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Biblioteca

MARC Lista (tabellare)
Active and Passive Vibration Control of Structures [[electronic resource] /] / edited by Peter Hagedorn, Gottfried Spelsberg-Korspeter
Active and Passive Vibration Control of Structures [[electronic resource] /] / edited by Peter Hagedorn, Gottfried Spelsberg-Korspeter
Edizione [1st ed. 2014.]
Pubbl/distr/stampa Vienna : , : Springer Vienna : , : Imprint : Springer, , 2014
Descrizione fisica 1 online resource (316 p.)
Disciplina 624.17
Collana CISM International Centre for Mechanical Sciences, Courses and Lectures
Soggetto topico Vibration
Dynamical systems
Dynamics
Control engineering
Mechanics
Mechanics, Applied
Vibration, Dynamical Systems, Control
Control and Systems Theory
Solid Mechanics
ISBN 3-7091-1821-2
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto Mechanical systems: Equations of motion and stability -- Variational principles in mechanics and control -- Hybrid mass damper: A tutorial example -- Electromagnetic and piezoelectric transducers -- LMIs in control optimization -- Damping mechanisms -- Vibration control and failure diagnosis in rotating machinery by means of active magnetic bearings.
Record Nr. UNINA-9910299736303321
Vienna : , : Springer Vienna : , : Imprint : Springer, , 2014
Materiale a stampa
Lo trovi qui: Univ. Federico II
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Damping Optimization in Simplified and Realistic Disc Brakes [[electronic resource] /] / by Jan-Hendrik Wehner, Dominic Jekel, Rubens Sampaio, Peter Hagedorn
Damping Optimization in Simplified and Realistic Disc Brakes [[electronic resource] /] / by Jan-Hendrik Wehner, Dominic Jekel, Rubens Sampaio, Peter Hagedorn
Autore Wehner Jan-Hendrik
Edizione [1st ed. 2018.]
Pubbl/distr/stampa Cham : , : Springer International Publishing : , : Imprint : Springer, , 2018
Descrizione fisica 1 online resource (50 pages) : illustrations
Disciplina 620.37
Collana SpringerBriefs in Applied Sciences and Technology
Soggetto topico Vibration
Dynamical systems
Dynamics
Mathematical optimization
Automotive engineering
Vibration, Dynamical Systems, Control
Optimization
Automotive Engineering
ISBN 3-319-62713-9
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto Introduction -- Theoretical background -- Optimization of a minimal model of disc brake -- Optimization of finite element models of disc brakes -- Conclusion -- References.
Record Nr. UNINA-9910299873903321
Wehner Jan-Hendrik  
Cham : , : Springer International Publishing : , : Imprint : Springer, , 2018
Materiale a stampa
Lo trovi qui: Univ. Federico II
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Nonlinearity, bifurcation and chaos : theory and applications / / edited by Jan Awrejcewicz, Peter Hagedorn
Nonlinearity, bifurcation and chaos : theory and applications / / edited by Jan Awrejcewicz, Peter Hagedorn
Pubbl/distr/stampa Rijeka, Croatia : , : InTech, , [2012]
Descrizione fisica 1 online resource (xi, 344 pages) : illustrations
Disciplina 515.625
Soggetto topico Nonlinear difference equations
ISBN 953-51-5013-8
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Altri titoli varianti Nonlinearity, bifurcation and chaos
Record Nr. UNINA-9910137729003321
Rijeka, Croatia : , : InTech, , [2012]
Materiale a stampa
Lo trovi qui: Univ. Federico II
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Vibrations of continuous mechanical systems [[electronic resource] /] / Peter Hagedorn, Anirvan DasGupta
Vibrations of continuous mechanical systems [[electronic resource] /] / Peter Hagedorn, Anirvan DasGupta
Pubbl/distr/stampa Chichester, West Sussex, : John Wiley & Sons Ltd., 2007
Descrizione fisica 1 online resource (398 p.)
Disciplina 620.3
Altri autori (Persone) HagedornPeter
DasGuptaAnirvan
Soggetto topico Vibration
Soggetto genere / forma Electronic books.
