Polynomial integration on regions defined by a triangle and a conic

Abstract

We present an efficient solution to the following problem, of relevance in a numerical optimization scheme: calculation of integrals of the type \[T \f0\ φ1φ2 \, dx\,dy\] for quadratic polynomials f,φ1,φ2 on a plane triangle T. The naive approach would involve consideration of the many possible shapes of T\f≥0\ (possibly after a convenient transformation) and parameterizing its border, in order to integrate the variables separately. Our solution involves partitioning the triangle into smaller triangles on which integration is much simpler.