Formulas for the dimension vectors of all objects M in the category S(6) of nilpotent operators with nilpotency degree bounded by 6, acting on finite dimensional vector spaces with invariant subspaces in a graded sense, are given (Theorem 2.3). For this purpose we realize a tubular algebra , controlling the category S(6), as an endomorphism algebra of a suitable tilting bundle over a weighted projective line of type (2, 3, 6) (Theorem 3.6). Using this description and a concept of mono-epi type, the interval multiplicity vector of an object in S(6) is introduced and determined (Theorem 2.8). This is a much finer invariant than the usual dimension vector.