ISBN 1-281-13533-X
9786611135331
0-470-51843-X
0-470-51842-1
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto Vibrations and Waves in Continuous Mechanical Systems; Contents; Preface; 1 Vibrations of strings and bars; 1.1 Dynamics of strings and bars: the Newtonian formulation; 1.1.1 Transverse dynamics of strings; 1.1.2 Longitudinal dynamics of bars; 1.1.3 Torsional dynamics of bars; 1.2 Dynamics of strings and bars: the variational formulation; 1.2.1 Transverse dynamics of strings; 1.2.2 Longitudinal dynamics of bars; 1.2.3 Torsional dynamics of bars; 1.3 Free vibration problem: Bernoulli's solution; 1.4 Modal analysis; 1.4.1 The eigenvalue problem; 1.4.2 Orthogonality of eigenfunctions
1.4.3 The expansion theorem1.4.4 Systems with discrete elements; 1.5 The initial value problem: solution using Laplace transform; 1.6 Forced vibration analysis; 1.6.1 Harmonic forcing; 1.6.2 General forcing; 1.7 Approximate methods for continuous systems; 1.7.1 Rayleigh method; 1.7.2 Rayleigh-Ritz method; 1.7.3 Ritz method; 1.7.4 Galerkin method; 1.8 Continuous systems with damping; 1.8.1 Systems with distributed damping; 1.8.2 Systems with discrete damping; 1.9 Non-homogeneous boundary conditions; 1.10 Dynamics of axially translating strings; 1.10.1 Equation of motion
1.10.2 Modal analysis and discretization1.10.3 Interaction with discrete elements; Exercises; References; 2 One-dimensional wave equation: d'Alembert's solution; 2.1 D'Alembert's solution of the wave equation; 2.1.1 The initial value problem; 2.1.2 The initial value problem: solution using Fourier transform; 2.2 Harmonic waves and wave impedance; 2.3 Energetics of wave motion; 2.4 Scattering of waves; 2.4.1 Reflection at a boundary; 2.4.2 Scattering at a finite impedance; 2.5 Applications of the wave solution; 2.5.1 Impulsive start of a bar; 2.5.2 Step-forcing of a bar with boundary damping
2.5.3 Axial collision of bars2.5.4 String on a compliant foundation; 2.5.5 Axially translating string; Exercises; References; 3 Vibrations of beams; 3.1 Equation of motion; 3.1.1 The Newtonian formulation; 3.1.2 The variational formulation; 3.1.3 Various boundary conditions for a beam; 3.1.4 Taut string and tensioned beam; 3.2 Free vibration problem; 3.2.1 Modal analysis; 3.2.2 The initial value problem; 3.3 Forced vibration analysis; 3.3.1 Eigenfunction expansion method; 3.3.2 Approximate methods; 3.4 Non-homogeneous boundary conditions
3.5 Dispersion relation and flexural waves in a uniform beam3.5.1 Energy transport; 3.5.2 Scattering of flexural waves; 3.6 The Timoshenko beam; 3.6.1 Equations of motion; 3.6.2 Harmonic waves and dispersion relation; 3.7 Damped vibration of beams; 3.8 Special problems in vibrations of beams; 3.8.1 Influence of axial force on dynamic stability; 3.8.2 Beam with eccentric mass distribution; 3.8.3 Problems involving the motion of material points of a vibrating beam; 3.8.4 Dynamics of rotating shafts; 3.8.5 Dynamics of axially translating beams; 3.8.6 Dynamics of fluid-conveying pipes; Exercises
References
Record Nr. UNISA-996200155903316
Chichester, West Sussex, : John Wiley & Sons Ltd., 2007
Materiale a stampa
Lo trovi qui: Univ. di Salerno
Opac: Controlla la disponibilità qui
Vibrations of continuous mechanical systems [[electronic resource] /] / Peter Hagedorn, Anirvan DasGupta
Vibrations of continuous mechanical systems [[electronic resource] /] / Peter Hagedorn, Anirvan DasGupta
Pubbl/distr/stampa Chichester, West Sussex, : John Wiley & Sons Ltd., 2007
Descrizione fisica 1 online resource (398 p.)
