HIGH ORDER COMPACT FINITE DIFFERENCE SCHEMES FOR THE HELMHOLTZ EQUATION WITH DISCONTINUOUS COEFFICIENTS

Xiufang, Feng, Zhilin, Li, Zhonghua Zhonghua, Qiao Qiao

Type: Article

Publication Date: 2011-01-01

Citations: 0

Locations

计算数学：英文版 - View

Similar Works

Action	Title	Year	Authors
+	COMPACT FOURTH-ORDER FINITE DIFFERENCE SCHEMES FOR HELMHOLTZ EQUATION WITH HIGH WAVE NUMBERS	2008	Yiping Fu
+	Fourth‐order compact schemes for the Helmholtz equation	2002	Seongjai Kim
+	Highly Accurate Finite Difference Schemes for the Three-Dimensional Helmholtz Equation	2023	Neelesh Kumar
+	An optimal compact sixth-order finite difference scheme for the Helmholtz equation	2018	Tingting Wu Ruimin Xu
+	Fourth-Order Compact Schemes for Helmholtz Equations with Piecewise Wave Numbers in the Polar Coordinates	2016	Xiaolu Su Xiaolu Su Xiufang Feng Zhilin Li Zhilin Li
+ PDF Chat	Sixth-Order Compact Finite Difference Method for 2D Helmholtz Equations with Singular Sources and Reduced Pollution Effect	2023	Qiwei Feng Zhang Yuan-yua Michelle Michelle
+ PDF Chat	High-order numerical method for the nonlinear Helmholtz equation with material discontinuities in one space dimension	2007	Guy Baruch Gadi Fibich Semyon Tsynkov
+	Development of a new sixth order accurate compact scheme for two and three dimensional Helmholtz equation	2019	Neelesh Kumar Ritesh Kumar Dubey
+	Tenth Order Compact Finite Difference Schemes for One Dimensional Helmholtz Equations Using Neumann Boundary Condition	2019	Oyakhire Friday Ighaghai
+	Single cell high order difference methods for the Helmholtz equation	1983	Ram P. Manohar J. W. Stephenson
+	Compact finite difference methods using local analytic basis functions for the Helmholtz equation	2017	박현서
+	High-Order Compact Difference Scheme for Solving Two-dimensional Helmholtz Equation	2010	Guotao Liu
+	High-order Implicit Compact Difference Scheme for Solving the Three-dimensional Helmholtz Equation	2010	GE Yong-bin
+	Development of a new sixth order accurate compact scheme for two and three dimensional Helmholtz equation.	2019	Neelesh Kumar Ritesh Kumar Dubey
+	New Sixth-Order Compact Schemes for Poisson/Helmholtz Equations	2023	Hongling Hu Hongling Hu Kejia Pan Zhilin Li Zhilin Li Kang Fu Zhilin Li Hongling Hu Hongling Hu Zhilin Li Zhilin Li
+	THE PRECONDITIONER FOR LINEAR EQUATIONS DISCRETIZED FROM TWO-DIMENSIONAL HELMHOLTZ EQUATION BY COMBINED COMPACT DIFFERENCE SCHEMES	2017	Qilun Luo Wen Li
+	A learning based numerical method for Helmholtz equations with high frequency	2024	Yu Chen Cheng Jin Tingyue Li Yun Miao
+	A sixth order fast direct helmholtz equation solver	1980	Elias N. Houstis Robert E. Lynch Theodore S. Papatheodorou
+	Sixth Order Compact Finite Difference Method for 2D Helmholtz Equations with Singular Sources and Reduced Pollution Effect	2021	Qiwei Feng Bin Han Michelle Michelle
+	Compact Fourth-Order Finite Difference Scheme for Three-Dimensional Helmholtz Equation	2010	Yuanping Ma

Works That Cite This (0)

Action	Title	Year	Authors

Works Cited by This (0)

Action	Title	Year	Authors