1st Edition

The Cryptoclub Workbook Using Mathematics to Make and Break Secret Codes

By Janet Beissinger, Vera Pless Copyright 2006
    144 Pages
    by A K Peters/CRC Press

    144 Pages
    by A K Peters/CRC Press

    This workbook, which accompanies The Cryptoclub, provides students with problems related to each section to help them master the concepts introduced throughout the book. A PDF version is available at no charge. This file can be found under our Downloads and Updates tab. The teacher manual can be requested from the publisher by contacting the Academic Sales Manager, Susie Carlisle

    Modular space for complete intersection curve-singularities; quasinormability of vector valued sequence spaces; holomorphic mappings and cardinality; approximation numbers for polynomials; applications of Laguerre calculus to Dirichlet problem of the Heisenberg Laplacian; the Pisier-Schutt theorem for spaces of polynomials; canonical versus functional extensions of holomorphic functions; on convergence of trigonometric interpolation for periodic analytic functions; on the double series expansion with harmonic components; extension of pluriharmonic functions in locally convex spaces; regeneration in complex, quaternionic and Clifford analysis; Schauder decompositions of weighted spaces of holomorphic functions; spaces of Banach-valued holomorphic functions in the polydisk in connection with their boundary values; univalent C4 mappings on the unit ball in C; the growth theorem of biholomorphic mappings on a Banach space; stability of solutions for singular integral equations for two classes in locally convex spaces; the Nevanlinna's first main theorem for holomorphic Hermitian line bundles; on distortion theorem for N-set quasiconformal mappings; monodromy of a holomorphic family of Riemann surfaces - a remark on monodromy of a holomorphic family of Riemann surfaces induced by a Kodaira surface and the Nielsen-Thurston-Bers classification of surface automorphisms; characterisations of holomorphy of domains through validity of theorem A, B or Oka's principle; envelope of biregularity and F-convexity in Clifford analysis; on a representative domain in a matrix space; a new approximation of tree Navier-Stokes equations; generalisation du produit de Blaschke dans le Bidisque Unite; P-spaces. (Part contents).

    Biography

    Janet Beissinger is a research associate professor with the Learning Sciences Research Institute.