1. A C0 linear finite element method for a second‐order elliptic equation in non‐divergence form with Cordes coefficients. Issue 3 (5th December 2022) Authors: Xu, Minqiang; Lin, Runchang; Zou, Qingsong Journal: Numerical methods for partial differential equations Issue: Volume 39:Issue 3(2023) Page Start: 2244 Record Type: Journal Article View Content: Available online (eLD content is only available in our Reading Rooms) ↗
2. A fault diagnosis scheme for planetary gearboxes using adaptive multi-scale morphology filter and modified hierarchical permutation entropy. (15th May 2018) Authors: Li, Yongbo; Li, Guoyan; Yang, Yuantao; Liang, Xihui; Xu, Minqiang Journal: Mechanical systems and signal processing Issue: Volume 105(2018) Page Start: 319 Record Type: Journal Article View Content: Available online (eLD content is only available in our Reading Rooms) ↗
3. A fault diagnosis scheme for planetary gearboxes using modified multi-scale symbolic dynamic entropy and mRMR feature selection. (July 2017) Authors: Li, Yongbo; Yang, Yuantao; Li, Guoyan; Xu, Minqiang; Huang, Wenhu Journal: Mechanical systems and signal processing Issue: Volume 91(2017) Page Start: 295 Record Type: Journal Article View Content: Available online (eLD content is only available in our Reading Rooms) ↗
4. A fault diagnosis scheme for rolling bearing based on local mean decomposition and improved multiscale fuzzy entropy. (6th January 2016) Authors: Li, Yongbo; Xu, Minqiang; Wang, Rixin; Huang, Wenhu Journal: Journal of sound and vibration Issue: Volume 360(2016) Page Start: 277 Record Type: Journal Article View Content: Available online (eLD content is only available in our Reading Rooms) ↗
5. A fault diagnosis scheme for rolling bearing based on local mean decomposition and improved multiscale fuzzy entropy. (6th January 2016) Authors: Li, Yongbo; Xu, Minqiang; Wang, Rixin; Huang, Wenhu Journal: Journal of sound and vibration Issue: Volume 360(2016) Page Start: 277 Record Type: Journal Article View Content: Available online (eLD content is only available in our Reading Rooms) ↗
6. A fault diagnosis scheme for rotating machinery using hierarchical symbolic analysis and convolutional neural network. (August 2019) Authors: Yang, Yuantao; Zheng, Huailiang; Li, Yongbo; Xu, Minqiang; Chen, Yushu Journal: ISA transactions Issue: Volume 91(2019) Page Start: 235 Record Type: Journal Article View Content: Available online (eLD content is only available in our Reading Rooms) ↗
7. A Hessian recovery-based finite difference method for biharmonic problems. (March 2023) Authors: Xu, Minqiang; Shi, Chungang Journal: Applied mathematics letters Issue: Volume 137(2023) Page Start: Record Type: Journal Article View Content: Available online (eLD content is only available in our Reading Rooms) ↗
8. A High-Order Numerical Method for a Nonlinear System of Second-Order Boundary Value Problems. (9th March 2020) Authors: Xu, Minqiang; Niu, Jing; Guo, Li Other Names: Schuster Thomas Academic Editor. Journal: Mathematical problems in engineering Issue: Volume 2020(2020) Page Start: Record Type: Journal Article View Content: Available online (eLD content is only available in our Reading Rooms) ↗
9. A new dynamic model and transfer learning based intelligent fault diagnosis framework for rolling element bearings race faults: Solving the small sample problem. (February 2022) Authors: Dong, Yunjia; Li, Yuqing; Zheng, Huailiang; Wang, Rixin; Xu, Minqiang Journal: ISA transactions Issue: Volume 121(2022) Page Start: 327 Record Type: Journal Article View Content: Available online (eLD content is only available in our Reading Rooms) ↗
10. A new intelligent fault identification method based on transfer locality preserving projection for actual diagnosis scenario of rotating machinery. (1st January 2020) Authors: Zheng, Huailiang; Wang, Rixin; Yin, Jiancheng; Li, Yuqing; Lu, Haiqing; Xu, Minqiang Journal: Mechanical systems and signal processing Issue: Volume 135(2019) Page Start: Record Type: Journal Article View Content: Available online (eLD content is only available in our Reading Rooms) ↗