An analogous statement of the previous theorem was proven in  for the sublattice of all the signed integer partitions of P(n, d, r) having positive and negative parts all distinct between them.
In this paper, we have computed the fundamental sequence for two models whose configurations are signed integer partitions.
Most languages invoking the procedure will view the results as signed integers
in the range -[2.sup.31] to [2.sup.31] -1 inclusive.
At the input to the encoder, source image samples are grouped into 8 x 8 blocks, shifted from unsigned integers with range [0, [2.sup.P] - 1] to signed integers
with range [[-2.sup.P - 1], [2.sup.P - 1] - 1], and input to the Forward DCT (FDCT).