图 1  虚拟网格法的二维插值格式　(a)无虚拟网格; (b)一个虚拟网格; (c)两个虚拟网格

Fig. 1.  Two-dimensional interpolation stencil of the ghost cell method: (a) No ghost cells; (b) one ghost cell; (c) two ghost cells.

图 2  静止或运动边界流动求解算法的流程图

Fig. 2.  Flowchart of numerical algorithm for stationary or moving boundary flows.

图 3  五个频率下的力系数比较　(a) 平均阻力系数; (b) 均方根升力系数

Fig. 3.  Comparison of force coefficients under five oscillation frequencies: (a) Average drag coefficient; (b) root mean square lift coefficient.

图 4  三个频率下升阻力系数随无因次时间的变化趋势　(a) 阻力系数; (b) 升力系数

Fig. 4.  Variation of drag and lift coefficients with the dimensionless time under three oscillation frequencies: (a) Drag coefficient; (b) lift coefficient.

图 5  $\omega $ = 0.15时在两个时刻的局部瞬时涡等值线　(a) $\theta = $$ {\text{π}}/2$; (b) $\theta = 3{\text{π}}/2$

Fig. 5.  Local instantaneous vortex contours for $\omega $ = 0.15 at two moments: (a) $\theta = {\text{π}}/2$; (b) $\theta = 3{\text{π}}/2$.

图 7  $\omega $ = 0.75时在两个时刻的局部瞬时涡等值线　(a) $\theta = $${\text{π}}/2$; (b) $\theta = 3{\text{π}}/2$

Fig. 7.  Local instantaneous vortex contours for $\omega $= 0.75 at two moments: (a) $\theta = {\text{π}}/2$; (b) $\theta = 3{\text{π}}/2$.

图 6  $\omega $ = 0.45时在两个时刻的局部瞬时涡等值线　(a) $\theta = $$ {\text{π}}/2$; (b) $\theta = 3{\text{π}}/2$

Fig. 6.  Local instantaneous vortex contours for$\omega $ = 0.45 at two moments: (a) $\theta = {\text{π}}/2$; (b) $\theta = 3{\text{π}}/2$.

图 8  阵列布置水翼游动的几何模型

Fig. 8.  Geometrical model of the undulating hydrofoil in array arrangement.

图 9  三个间距下群游中间位置水翼和单水翼在五个频率下的力系数比较　(a)平均阻力系数; (b)均方根升力系数

Fig. 9.  Comparison of force coefficients between the central hydrofoil in array arrangement for three gap distances and the single hydrofoil under five frequencies: (a) Average drag coefficient; (b) root mean square lift coefficient.

图 10  群游中间位置水翼在三个频率下升阻力系数随无因次时间的变化趋势　(a)阻力系数; (b)升力系数

Fig. 10.  Variation of drag and lift coefficients on the central hydrofoil in array arrangement with the dimensionless time under three oscillation frequencies: (a) Drag coefficient; (b) lift coefficient.

图 11  $\omega $ = 0.15时在两时刻的水翼群游局部涡场图　 (a) $\theta = {\text{π}}/2$; (b) $\theta = 3{\text{π}}/2$

Fig. 11.  Local instantaneous vortex contours of undulating hydrofoils in array arrangement for $\omega $ = 0.15 at two moments: (a) $\theta = {\text{π}}/2$; (b) $\theta = 3{\text{π}}/2$.

图 12  $\omega $ = 0.45时在两时刻的水翼群游局部涡场图　(a) $\theta = $$ {\text{π}}/2$; (b) $\theta = 3{\text{π}}/2$

Fig. 12.  Local instantaneous vortex contours of undulating hydrofoils in array arrangement for $\omega $ = 0.45 at two moments: (a) $\theta = {\text{π}}/2$; (b) $\theta = 3{\text{π}}/2$.

图 13  $\omega $ = 0.75时在两时刻的水翼群游局部涡场图　(a) $\theta = $$ {\text{π}}/2$; (b) $\theta = 3{\text{π}}/2$

Fig. 13.  Local instantaneous vortex contours of undulating hydrofoils in array arrangement for $\omega $ = 0.75 at two moments: (a) $\theta = {\text{π}}/2$; (b) $\theta = 3{\text{π}}/2$.