Hongyun Yue scite author profile

This paper presents a new numerical method and analysis for solving second-order elliptic interface problems. The method uses a modified nonconforming rotated Q1 immersed finite element (IFE) space to discretize the state equation required in the variational discretization approach. Optimal order error estimates are derived in L2-norm and broken energy norm. Numerical examples are provided to confirm the theoretical results.

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The initial boundary value problem for quasi-linear wave equation with viscous damping

Chen¹,

Yue²,

Wang³

2007

Journal of Mathematical Analysis and Applications

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Hongyun Yue

Fast difference scheme for the reaction-diffusion-advection equation with exact artificial boundary conditions

Long Time Behavior for a Wave Equation with Time Delay

Optimal Order Error Estimates of a Modified Nonconforming Rotated Q1 IFEM for Interface Problems

The initial boundary value problem for quasi-linear wave equation with viscous damping

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