Sentence examples for solution maps from inspiring English sources
We generalize the analysis of sparsity of parametric forward solution maps in [20] and of Bayesian inversion in [48,49] to the fully discrete setting, including Petrov Galerkin high-fidelity ("HiFi") discretization of the forward maps.
There are some papers discussing the upper and/or lower semicontinuity of solution maps.
Now, we present the coderivative estimate and Lipschitz-like property of lower-level solution maps.
We also study the continuity of ε-approximate solution maps for (PEP).
The following example illustrates that Theorem 16 cannot apply with exact solution maps to (PEP).
We also give the sufficient conditions for the continuity of ε-approximate solution maps to equilibrium problems.
Such a result implies that the solution map itself is discontinuous in ˙B−1,∞∞ at the origin.
The voxel method is adopted in updating the moving boundaries of cavities without remeshing and mesh-to-mesh solution mapping.
The matching frequency and matching thickness is estimated in a solution map of impedance matching with variation of the film composition and the amount of microspheres.
We establish sufficient conditions for the lower semi-continuous property of the efficient solution map of (QCSVO) under functional perturbations of both the objective function and the constraints.
This paper is concerned with the lower semi-continuity of the efficient (Pareto) solution map for the perturbed quasiconvex semi-infinite vector optimization problem (QCSVO).
