NONLINEAR VIBRATION ANALYSIS OF EULER-BERNOULLI BEAMS BY USING CONTINUOUS GALERKIN-PETROV TIME-DISCRETIZATION METHOD
Keywords:
NONLINEAR VIBRATION, EULER-BERNOULLI BEAMS, TIME DISCRETIZATION, NUMERICAL METHODAbstract
IN THIS PAPER, WE PRESENT A NEW NUMERICAL METHOD FOR NONLINEAR VIBRATIONAL ANALYSIS OF EULER-BERNOULLI BEAMS. OUR APPROACH IS BASED ON THE CONTINUOUS GALERKIN-PETROV TIME DISCRETIZATION METHOD. THE EULER-BERNOULLI BEAM EQUATION WHICH GOVERNS ITS VIBRATIONS IS TRANSFORMED INTO SET OF ORDINARY DIFFERENTIAL EQUATIONS AND THE PRESENTED METHOD IS EMPLOYED IN ORDER TO INVESTIGATE THE VIBRATIONAL RESPONSE. A COMPARISON IS MADE BETWEEN PRESENT METHOD AND DIFFERENT OTHER METHODS AVAILABLE IN LITERATURE. IT IS OBSERVED THAT THE OBTAINED RESULTS ARE IN STRONG AGREEMENT WITH OTHER RESULTS IN LITERATURE. WE CONCLUDE THAT THE PRESENT METHOD HAS A GREAT POTENTIAL TO DEAL WITH NONLINEAR VIBRATION ANALYSIS PROBLEMS OF BEAMS AND RELATED STRUCTURES LIKE RODS AND SHAFTS.
Downloads
Published
2017-07-10
Issue
Section
Articles
License
Authors who publish with this journal agree to the following terms:
- Authors retain copyright and grant the journal right of first publication with the work simultaneously licensed under a Creative Commons Attribution License [CC BY] that allows others to share the work with an acknowledgement of the work's authorship and initial publication in this journal.
- Authors are able to enter into separate, additional contractual arrangements for the non-exclusive distribution of the journal's published version of the work (e.g., post it to an institutional repository or publish it in a book), with an acknowledgement of its initial publication in this journal.
- Authors are permitted and encouraged to post their work online (e.g., in institutional repositories or on their website) prior to and during the submission process, as it can lead to productive exchanges, as well as earlier and greater citation of published work (See The Effect of Open Access).