Free vibration of laminated cylindrical shells with a circular cutout

A. L. Poore, A. Barut, E. Madenci

Research output: Contribution to journalArticle

16 Scopus citations

Abstract

A semi-analytical solution method is presented for determining the natural frequencies and mode shapes of laminated cylindrical shells containing a circular cutout. The method utilizes Hamilton's principle to obtain the governing equations for the vibration response of the shell. In the derivation of governing equations, Lagrange multipliers are employed to relax the kinematic admissibility requirements on the displacement representations through the use of idealized elastic edge restraints. Specifying appropriate stiffness values for the elastic extensional and rotational edge restraints (springs) allows the imposition of the kinematic boundary conditions in an indirect manner, which enables the use of a broader set of functions for representing the displacement fields. The natural frequencies and the corresponding modes of the shell are determined by transforming the governing equations into a matrix eigenvalue problem. The present semi-analytical solution method accurately predicts the natural frequency and vibration modes of the shells with a cutout. The focus of this study is to investigate the effects of varying cutout size, shell radius, and laminate layup, as well as the effects of two types of boundary conditions on the shell vibration response. Selected results of the parametric studies are presented for several geometric parameters to demonstrate that this semi-analytical approach is a powerful means for optimizing design parameters.

Original languageEnglish (US)
Pages (from-to)55-73
Number of pages19
JournalJournal of Sound and Vibration
Volume312
Issue number1-2
DOIs
StatePublished - Apr 22 2008

ASJC Scopus subject areas

  • Condensed Matter Physics
  • Mechanics of Materials
  • Acoustics and Ultrasonics
  • Mechanical Engineering

Fingerprint Dive into the research topics of 'Free vibration of laminated cylindrical shells with a circular cutout'. Together they form a unique fingerprint.

  • Cite this