Disciplina 620.3
Altri autori (Persone) HagedornPeter
DasGuptaAnirvan
Soggetto topico Vibration
Soggetto genere / forma Electronic books.
ISBN 1-281-13533-X
9786611135331
0-470-51843-X
0-470-51842-1
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto Vibrations and Waves in Continuous Mechanical Systems; Contents; Preface; 1 Vibrations of strings and bars; 1.1 Dynamics of strings and bars: the Newtonian formulation; 1.1.1 Transverse dynamics of strings; 1.1.2 Longitudinal dynamics of bars; 1.1.3 Torsional dynamics of bars; 1.2 Dynamics of strings and bars: the variational formulation; 1.2.1 Transverse dynamics of strings; 1.2.2 Longitudinal dynamics of bars; 1.2.3 Torsional dynamics of bars; 1.3 Free vibration problem: Bernoulli's solution; 1.4 Modal analysis; 1.4.1 The eigenvalue problem; 1.4.2 Orthogonality of eigenfunctions
1.4.3 The expansion theorem1.4.4 Systems with discrete elements; 1.5 The initial value problem: solution using Laplace transform; 1.6 Forced vibration analysis; 1.6.1 Harmonic forcing; 1.6.2 General forcing; 1.7 Approximate methods for continuous systems; 1.7.1 Rayleigh method; 1.7.2 Rayleigh-Ritz method; 1.7.3 Ritz method; 1.7.4 Galerkin method; 1.8 Continuous systems with damping; 1.8.1 Systems with distributed damping; 1.8.2 Systems with discrete damping; 1.9 Non-homogeneous boundary conditions; 1.10 Dynamics of axially translating strings; 1.10.1 Equation of motion
1.10.2 Modal analysis and discretization1.10.3 Interaction with discrete elements; Exercises; References; 2 One-dimensional wave equation: d'Alembert's solution; 2.1 D'Alembert's solution of the wave equation; 2.1.1 The initial value problem; 2.1.2 The initial value problem: solution using Fourier transform; 2.2 Harmonic waves and wave impedance; 2.3 Energetics of wave motion; 2.4 Scattering of waves; 2.4.1 Reflection at a boundary; 2.4.2 Scattering at a finite impedance; 2.5 Applications of the wave solution; 2.5.1 Impulsive start of a bar; 2.5.2 Step-forcing of a bar with boundary damping
2.5.3 Axial collision of bars2.5.4 String on a compliant foundation; 2.5.5 Axially translating string; Exercises; References; 3 Vibrations of beams; 3.1 Equation of motion; 3.1.1 The Newtonian formulation; 3.1.2 The variational formulation; 3.1.3 Various boundary conditions for a beam; 3.1.4 Taut string and tensioned beam; 3.2 Free vibration problem; 3.2.1 Modal analysis; 3.2.2 The initial value problem; 3.3 Forced vibration analysis; 3.3.1 Eigenfunction expansion method; 3.3.2 Approximate methods; 3.4 Non-homogeneous boundary conditions
3.5 Dispersion relation and flexural waves in a uniform beam3.5.1 Energy transport; 3.5.2 Scattering of flexural waves; 3.6 The Timoshenko beam; 3.6.1 Equations of motion; 3.6.2 Harmonic waves and dispersion relation; 3.7 Damped vibration of beams; 3.8 Special problems in vibrations of beams; 3.8.1 Influence of axial force on dynamic stability; 3.8.2 Beam with eccentric mass distribution; 3.8.3 Problems involving the motion of material points of a vibrating beam; 3.8.4 Dynamics of rotating shafts; 3.8.5 Dynamics of axially translating beams; 3.8.6 Dynamics of fluid-conveying pipes; Exercises
References
Record Nr. UNINA-9910144584003321
Chichester, West Sussex, : John Wiley & Sons Ltd., 2007
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui
Vibrations of continuous mechanical systems [[electronic resource] /] / Peter Hagedorn, Anirvan DasGupta
Vibrations of continuous mechanical systems [[electronic resource] /] / Peter Hagedorn, Anirvan DasGupta
Pubbl/distr/stampa Chichester, West Sussex, : John Wiley & Sons Ltd., 2007
Descrizione fisica 1 online resource (398 p.)
