: difference formulas; extrapolation; smoothing; spline and piecewise polynomial interpolation (Numerical analysis) --- Interpolation: difference formulas; extrapolation; smoothing; spline and piecewise polynomial interpolation (Numerical analysis) --- 519.6 Computational mathematics. Numerical analysis. Computer programming --- Computational mathematics. Numerical analysis. Computer programming --- Fourier analysis --- Functions, Orthogonal --- Polynomials --- Approximant, Padé --- Approximation theory --- Continued fractions --- Power series --- Euclidean algorithm. --- Algebras, Linear. --- Padé approximant. --- Orthogonal polynomials. --- Padé approximant. --- Pade approximant.
Listing 1 - 10 of 10 |
Sort by
|