Inverse problems on low-dimensional manifolds

Abstract: We consider abstract inverse problems between infinite-dimensional Banach spaces. These inverse problems are typically nonlinear and ill-posed, making the inversion with limited and noisy measurements a delicate process. In this work, we assume that the unknown belongs to a finite-dimensional manifold: this assumption arises in many real-world scenarios where natural objects have a low intrinsic dimension and belong to a certain submanifold of a much larger ambient space. We prove uniqueness and Hölder and Lip… Show more

“…Our idea is to first estimate the L 2 norm of (γ (1) − γ (2) ) on W 1 , namely δ 2 , by means of δ * 1 and then to estimate the L 2 norm of (q (2) − q (1) ) on W 1 , namely δ2 , in terms of δ 2 .…”

“…This result was subsequently extended by Di Cristo and Rondi [23] for the inverse scattering problem and by Sincich [41] for the corrosion detection problem. Recently, in [2], Alberti et al have extended these ideas by proving that for coefficients belonging to finite dimensional manifolds, uniqueness and stability are guaranteed. In this direction, Lipschitz stability estimates have been proved for real and complex finite dimensional isotropic coefficients ([8, 6, 17]), for a special type of anisotropic conductivities ( [28,25]), for polyhedral inclusions in a conductive medium ([19, 13, 18]), for the non local operator ( [39]) and for the elasticity case ( [24]).…”

Stable determination of an anisotropic inclusion in the Schrödinger equation from local Cauchy data

“…Our idea is to first estimate the L 2 norm of (γ (1) − γ (2) ) on W 1 , namely δ 2 , by means of δ * 1 and then to estimate the L 2 norm of (q (2) − q (1) ) on W 1 , namely δ2 , in terms of δ 2 .…”

“…This result was subsequently extended by Di Cristo and Rondi [23] for the inverse scattering problem and by Sincich [41] for the corrosion detection problem. Recently, in [2], Alberti et al have extended these ideas by proving that for coefficients belonging to finite dimensional manifolds, uniqueness and stability are guaranteed. In this direction, Lipschitz stability estimates have been proved for real and complex finite dimensional isotropic coefficients ([8, 6, 17]), for a special type of anisotropic conductivities ( [28,25]), for polyhedral inclusions in a conductive medium ([19, 13, 18]), for the non local operator ( [39]) and for the elasticity case ( [24]).…”

Stable determination of an anisotropic inclusion in the Schrödinger equation from local Cauchy data

“…Combining this with (21) and (17), we can replace boundedness of ( f N ) L ∞ (Ω) by boundedness of f N L ∞ (Ω y ) , and use the weaker regularizer…”

“…some examples for Lipschitz continuous and coercive activation functions are: ReLU, Leaky ReLU (coercive on R), softplus etc. Assume further that the exact f † can be expressed exactly via a NN, possibly with infinitely many hyperparameters, say f † ∈ C ∞ with f † (0) = 0, similar to (21) we have…”

“…In our case, X N = (Z × V) K × C N , so X N is a linear space in case of a linear activation function σ albeit not necessarily finite dimensional (for approximation on manifolds, see e.g. [21]). It yields the kth iterate…”

Discretization of parameter identification in PDEs using neural networks

Lipschitz stability estimate for the simultaneous recovery of two coefficients in the anisotropic Schrödinger type equation via local Cauchy data