top

  Info

  • Utilizzare la checkbox di selezione a fianco di ciascun documento per attivare le funzionalità di stampa, invio email, download nei formati disponibili del (i) record.

  Info

  • Utilizzare questo link per rimuovere la selezione effettuata.
Radiating non-uniform transmission line systems and the partial element equivalent circuit method [[electronic resource] /] / Jurgen Nitsch, Frank Gronwald and Günter Wollenberg
Radiating non-uniform transmission line systems and the partial element equivalent circuit method [[electronic resource] /] / Jurgen Nitsch, Frank Gronwald and Günter Wollenberg
Autore Nitsch Jürgen
Pubbl/distr/stampa Hoboken, NJ, : J. Wiley, c2009
Descrizione fisica 1 online resource (350 p.)
Disciplina 621.38131
621.382/24
Altri autori (Persone) GronwaldFrank
WollenbergGünter
Soggetto topico Electromagnetic compatibility - Mathematical models
Electric lines - Mathematical models
Electronic circuit design - Data processing
Electronic apparatus and appliances - Design and construction - Data processing
ISBN 1-282-38498-8
9786612384981
0-470-68242-6
0-470-68241-8
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto RADIATING NONUNIFORM TRANSMISSION-LINE SYSTEMS AND THE PARTIAL ELEMENT EQUIVALENT CIRCUIT METHOD; Contents; Preface; References; Acknowledgments; List of Symbols; Introduction; References; 1 Fundamentals of Electrodynamics; 1.1 Maxwell Equations Derived from Conservation Laws - an Axiomatic Approach; 1.1.1 Charge Conservation; 1.1.2 Lorentz Force and Magnetic Flux Conservation; 1.1.3 Constitutive Relations and the Properties of Space time; 1.1.4 Remarks; 1.2 The Electromagnetic Field as a Gauge Field - a Gauge Field Approach
1.2.1 Differences of Physical Fields that are Described by Reference Systems 1.2.2 The Phase of Microscopic Matter Fields; 1.2.3 The Reference Frame of a Phase; 1.2.4 The Gauge Fields of a Phase; 1.2.5 Dynamics of the Gauge Field; 1.3 The Relation Between the Axiomatic Approach and the Gauge Field Approach; 1.3.1 No ether Theorem and Electric Charge Conservation; 1.3.2 Minimal Coupling and the Lorentz Force; 1.3.3 Bianchi Identity and Magnetic Flux Conservation; 1.3.4 Gauge Approach and Constitutive Relations; 1.4 Solutions of Maxwell Equations; 1.4.1 Wave Equations
1.4.1.1 Decoupling of Maxwell Equations 1.4.1.2 Equations of Motion for the Electromagnetic Potentials; 1.4.1.3 Maxwell Equations in the Frequency Domain and Helmholtz Equations; 1.4.1.4 Maxwell Equations in Reciprocal Space; 1.4.2 Boundary Conditions at Interfaces; 1.4.3 Dynamical and Nondynamical Components of the Electromagnetic Field; 1.4.3.1 Helmholtz's Vector Theorem, Longitudinal and Transverse Fields; 1.4.3.2 Nondynamical Maxwell Equations as Boundary Conditions in Time; 1.4.3.3 Longitudinal Part of the Maxwell Equations; 1.4.3.4 Transverse Part of the Maxwell Equations
1.4.4 Electromagnetic Energy and the Singularities of the Electromagnetic Field 1.4.5 Coulomb Fields and Radiation Fields; 1.4.6 The Green's Function Method; 1.4.6.1 Basic Ideas; 1.4.6.2 Self-Adjointness of Differential Operators and Boundary Conditions; 1.4.6.3 General Solutions of Maxwell Equations; 1.4.6.4 Basic Relations Between Electromagnetic Green's Functions; 1.5 Boundary Value Problems and Integral Equations; 1.5.1 Surface Integral Equations in Short; 1.5.2 The Standard Electric Field Integral Equations of Antenna Theory and Radiating Nonuniform Transmission-Line Systems
1.5.2.1 Pocklington's Equation 1.5.2.2 Hall ́en's Equation; 1.5.2.3 Mixed-Potential Integral Equation; 1.5.2.4 Schelkunoff 's Equation; References; 2 Nonuniform Transmission-Line Systems; 2.1 Multiconductor Transmission Lines: General Equations; 2.1.1 Geometric Representation of Nonuniform Transmission Lines; 2.1.1.1 Local Coordinate System; 2.1.1.2 Tangential Surface Vector; 2.1.1.3 Volume and Surface Integrals; 2.1.2 Derivation of Generalized Transmission-Line Equations; 2.1.2.1 Continuity Equation; 2.1.2.2 Reconstruction of the Densities; 2.1.3 Mixed Potential Integral Equation
2.1.3.1 Thin-Wire Approximation
