1. J. Berntsen, T. Espelid (1989) “Degree 13 symmetric quadrature rules for the triangle”, in preparation.

2. B. Buchberger (1985) “Gröbner bases: An algorithmic method in polynomial ideal theory”, pp. 184–232 in Multidimensional Systems Theory, ed. N.K. Bose, D. Reidel Publ. Comp.

3. R. Cools (1989) The construction of cubature formulae using invariant theory and ideal theory, Ph.D. thesis, Katholieke Universiteit Leuven.

4. R. Cools, A. Haegemans (1987) “Construction of fully symmetric cubature formulae of degree 4k— 3 for fully symmetric planar regions”, J. Comput. AppL Math., Vol. 17, pp. 173–180.

5. R. Cools, A. Haegemans (1988) “Another step forward in searching for cubature formulae with a minimal number of knots for the square”, Computing, Vol. 40, pp. 139–146.