16 Hilbert basis elements 26 lattice points in polytope (Hilbert basis elements of degree 1) 34 generators of integral closure of the ideal 44 extreme rays 54 support hyperplanes 6 7embedding dimension = 3 8rank = 3 (maximal) 9external index = 1 10internal index = 1 11original monoid is integrally closed in chosen lattice 12 13size of partial triangulation = 0 14resulting sum of |det|s = 0 15 16grading: 171 1 -2 18 19degrees of extreme rays: 201:4 21 22Hilbert basis elements are of degree 1 23 24ideal is primary to the ideal generated by the indeterminates 25 26*********************************************************************** 27 286 lattice points in polytope (Hilbert basis elements of degree 1): 29 0 1 0 30 0 3 1 31 1 0 0 32 1 2 1 33 2 1 1 34 3 0 1 35 360 further Hilbert basis elements of higher degree: 37 384 generators of integral closure of the ideal: 39 0 3 40 1 2 41 2 1 42 3 0 43 444 extreme rays: 45 0 1 0 46 0 3 1 47 1 0 0 48 3 0 1 49 504 support hyperplanes: 51 0 0 1 52 0 1 0 53 1 0 0 54 1 1 -3 55 56