PERFECT PACKING OF D-CUBES

A packing of d-cubes into a d-box of the right area is called perfect packing. Since Sigma(infinity )(i=1)1/i(dt )= zeta(dt), it can be asked for which t can be found a perfect packing of the d-cubes of edge lengths 1, 2(-t), 3(-t) ... into a d-box of the right area. In this paper an algorithm will be presented which packs the d-cubes of edge lengths 1, 2(-t), 3(-t), ... into a d-box of area zeta(dt) for any t on the interval [d(0), 2(d-1)/(d2(d-1)- 1)], where d(0) depends on d only.