A Conference in Honor of the Retirement of Dov Aharonov, Lev Aizenberg, Samuel Krushkal, and Uri Srebro
This book focuses on developments in complex dynamical systems and geometric function theory over the past decade, showing strong links with other areas of mathematics and the natural sciences. Traditional methods and approaches surface in physics...
Stable expansions in homogeneous polynomials; Dynamics of approximate solutions to a class of evolution equations in Banach spaces; Schottky's theorem on conformal mappings between annuli: A play of derivatives and integrals; Univalent convex functions in the positive direction of the real axis; The common fixed point set of commuting nonexpansive mappings in infinite products of unit balls; Controlled approximation for some classes of holomorphic functions; Best approximating entire functions to $\left\vert x\right\vert {\alpha}$ in $L 2$; Orbits of tori extended by finite groups and their polynomial hulls: The case of connected complex orbits; QC Riemann mapping theorem in space; Boundary value problems in weighted edge spaces; Analytic properties of Besov spaces via Bergman projections; The Cauchy integral over non-rectifiable paths; Holomorphic continuation via Laplace-Fourier series; Analytic functions in algebras; Rational approximation of holomorphic functions and geometry of Grunsky inequalities; Quadratic forms in geometric function theory, quasiconformal extensions, Fredholm eigenvalues; Elimination methods of unknowns from nonlinear systems; On locally biholomorphic finitely valent mappings from multiply connected to simply connected domains; Parabolic pseudodifferential operators in exponential weighted spaces; The Cauchy problem of couple-stress elasticity; On the zeta-function of a nonlinear system; Some questions of uniqueness for extremal quasiconformal mappings; Remarks on the existence of quasimeromorphic mappings; On the Cauchy problem for the Cauchy-Riemann operator in Sobolev spaces; On spectral functions for commutative $J$-self-adjoint operator families of the $D {\kappa}+$-class; Mappings associated with weighted Sobolev spaces; Inner maps and Banach algebras; Reconstructing holomorphic functions in a domain from their values on a part of its boundary; A note on the parabolicity of minimal graphs; Localization of fixed points and zeros for holomorphic maps in locally convex spaces and nonexpansive maps in J*-algebras; On harmonic polynomial interpolation