We deal with an inverse problem where we want to determine the surface of an object using the information contained in two or more pictures which correspond to different light conditions. In particular, we will examine the case where the light source direction varies between the pictures and we will show how these additional information allow to obtain a uniqueness result solving the well known convex/concave ambiguity of the Shape-from-Shading problem. We will prove a uniqueness result for weak (Lipschitz continuous) solutions that improves previous results. We also propose some approximation schemes for the numerical solution of this problem and analyze the properties of two approximation schemes: an up-wind finite difference and a Semi-Lagrangian scheme. Finally, we present some numerical tests on smooth and non-smooth surfaces coming from virtual and real images.
Uniqueness and approximation of a photometric shape-from-shading model / Roberto, Mecca; Falcone, Maurizio. - In: SIAM JOURNAL ON IMAGING SCIENCES. - ISSN 1936-4954. - ELETTRONICO. - 6:1(2013), pp. 616-659. [10.1137/110857258]
Uniqueness and approximation of a photometric shape-from-shading model
FALCONE, Maurizio
2013
Abstract
We deal with an inverse problem where we want to determine the surface of an object using the information contained in two or more pictures which correspond to different light conditions. In particular, we will examine the case where the light source direction varies between the pictures and we will show how these additional information allow to obtain a uniqueness result solving the well known convex/concave ambiguity of the Shape-from-Shading problem. We will prove a uniqueness result for weak (Lipschitz continuous) solutions that improves previous results. We also propose some approximation schemes for the numerical solution of this problem and analyze the properties of two approximation schemes: an up-wind finite difference and a Semi-Lagrangian scheme. Finally, we present some numerical tests on smooth and non-smooth surfaces coming from virtual and real images.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.