Topics In Mathematical Analysis

Complex Variables and Potential Theory: Integral Representations in Complex, Hypercomplex and Clifford Analysis (H Begehr); Nonlinear Potential Theory in Metric Spaces (O Martio); Differential Equations and Nonlinear Analysis: Geometric Evolution Problems (G Bellettini); Introduction to Bifurcation Theory (P Drabek); Nonlinear Eigenvalue Problems (P Lindqvist); Nonlinear Elliptic Equations with Critical and Supercritical Sobolev Exponents (D Passaseo); Discrete Spectrum Analysis of Elliptic Operators (G Rozenblum); Introduction to Continuous Semigroups (E Vesentini); Harmonic Analysis: Spectral Analysis of the Laplace Operator and Integral Geometry (M Agranovsky); Average Decay of the Fourier Transform and Applications to Harmonic Analysis and Geometric Measure Theory (A Losevich); Eigenfunctions of the Laplacian (C D Sogge); An Introduction to Harmonic Analysis: From the Basic Equations of the Physics to Singular and Oscillatory Integrals (F Soria); Spectral Theory of Differential and Integral Operators Related to Fractals and Metric Spaces (H Triebel).