数学学科Seminar第2647讲 基于动态模态分解的参数化空间高维偏微分方程的高效降阶模型

创建时间:  2024/04/30  龚惠英   浏览次数:   返回

报告题目 (Title):An efficient reduced-order model based on dynamic mode decomposition for parameterized spatial high-dimensional PDEs(基于动态模态分解的参数化空间高维偏微分方程的高效降阶模型)

报告人 (Speaker):孙祥(中国海洋大学)

报告时间 (Time):2024年05月01日(周三) 15:00-17:00

报告地点 (Place):校本部F309

邀请人(Inviter):潘晓敏

主办部门:永利数学系

报告摘要: Dynamic mode decomposition (DMD), as a data-driven method, has been frequently used to construct reduced-order models (ROMs) due to its good performance in time extrapolation. However, existing DMD-based ROMs suffer from high storage and computational costs for high-dimensional problems. To mitigate this problem, we develop a new DMD-based ROM, i.e., TDMD-GPR, by combining tensor train decomposition (TTD) and Gaussian process regression (GPR), where TTD is used to decompose the high-dimensional tensor into multiple factors, including parameter-dependent and time-dependent factors. Parameter-dependent factor is fed into GPR to build the map between parameter value and factor vector. For any parameter value, multiplying the corresponding parameter-dependent factor vector and the time-dependent factor matrix, the result describes the temporal behavior of the spatial basis for this parameter value and is then used to train the DMD model. In addition, incremental singular value decomposition is adopted to acquire a collection of important instants, which can further reduce the computational and storage costs of TDMD-GPR. The comparison TDMD and standard DMD in terms of computational and storage complexities shows that TDMD is more advantageous. The performance of the TDMD and TDMD-GPR is assessed through several cases, and the numerical results confirm the effectiveness of them.

上一条:永利核心数学研究所——几何与分析综合报告第78讲 2-HESSIAN 方程的狄利克雷问题的极弱解

下一条:数学学科Seminar第2646讲 H(div)一致性HDG方法在斯托克斯方程与纳维-斯托克斯方程的应力-速度表述中的应用


数学学科Seminar第2647讲 基于动态模态分解的参数化空间高维偏微分方程的高效降阶模型

创建时间:  2024/04/30  龚惠英   浏览次数:   返回

报告题目 (Title):An efficient reduced-order model based on dynamic mode decomposition for parameterized spatial high-dimensional PDEs(基于动态模态分解的参数化空间高维偏微分方程的高效降阶模型)

报告人 (Speaker):孙祥(中国海洋大学)

报告时间 (Time):2024年05月01日(周三) 15:00-17:00

报告地点 (Place):校本部F309

邀请人(Inviter):潘晓敏

主办部门:永利数学系

报告摘要: Dynamic mode decomposition (DMD), as a data-driven method, has been frequently used to construct reduced-order models (ROMs) due to its good performance in time extrapolation. However, existing DMD-based ROMs suffer from high storage and computational costs for high-dimensional problems. To mitigate this problem, we develop a new DMD-based ROM, i.e., TDMD-GPR, by combining tensor train decomposition (TTD) and Gaussian process regression (GPR), where TTD is used to decompose the high-dimensional tensor into multiple factors, including parameter-dependent and time-dependent factors. Parameter-dependent factor is fed into GPR to build the map between parameter value and factor vector. For any parameter value, multiplying the corresponding parameter-dependent factor vector and the time-dependent factor matrix, the result describes the temporal behavior of the spatial basis for this parameter value and is then used to train the DMD model. In addition, incremental singular value decomposition is adopted to acquire a collection of important instants, which can further reduce the computational and storage costs of TDMD-GPR. The comparison TDMD and standard DMD in terms of computational and storage complexities shows that TDMD is more advantageous. The performance of the TDMD and TDMD-GPR is assessed through several cases, and the numerical results confirm the effectiveness of them.

上一条:永利核心数学研究所——几何与分析综合报告第78讲 2-HESSIAN 方程的狄利克雷问题的极弱解

下一条:数学学科Seminar第2646讲 H(div)一致性HDG方法在斯托克斯方程与纳维-斯托克斯方程的应力-速度表述中的应用

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