Record Nr. UNINA-9910139970503321
Nitsch Jürgen  
Hoboken, NJ, : J. Wiley, c2009
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui
Radiating non-uniform transmission line systems and the partial element equivalent circuit method / / Jurgen Nitsch, Frank Gronwald and Gunter Wollenberg
Radiating non-uniform transmission line systems and the partial element equivalent circuit method / / Jurgen Nitsch, Frank Gronwald and Gunter Wollenberg
Autore Nitsch Jurgen
Edizione [1st ed.]
Pubbl/distr/stampa Hoboken, NJ, : J. Wiley, c2009
Descrizione fisica 1 online resource (350 p.)
Disciplina 621.38131
621.382/24
Altri autori (Persone) GronwaldFrank
WollenbergGunter
Soggetto topico Electromagnetic compatibility - Mathematical models
Electric lines - Mathematical models
Electronic circuit design - Data processing
Electronic apparatus and appliances - Design and construction - Data processing
ISBN 1-282-38498-8
9786612384981
0-470-68242-6
0-470-68241-8
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto RADIATING NONUNIFORM TRANSMISSION-LINE SYSTEMS AND THE PARTIAL ELEMENT EQUIVALENT CIRCUIT METHOD; Contents; Preface; References; Acknowledgments; List of Symbols; Introduction; References; 1 Fundamentals of Electrodynamics; 1.1 Maxwell Equations Derived from Conservation Laws - an Axiomatic Approach; 1.1.1 Charge Conservation; 1.1.2 Lorentz Force and Magnetic Flux Conservation; 1.1.3 Constitutive Relations and the Properties of Space time; 1.1.4 Remarks; 1.2 The Electromagnetic Field as a Gauge Field - a Gauge Field Approach
1.2.1 Differences of Physical Fields that are Described by Reference Systems 1.2.2 The Phase of Microscopic Matter Fields; 1.2.3 The Reference Frame of a Phase; 1.2.4 The Gauge Fields of a Phase; 1.2.5 Dynamics of the Gauge Field; 1.3 The Relation Between the Axiomatic Approach and the Gauge Field Approach; 1.3.1 No ether Theorem and Electric Charge Conservation; 1.3.2 Minimal Coupling and the Lorentz Force; 1.3.3 Bianchi Identity and Magnetic Flux Conservation; 1.3.4 Gauge Approach and Constitutive Relations; 1.4 Solutions of Maxwell Equations; 1.4.1 Wave Equations
1.4.1.1 Decoupling of Maxwell Equations 1.4.1.2 Equations of Motion for the Electromagnetic Potentials; 1.4.1.3 Maxwell Equations in the Frequency Domain and Helmholtz Equations; 1.4.1.4 Maxwell Equations in Reciprocal Space; 1.4.2 Boundary Conditions at Interfaces; 1.4.3 Dynamical and Nondynamical Components of the Electromagnetic Field; 1.4.3.1 Helmholtz's Vector Theorem, Longitudinal and Transverse Fields; 1.4.3.2 Nondynamical Maxwell Equations as Boundary Conditions in Time; 1.4.3.3 Longitudinal Part of the Maxwell Equations; 1.4.3.4 Transverse Part of the Maxwell Equations
1.4.4 Electromagnetic Energy and the Singularities of the Electromagnetic Field 1.4.5 Coulomb Fields and Radiation Fields; 1.4.6 The Green's Function Method; 1.4.6.1 Basic Ideas; 1.4.6.2 Self-Adjointness of Differential Operators and Boundary Conditions; 1.4.6.3 General Solutions of Maxwell Equations; 1.4.6.4 Basic Relations Between Electromagnetic Green's Functions; 1.5 Boundary Value Problems and Integral Equations; 1.5.1 Surface Integral Equations in Short; 1.5.2 The Standard Electric Field Integral Equations of Antenna Theory and Radiating Nonuniform Transmission-Line Systems
1.5.2.1 Pocklington's Equation 1.5.2.2 Hall ́en's Equation; 1.5.2.3 Mixed-Potential Integral Equation; 1.5.2.4 Schelkunoff 's Equation; References; 2 Nonuniform Transmission-Line Systems; 2.1 Multiconductor Transmission Lines: General Equations; 2.1.1 Geometric Representation of Nonuniform Transmission Lines; 2.1.1.1 Local Coordinate System; 2.1.1.2 Tangential Surface Vector; 2.1.1.3 Volume and Surface Integrals; 2.1.2 Derivation of Generalized Transmission-Line Equations; 2.1.2.1 Continuity Equation; 2.1.2.2 Reconstruction of the Densities; 2.1.3 Mixed Potential Integral Equation
2.1.3.1 Thin-Wire Approximation
Record Nr. UNINA-9910826929703321
Nitsch Jurgen  
Hoboken, NJ, : J. Wiley, c2009
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui