An Algebraic Approach to Camera Self-Calibration

This paper describes an algebraic approach to computing the system of adjoint curves to a given absolutely irreducible plane algebraic curve. The proposed algorithm utilizes the integral closure of the coordinate ring rather than expanding neighborhood graphs using quadratic transformations.

We show that the Hopf algebra dual of the polynomials in one variable appears often in analysis, but under different disguises that include proper rational functions, exponential polynomials, shift invariant operators, Taylor functionals, and linearly recurrent sequences. The isomorphisms from the p

A new realization of the algebra SU( 1.1). associated nitil the one-dimensional Morse oscillator. is introduced. Thr catculation of the Morse reflection zunpli:udc is then formulrtted via a recently established algebraic npproxh to the sc311erinp matrix In rhis approach the invariance group of the

Computer algebra and in particular Gröbner bases are powerful tools in experimental design (Pistone and Wynn, 1996, Biometrika 83, 653-666). This paper applies this algebraic methodology to the identifiability of Fourier models. The choice of the class of trigonometric models forces one to deal with