Disciplina 620.3
Altri autori (Persone) HagedornPeter
DasGuptaAnirvan
Soggetto topico Vibration
ISBN 1-281-13533-X
9786611135331
0-470-51843-X
0-470-51842-1
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto Vibrations and Waves in Continuous Mechanical Systems; Contents; Preface; 1 Vibrations of strings and bars; 1.1 Dynamics of strings and bars: the Newtonian formulation; 1.1.1 Transverse dynamics of strings; 1.1.2 Longitudinal dynamics of bars; 1.1.3 Torsional dynamics of bars; 1.2 Dynamics of strings and bars: the variational formulation; 1.2.1 Transverse dynamics of strings; 1.2.2 Longitudinal dynamics of bars; 1.2.3 Torsional dynamics of bars; 1.3 Free vibration problem: Bernoulli's solution; 1.4 Modal analysis; 1.4.1 The eigenvalue problem; 1.4.2 Orthogonality of eigenfunctions
1.4.3 The expansion theorem1.4.4 Systems with discrete elements; 1.5 The initial value problem: solution using Laplace transform; 1.6 Forced vibration analysis; 1.6.1 Harmonic forcing; 1.6.2 General forcing; 1.7 Approximate methods for continuous systems; 1.7.1 Rayleigh method; 1.7.2 Rayleigh-Ritz method; 1.7.3 Ritz method; 1.7.4 Galerkin method; 1.8 Continuous systems with damping; 1.8.1 Systems with distributed damping; 1.8.2 Systems with discrete damping; 1.9 Non-homogeneous boundary conditions; 1.10 Dynamics of axially translating strings; 1.10.1 Equation of motion
1.10.2 Modal analysis and discretization1.10.3 Interaction with discrete elements; Exercises; References; 2 One-dimensional wave equation: d'Alembert's solution; 2.1 D'Alembert's solution of the wave equation; 2.1.1 The initial value problem; 2.1.2 The initial value problem: solution using Fourier transform; 2.2 Harmonic waves and wave impedance; 2.3 Energetics of wave motion; 2.4 Scattering of waves; 2.4.1 Reflection at a boundary; 2.4.2 Scattering at a finite impedance; 2.5 Applications of the wave solution; 2.5.1 Impulsive start of a bar; 2.5.2 Step-forcing of a bar with boundary damping
2.5.3 Axial collision of bars2.5.4 String on a compliant foundation; 2.5.5 Axially translating string; Exercises; References; 3 Vibrations of beams; 3.1 Equation of motion; 3.1.1 The Newtonian formulation; 3.1.2 The variational formulation; 3.1.3 Various boundary conditions for a beam; 3.1.4 Taut string and tensioned beam; 3.2 Free vibration problem; 3.2.1 Modal analysis; 3.2.2 The initial value problem; 3.3 Forced vibration analysis; 3.3.1 Eigenfunction expansion method; 3.3.2 Approximate methods; 3.4 Non-homogeneous boundary conditions
3.5 Dispersion relation and flexural waves in a uniform beam3.5.1 Energy transport; 3.5.2 Scattering of flexural waves; 3.6 The Timoshenko beam; 3.6.1 Equations of motion; 3.6.2 Harmonic waves and dispersion relation; 3.7 Damped vibration of beams; 3.8 Special problems in vibrations of beams; 3.8.1 Influence of axial force on dynamic stability; 3.8.2 Beam with eccentric mass distribution; 3.8.3 Problems involving the motion of material points of a vibrating beam; 3.8.4 Dynamics of rotating shafts; 3.8.5 Dynamics of axially translating beams; 3.8.6 Dynamics of fluid-conveying pipes; Exercises
References
Record Nr. UNINA-9910829984303321
Chichester, West Sussex, : John Wiley & Sons Ltd., 2007
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui
Vibrations of continuous mechanical systems [[electronic resource] /] / Peter Hagedorn, Anirvan DasGupta
Vibrations of continuous mechanical systems [[electronic resource] /] / Peter Hagedorn, Anirvan DasGupta
Pubbl/distr/stampa Chichester, West Sussex, : John Wiley & Sons Ltd., 2007
Descrizione fisica 1 online resource (398 p.)
