X
X. Q. Wang
Researcher at Arizona State University
Publications - 28
Citations - 239
X. Q. Wang is an academic researcher from Arizona State University. The author has contributed to research in topics: Nonlinear system & Finite element method. The author has an hindex of 7, co-authored 27 publications receiving 185 citations.
Papers
More filters
Proceedings ArticleDOI
Response of a panel to shock impingement: Modeling and comparison with experiments - part 2
Abhijit Gogulapati,Rohit Deshmukh,Jack J. McNamara,Varun Vyas,X. Q. Wang,Marc P. Mignolet,Timothy J. Beberniss,S. M. Spottswood,Thomas Eason +8 more
Proceedings ArticleDOI
Nonlinear reduced order models for thermoelastodynamic response of isotropic and fgm panels
TL;DR: In this article, the authors developed and validated a reduced-order model for the geometrically nonlinear response and temperature of heated structures, based on a modal-type expansion of both displacements and temperatures in the undeformed, unheated configuration.
Proceedings ArticleDOI
Nonlinear structural reduced order modeling methods for hypersonic structures
TL;DR: In this article, a beam structural model of a 3D hypersonic panel is considered in isothermal conditions to extend the validation of nonlinear reduced order modeling methods to complex structural models.
Journal ArticleDOI
Prediction of displacement and stress fields of a notched panel with geometric nonlinearity by reduced order modeling
TL;DR: In this paper, the authors assess the predictive capabilities of nonlinear geometric reduced order models for the prediction of the large displacement and stress fields of panels with localized geometric defects, the case of a notch serving to exemplify the analysis.
Journal ArticleDOI
Timoshenko beam theory: A perspective based on the wave-mechanics approach
X. Q. Wang,Rmc M. C. So +1 more
TL;DR: In this article, a review of wave mechanics of finite-length Timoshenko beams is presented, where wave solutions of an infinite Timoshenko beam are first discussed and the splitting effect of spinning on wave solutions is also reviewed.