Indexed by:期刊论文

Date of Publication:2013-08-01

Journal:JOURNAL OF COMBINATORIAL OPTIMIZATION

Included Journals:EI、SCIE

Volume:26

Issue:2,SI

Page Number:223-236

ISSN No.:1382-6905

Key Words:Online algorithms; Bin packing; 1-space bounded; Multi dimensional

Abstract:In this paper, we study 1-space bounded multi-dimensional bin packing and hypercube packing. A sequence of items arrive over time, each item is a d-dimensional hyperbox (in bin packing) or hypercube (in hypercube packing), and the length of each side is no more than 1. These items must be packed without overlapping into d-dimensional hypercubes with unit length on each side. In d-dimensional space, any two dimensions i and j define a space P (ij) . When an item arrives, we must pack it into an active bin immediately without any knowledge of the future items, and 90(a similar to)-rotation on any plane P (ij) is allowed.
   The objective is to minimize the total number of bins used for packing all these items in the sequence. In the 1-space bounded variant, there is only one active bin for packing the current item. If the active bin does not have enough space to pack the item, it must be closed and a new active bin is opened. For d-dimensional bin packing, an online algorithm with competitive ratio 4 (d) is given. Moreover, we consider d-dimensional hypercube packing, and give a 2 (d+1)-competitive algorithm. These two results are the first study on 1-space bounded multi dimensional bin packing and hypercube packing.