Torino : Bollati Boringhieri, 1994

88-33-5532-X

XII, 747 p. ; 24 cm.

Programma di matematica, fisica, elettronica

MARMI, Stefano

531.01515

Meccanica analitica

MA/112

Italiano

Birmingham : , : Packt Publishing, , 2014

1-78217-043-X

1 online resource (149 pages)

Professional expertise distilled

621.38216

Computer networks - Computer simulation

Computer programs

Computer simulation

Electronic books.

Inglese

Includes index.

Cover; Copyright; Credits; About the Author; About the Reviewers; www.PacktPub.com; Table of Contents; Preface; Chapter 1: Getting Started with Packet Tracer; Protocols supported by Packet Tracer; Installing Packet Tracer; Windows; Linux; Interface overview; Creating a simple topology; Summary; Chapter 2: Network Devices; Cisco devices and Packet Tracer devices; Routers; Switches; Other devices; Customizing devices with modules; Naming convention; Create a custom device; Emulating WAN; Accessing the CLI; The CLI tab; Console Port; Configuring network devices; Global settings; Routing

VLAN DatabaseInterface settings; Summary; Chapter 3: Generic IP End Devices; Desktops and laptops; Servers; HTTP; DHCP; TFTP; DNS; SYSLOG; AAA; NTP; EMAIL; FTP; Firewall / IPv6 Firewall; Other end devices; Configuring end devices; IP Configuration; Dial-up; Terminal; Command Prompt; Web Browser; PC Wireless; VPN; Traffic Generator; MIB Browser; Cisco IP Communicator; E Mail; PPPoE Dialer; Text Editor; Summary; Chapter 4: Creating a Network Topology; Connecting devices; Link status; Testing connectivity with PDUs; Simple PDU; Complex PDU; Using the simulation mode; Clustering a topology

SummaryChapter 5: Navigating and Modifying the Physical Workspace; Creating cities, offices, and wiring closets; Moving devices physically; Managing cables and distances; Cable distances; Cable manipulation;

Customizing icons and backgrounds; Summary; Chapter 6: Configuring Routing with the CLI; Static routing; Static routing with GUI; Static routing with the CLI; Dynamic routing protocols; Configuring RIP with the GUI; Configuring RIP with the CLI; Routing Table; Load sharing; Load balancing with RIP; Load balancing with static routing; Summary; Chapter 7: Border Gateway Protocol (BGP)

What is BGP?External BGP; Internal BGP; BGP versus dynamic routing protocols; Configuring BGP in Packet Tracer; Summary; Chapter 8: IPv6 on Packet Tracer; Assigning IPv6 addresses; Autoconfiguration; Static IPv6; IPv6 static and dynamic routing; Static routing; Dynamic routing; Using both IPv4 and IPv6; Summary; Chapter 9: Setting Up a Wireless Network; Wireless devices and modules; Wireless networks and physical workspaces; Configuring Linksys access point; Summary; Chapter 10: Configuring VLANs and Trunks; Creating VLANs and VTP domains; InterVLAN routing with routers and layer 3 switches

InterVLAN on a routerInterVLAN on a layer 3 switch; Switch-to-switch trunk links; Analyzing broadcasts in simulation mode; Summary; Chapter 11: Creating Packet Tracer Assessments; Welcome screen and instructions; Initial Network; Answer network; Testing the activity; Summary; Index

A practical, fast-paced guide that gives you all the information you need to successfully create networks and simulate them using Packet Tracer.Packet Tracer Network Simulator is aimed at students, instructors, and network administrators who wish to use this simulator to learn how to perform networking instead of investing in expensive, specialized hardware. This book assumes that you have a good amount of Cisco networking knowledge, and it will focus more on Packet Tracer rather than networking.

Princeton, : Princeton University Press, c2009

1-282-15727-2

9786612157271

1-4008-3011-7

1 online resource (696 p.)

Princeton mathematical series ; ; 48

SK 560

IwaniecTadeusz

MartinGaven

515/.93

Differential equations, Elliptic

Quasiconformal mappings

Electronic books.

Inglese

Description based upon print version of record.

Includes bibliographical references (p. 647-670) and index.

Frontmatter -- Contents -- Preface -- Chapter 1. Introduction -- Chapter 2. A Background In Conformal Geometry -- Chapter 3. The Foundations Of Quasiconformal Mappings -- Chapter 4. Complex Potentials -- Chapter 5. The Measurable Riemann Mapping Theorem: The Existence Theory Of Quasiconformal Mappings -- Chapter 6. Parameterizing General Linear Elliptic Systems -- Chapter 7. The Concept Of Ellipticity -- Chapter 8. Solving General Nonlinear First-Order Elliptic Systems -- Chapter 9. Nonlinear Riemann Mapping Theorems -- Chapter 10. Conformal Deformations And Beltrami Systems -- Chapter 11. A Quasilinear Cauchy Problem -- Chapter 12. Holomorphic Motions -- Chapter 13. Higher Integrability -- Chapter 14. Lp-Theory Of Beltrami Operators -- Chapter 15. Schauder Estimates For Beltrami Operators -- Chapter 16. Applications To Partial Differential Equations -- Chapter 17. PDEs Not Of Divergence Type: Pucci'S Conjecture -- Chapter 18. Quasiconformal Methods In Impedance Tomography: Calderón's Problem -- Chapter 19. Integral Estimates For The Jacobian -- Chapter 20. Solving The Beltrami

Equation: Degenerate Elliptic Case -- Chapter 21. Aspects Of The Calculus Of Variations -- Appendix: Elements Of Sobolev Theory And Function Spaces -- Basic Notation -- Bibliography -- Index

This book explores the most recent developments in the theory of planar quasiconformal mappings with a particular focus on the interactions with partial differential equations and nonlinear analysis. It gives a thorough and modern approach to the classical theory and presents important and compelling applications across a spectrum of mathematics: dynamical systems, singular integral operators, inverse problems, the geometry of mappings, and the calculus of variations. It also gives an account of recent advances in harmonic analysis and their applications in the geometric theory of mappings. The book explains that the existence, regularity, and singular set structures for second-order divergence-type equations--the most important class of PDEs in applications--are determined by the mathematics underpinning the geometry, structure, and dimension of fractal sets; moduli spaces of Riemann surfaces; and conformal dynamical systems. These topics are inextricably linked by the theory of quasiconformal mappings. Further, the interplay between them allows the authors to extend classical results to more general settings for wider applicability, providing new and often optimal answers to questions of existence, regularity, and geometric properties of solutions to nonlinear systems in both elliptic and degenerate elliptic settings.