Qi Xia Liu
Wuhan University of Technology
9 Papers
2 Citations
Qi Xia Liu is an academic researcher from Wuhan University of Technology. The author has contributed to research in topics: Computer science & Geology. The author has an hindex of 1, co-authored 4 publications.
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Papers
Implementation of efficient low-storage techniques for 3-D seismic simulation using the curved grid finite-difference method
TL;DR: In this paper , the authors developed three optimized multi-GPU solvers for seismic simulation using the curved grid finite-difference method (CGFDM), and performed a series of seismic simulations to verify the accuracy, stability, and validity of the optimized solver coupled with the two techniques.
3
Comparing and Selecting the Dewatering Schemes of Tibet Linzhi Duobu Hydropower Station Underground Factory Buildings
TL;DR: Based on the analysis of the Tibet Linzhi Duobu hydropower stations geological conditions, the review of the permeability coefficient, total water inflow estimation of foundation pit and other foundation researches compares and selects water-lowering schemes when the excavation of underground factory buildings starts.
1
Architectural Design of Green Campus
Qi Xia Liu,Xin Zou,Jun Yan Deng +2 more
TL;DR: In this paper, the authors analyzed the design technique of ecological building in different areas according to characteristics and priorities of different areas, the different models of design are built and the different means of energy conservation and emission reduction are adopted in this paper.
1
Research on vehicle 3D data measurement method based on line laser scanning
Qi Xia Liu,Xin Jin,Yuchu Zou,Wei Zhang +3 more
- 24 Jun 2022
TL;DR: A three-dimensional data measurement method of vehicle surface based on line laser sensor is proposed in this paper and shows that this method is feasible.
The Symplectic System for Thermo-Viscoelastic Cylinders
Wei Xiang Zhang,Qi Xia Liu +1 more
TL;DR: In this paper, an exact symplectic approach is presented for the isotropic viscoelastic solids subjected to external force and temperature boundary conditions, with the use of the method of separation of variables, all the general solutions of the governing equations are derived in the Laplace domain.