Identification of deformable droplets from boundary measurements: the case of non-stationary Stokes problem

Figures & data

Figure 1. T = 1, $\delta =2.5$: (a) distribution of the singular values of A for n = 10 source points; (b) gloss level map of $I_{u_0}\left(z\right)$, $u_0=e_1+e_2$, for $z\in \mathrm{\Omega }$.

Figure 2. T = 3, $\delta =2.5$: (a) distribution of the singular values of A for n = 10 source points; (b) gloss level map of $I_{u_0}\left(z\right)$, $u_0=e_1+e_2$, for $z\in \mathrm{\Omega }$.

Figure 3. T = 1, $\delta =4$: (a) distribution of the singular values of A for n = 14 source points; (b) gloss level map of $I_{u_0}\left(z\right)$, $u_0=e_1$, for $z\in \mathrm{\Omega }$.