Disciplina 620.3
Altri autori (Persone) HagedornPeter
DasGuptaAnirvan
Soggetto topico Vibration
ISBN 1-281-13533-X
9786611135331
0-470-51843-X
0-470-51842-1
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto Vibrations and Waves in Continuous Mechanical Systems; Contents; Preface; 1 Vibrations of strings and bars; 1.1 Dynamics of strings and bars: the Newtonian formulation; 1.1.1 Transverse dynamics of strings; 1.1.2 Longitudinal dynamics of bars; 1.1.3 Torsional dynamics of bars; 1.2 Dynamics of strings and bars: the variational formulation; 1.2.1 Transverse dynamics of strings; 1.2.2 Longitudinal dynamics of bars; 1.2.3 Torsional dynamics of bars; 1.3 Free vibration problem: Bernoulli's solution; 1.4 Modal analysis; 1.4.1 The eigenvalue problem; 1.4.2 Orthogonality of eigenfunctions
1.4.3 The expansion theorem1.4.4 Systems with discrete elements; 1.5 The initial value problem: solution using Laplace transform; 1.6 Forced vibration analysis; 1.6.1 Harmonic forcing; 1.6.2 General forcing; 1.7 Approximate methods for continuous systems; 1.7.1 Rayleigh method; 1.7.2 Rayleigh-Ritz method; 1.7.3 Ritz method; 1.7.4 Galerkin method; 1.8 Continuous systems with damping; 1.8.1 Systems with distributed damping; 1.8.2 Systems with discrete damping; 1.9 Non-homogeneous boundary conditions; 1.10 Dynamics of axially translating strings; 1.10.1 Equation of motion
1.10.2 Modal analysis and discretization1.10.3 Interaction with discrete elements; Exercises; References; 2 One-dimensional wave equation: d'Alembert's solution; 2.1 D'Alembert's solution of the wave equation; 2.1.1 The initial value problem; 2.1.2 The initial value problem: solution using Fourier transform; 2.2 Harmonic waves and wave impedance; 2.3 Energetics of wave motion; 2.4 Scattering of waves; 2.4.1 Reflection at a boundary; 2.4.2 Scattering at a finite impedance; 2.5 Applications of the wave solution; 2.5.1 Impulsive start of a bar; 2.5.2 Step-forcing of a bar with boundary damping
2.5.3 Axial collision of bars2.5.4 String on a compliant foundation; 2.5.5 Axially translating string; Exercises; References; 3 Vibrations of beams; 3.1 Equation of motion; 3.1.1 The Newtonian formulation; 3.1.2 The variational formulation; 3.1.3 Various boundary conditions for a beam; 3.1.4 Taut string and tensioned beam; 3.2 Free vibration problem; 3.2.1 Modal analysis; 3.2.2 The initial value problem; 3.3 Forced vibration analysis; 3.3.1 Eigenfunction expansion method; 3.3.2 Approximate methods; 3.4 Non-homogeneous boundary conditions
3.5 Dispersion relation and flexural waves in a uniform beam3.5.1 Energy transport; 3.5.2 Scattering of flexural waves; 3.6 The Timoshenko beam; 3.6.1 Equations of motion; 3.6.2 Harmonic waves and dispersion relation; 3.7 Damped vibration of beams; 3.8 Special problems in vibrations of beams; 3.8.1 Influence of axial force on dynamic stability; 3.8.2 Beam with eccentric mass distribution; 3.8.3 Problems involving the motion of material points of a vibrating beam; 3.8.4 Dynamics of rotating shafts; 3.8.5 Dynamics of axially translating beams; 3.8.6 Dynamics of fluid-conveying pipes; Exercises
References
Record Nr. UNINA-9910840665203321
Chichester, West Sussex, : John Wiley & Sons Ltd., 2007
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui