Title :
Projective analysis of 2-D images
Author :
Dibos, Françoise
Author_Institution :
Ceremad, Paris IX Univ., France
fDate :
3/1/1998 12:00:00 AM
Abstract :
The use of the heatlike equation has been extended to the projective case in order to find a projective analysis of curves and images; unfortunately, this formulation leads to a fifth-order partial differential equation (PDE) that is not easy to implement. Thanks to the use of a three-dimensional (3-D) homogeneous representation of a picture, we present an alternative. Roughly speaking, it is a kind of decomposition of the heatlike formulation with well-posed second-order PDEs. The number of parameters goes from one to three (the scale parameter and two direction parameters). Moreover, this study allows us to propose a simplified multiscale analysis, which is given by an unique PDE (one parameter), for the subgroup of the projective transformations associated, up to a nonzero scalar factor, to an orthogonal 3×3 matrix
Keywords :
image representation; image sequences; matrix algebra; parameter estimation; partial differential equations; 2D images; 3D homogeneous picture representation; curves; direction parameters; heatlike equation; heatlike formulation decomposition; image sequences; multiscale analysis; nonzero scalar factor; orthogonal matrix; projective analysis; projective transformations subgroup; scale parameter; second-order partial differential equation; Cameras; Computational geometry; Computer vision; Differential equations; Image analysis; Image sequence analysis; Matrix decomposition; Partial differential equations; Smoothing methods;
Journal_Title :
Image Processing, IEEE Transactions on
