Natural frequencies and mode shapes of an orthotropic thin shell of revolution: Fid-Bau Portal

Fachinformationsdienst BAUdigital

Eine Plattform für die Wissenschaft: Bauingenieurwesen, Architektur und Urbanistik

Natural frequencies and mode shapes of an orthotropic thin shell of revolution

Wang, X.H. / Redekop, D.

AbstractA method is developed to determine the free vibration characteristics of an orthotropic thin shell of revolution of arbitrary meridian. A solution is given within the context of the Sanders–Budiansky shell theory and using the differential quadrature method (DQM). Numerical examples for frequencies and mode shapes are given for a complete toroidal shell. Both completely free shells, and shells with circumferential line supports are considered. Close agreement is observed in comparisons with previously published results and with results obtained using the finite element method. The paper ends with a set of appropriate conclusions.

Zugriff

Zugriff prüfen

Verfügbarkeit in meiner Bibliothek prüfen

Bestellung bei Subito €

Seitennavigation

Dokumentinformationen

Ähnliche Titel

Exportieren, teilen und zitieren

Natural frequencies and mode shapes of an orthotropic thin shell of revolution

Wang, X.H. / Redekop, D.

AbstractA method is developed to determine the free vibration characteristics of an orthotropic thin shell of revolution of arbitrary meridian. A solution is given within the context of the Sanders–Budiansky shell theory and using the differential quadrature method (DQM). Numerical examples for frequencies and mode shapes are given for a complete toroidal shell. Both completely free shells, and shells with circumferential line supports are considered. Close agreement is observed in comparisons with previously published results and with results obtained using the finite element method. The paper ends with a set of appropriate conclusions.

Natural frequencies and mode shapes of an orthotropic thin shell of revolution

Wang, X.H. / Redekop, D.

AbstractA method is developed to determine the free vibration characteristics of an orthotropic thin shell of revolution of arbitrary meridian. A solution is given within the context of the Sanders–Budiansky shell theory and using the differential quadrature method (DQM). Numerical examples for frequencies and mode shapes are given for a complete toroidal shell. Both completely free shells, and shells with circumferential line supports are considered. Close agreement is observed in comparisons with previously published results and with results obtained using the finite element method. The paper ends with a set of appropriate conclusions.

Zugriff

Zugriff prüfen

Verfügbarkeit in meiner Bibliothek prüfen

Bestellung bei Subito €

Seitennavigation

Dokumentinformationen

Ähnliche Titel

Exportieren, teilen und zitieren

Dokumentinformationen

Titel:

Natural frequencies and mode shapes of an orthotropic thin shell of revolution

Beteiligte:

Wang, X.H. (Autor:in) / Redekop, D. (Autor:in)

Erschienen in:

Thin-Walled Structures ; 43 ; 735-750

Erscheinungsdatum:

10.12.2004

Format / Umfang:

16 pages

ISSN:

DOI:

https://doi.org/10.1016/j.tws.2004.12.001

Medientyp:

Aufsatz (Zeitschrift)

Format:

Elektronische Ressource

Sprache:

Englisch

Schlagwörter:

Vibrations , Orthotropic shell , Differential quadrature , Finite elements

Ähnliche Titel

Natural frequencies and mode shapes of an orthotropic thin shell of revolution

Wang, X.H. | Online Contents | 2005

Extension of a semi-analytical approach to determine natural frequencies and mode shapes of a multi-span orthotropic bridge deck

Rezaiguia, A. / Fisli, Y. / Ellagoune, S. et al. | British Library Online Contents | 2012

Analysis of building frames for natural frequencies and natural mode shapes

LaTona, Raymond W. / Roesset V., Jose M. | TIBKAT | 1969

Orthotropic rotation-free thin shell elements

Munglani, G. / Vetter, R. / Wittel, F. K. et al. | British Library Online Contents | 2015

Numerical investigation of natural frequencies and mode shapes of air-supported structures

Николай Андреевич Мокин / Алексей Андреевич Кустов / Михаил Иоакимович Ганджунцев | DOAJ | 2018

Freier Zugriff