In this paper we show that the introduction of an attenuation factor in the brightness equations relative to various perspective shape-from-shading models allows us to make the corresponding differential problems well-posed. We propose a unified approach based on the theory of viscosity solutions and we show that the brightness equations with the attenuation term admit a unique viscosity solution. We also discuss in detail the possible boundary conditions that we can use for the Hamilton-Jacobi equations associated to these models.
CAMILLI, F., TOZZA, S. (2017). A Unified Approach to the Well-Posedness of some Non-Lambertian Models in Shape-from-Shading Theory. SIAM JOURNAL ON IMAGING SCIENCES, 10(1), 26-46 [10.1137/16M1066397].
A Unified Approach to the Well-Posedness of some Non-Lambertian Models in Shape-from-Shading Theory
TOZZA, SILVIA
2017
Abstract
In this paper we show that the introduction of an attenuation factor in the brightness equations relative to various perspective shape-from-shading models allows us to make the corresponding differential problems well-posed. We propose a unified approach based on the theory of viscosity solutions and we show that the brightness equations with the attenuation term admit a unique viscosity solution. We also discuss in detail the possible boundary conditions that we can use for the Hamilton-Jacobi equations associated to these models.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
