دانلود کتاب Introduction to Fourier Analysis on Euclidean Spaces (PMS-32), Volume 32

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Preface\nContents\nChapter I. The Fourier Transform\n 1. The basic L1.heory of the Fourier transform\n 2. The L2 theory and the Plancherel theorem\n 3. The class of tempered distributions\n 4. Further results\nChapter II. Boundary Values of Harmonic Functions\n 1. Basic properties of harmonic functions\n 2. The characterization of Poisson integrals\n 3. The Hardy-Littlewood maximal function and nontangential convergence of harmonic functions\n 4. Subharmonic functions and majorization by harmonic functions\n 5. Further results\nChapter III. The Theory of Hp Spaces on Tubes\n 1. Introductory remarks\n 2. The H2 theory\n 3. Tubes over cones\n 4. The Paley-Wiener theorem\n 5. The Hp theory\n 6. Further results\nChapter IV. Symmetry Properties of the Fourier Transform\n 1. Decomposition of L2(E2) into subspaces invariant under the Fourier transform\n 2. Spherical harmonics\n 3. The action of the Fourier transform on the spaces\n 4. Some applications\n 5. Further results\nChapter V. Interpolation of Operators\n 1. The M. Riesz convexity theorem and interpolation of operators defined on Lp spaces\n 2. The Marcinkiewicz interpolation theorem\n 3. L(p, q) spaces\n 4. Interpolation of analytic families of operators\n 5. Further results\nChapter VI. Singular Integrals and Systems of Conjugate Harmonic Functions\n 1. The Hilbert transform\n 2. Singular integral operators with odd kernels\n 3. Singular integral operators with even kernels\n 4. Hp spaces of conjugate harmonic functions\n 5. Further results\nChapter VII. Multiple Fourier Series\n 1. Elementary properties\n 2. The Poisson summation formula\n 3. Multiplier transformations\n 4. Summability below the critical index (negative results)\n 5. Summability below the critical index\n 6. Further results\nBibliography\nIndex