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Keyword [a posteriori]
Result: 61 - 80 | Page: 4 of 6
61. Deterministic Regularization Methods And Bayesian Approach To Ill-posed Problems
62. FEM For Helmholtz Equation With High Wave Number And Perfectly Matched Layer Truncation
63. Adaptive Finite Element Methods For Diffraction Grating Problems With PML And Few-Mode DtN Truncations
64. High Efficient Time Stepping Methods For Dynamic Equations-Algorithm Design,Analysis And Application
65. Two-grid And Adaptive Finite Element Methods For Poisson-nernst-planck Equations
66. A Posteriori Error Estimates Of The Crank-Nicolson Method For Parabolic Equation With Delay
67. A Posteriori Error Estimates For The Variable BDF2 Method For Parabolic Equations
68. Goal Oriented A Posteriori Error Estimation And Convergent Adaptive Finite Element Method For Elliptic Equation
69. A New A Posteriori Error Estimate For The Interior Penalty Discontinuous Galerkin Method
70. A Study On Multi-energy X-ray CT Technology And Its Application Based On Photon Counting Detector
71. Stability And A Posteriori Estimate For The Variable Step-size BDF2 Method For Parabolic Equation With Delay
72. A Priori And A Posteriori Error Estimates Of H~1-Galerkin Mixed Finite Element Methods For Optimal Control Problems Governed By Pseudo-Hyperbolic Integro-Differential Equations
73. Gradient Recovery Based A Posteriori Error Estimation And The Adaptive Finite Element Method For Semilinear Elliptic Equations
74. Recovery Type A Posteriori Error Estimation For Adaptive Virtual Element Method
75. Convergence Analysis Of Adaptive Moving Grid Methods For Sever Classes Of Singularly Perturbed Problems
76. Research On Surface Movement Deformation Of Mining Subsidence Area Based On Maximum Posterior Adaptive Extended Kalman Filter
77. The A Posteriori Error Estimates For The Time-dependent Poisson-Nernst-Planck Equations
78. A posteriori error estimates for time-dependent Hamilton-Jacobi equations
79. In Defense of A Posteriori Minimal Physicalism
80. Adaptive finite element approximation of the Black-Scholes equation based on residual-type a posteriori error estimators
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