RT Journal Article ID 10d3343d7ddb85d2 A1 Zhong, Xinran A1 Sun, WaiChing T1 AN ADAPTIVE REDUCED-DIMENSIONAL DISCRETE ELEMENT MODEL FOR DYNAMIC RESPONSES OF GRANULAR MATERIALS WITH HIGH-FREQUENCY NOISES JF International Journal for Multiscale Computational Engineering JO JMC YR 2018 FD 2018-08-13 VO 16 IS 4 SP 345 OP 366 K1 model reduction K1 proper orthogonal decomposition K1 high-frequency issue K1 dynamic responses K1 discrete element model AB We present a dimensional-reduction framework based on proper orthogonal decomposition (POD) for the nondissipative explicit dynamic discrete element method (DEM) simulations. Through Galerkin projection, we introduce a finite dimensional space with lower number of degree of freedoms such that the discrete element simulations are not only faster but also free of high-frequency noises. Since this method requires no injection of artificial or numerical damping, there is no need to tune damping parameters. The suppression of high-frequency responses allows a larger time step for faster explicit integration. To capture the highly nonlinear behaviors due to particle rearrangement, an automatic mode-update scheme is formulated such that the most efficient basis can be used to predict mechanical responses. Numerical examples including the wave propagation simulations and uniaxial extension and compression tests are used to demonstrate the capacity of the reduced-order model. PB Begell House LK https://www.dl.begellhouse.com/journals/61fd1b191cf7e96f,77bb56c9113fd8ad,10d3343d7ddb85d2.html