An algebraic analysis of conchoids to algebraic curves

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 introduce the following problem which is motivated by applications in vision and pattern detection: We are given pairs of datapoints ðx 1 ; y 1 Þ; ðx 2 ; y 2 Þ; y; ðx m ; y m ÞA½À1; 1  ½À1; 1; a noise parameter d40; a degree bound d; and a threshold r40: We desire an algorithm that enlists every

Given an irreducible algebraic curve f(x,y) .--0 of degree n > 3 with rational coefficients, we describe algorithms for determining whether the curve is singular, and if so, isolating its singular points, computing their multiplicities, and counting the number of distinct tangents at each, The algor