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Openstacks (Temporal, Satisficing, Numeric Fluents)

Domain Description

This domain has been used first at IPC-2006. At IPC-2008, we kept the same scenario, however, we produced entirely new problem sets. So, the scenario is the following (adapted from the IPC-2006 description):

The openstacks domain is based on the minimum maximum simultaneous open stacks combinatorial optimization problem, which can be stated as follows: A manufacturer has a number of orders, each for a combination of different products, and can only make one product at a time.

The total required quantity of each product is made at the same time (because changing from making one product to making another requires a production stop). From the time that the first product included in an order is made to the time that all products included in the order have been made, the order is said to be open and during this time it requires a stack (a temporary storage space). The problem is to order the making of the different products so that the maximum number of stacks that are in use simultaneously, or equivalently the number of orders that are in simultaneous production, is minimized (because each stack takes up space in the production area).

The problem is NP-hard and known to be equivalent to several other problems. It was recently posed as a challenge problem for the constraint programming community.

Note that this is an optimization problem: For any instance of the problem every ordering of the making of products is a solution, which at worst uses as many simultaneously open stacks as there are orders. Thus, finding a plan is quite trivial (in the sense that there exists a domain-specific linear-time algorithm that solves the problem), but finding a plan of high quality is hard (even for a domain-specific algorithm).

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Original File Names

file original name
domain-1.pddl p01-domain.pddl
domain-2.pddl p02-domain.pddl
domain-3.pddl p03-domain.pddl
domain-4.pddl p04-domain.pddl
domain-5.pddl p05-domain.pddl
domain-6.pddl p06-domain.pddl
domain-7.pddl p07-domain.pddl
domain-8.pddl p08-domain.pddl
domain-9.pddl p09-domain.pddl
domain-10.pddl p10-domain.pddl
domain-11.pddl p11-domain.pddl
domain-12.pddl p12-domain.pddl
domain-13.pddl p13-domain.pddl
domain-14.pddl p14-domain.pddl
domain-15.pddl p15-domain.pddl
domain-16.pddl p16-domain.pddl
domain-17.pddl p17-domain.pddl
domain-18.pddl p18-domain.pddl
domain-19.pddl p19-domain.pddl
domain-20.pddl p20-domain.pddl
domain-21.pddl p21-domain.pddl
domain-22.pddl p22-domain.pddl
domain-23.pddl p23-domain.pddl
domain-24.pddl p24-domain.pddl
domain-25.pddl p25-domain.pddl
domain-26.pddl p26-domain.pddl
domain-27.pddl p27-domain.pddl
domain-28.pddl p28-domain.pddl
domain-29.pddl p29-domain.pddl
domain-30.pddl p30-domain.pddl
instance-1.pddl p01.pddl
instance-2.pddl p02.pddl
instance-3.pddl p03.pddl
instance-4.pddl p04.pddl
instance-5.pddl p05.pddl
instance-6.pddl p06.pddl
instance-7.pddl p07.pddl
instance-8.pddl p08.pddl
instance-9.pddl p09.pddl
instance-10.pddl p10.pddl
instance-11.pddl p11.pddl
instance-12.pddl p12.pddl
instance-13.pddl p13.pddl
instance-14.pddl p14.pddl
instance-15.pddl p15.pddl
instance-16.pddl p16.pddl
instance-17.pddl p17.pddl
instance-18.pddl p18.pddl
instance-19.pddl p19.pddl
instance-20.pddl p20.pddl
instance-21.pddl p21.pddl
instance-22.pddl p22.pddl
instance-23.pddl p23.pddl
instance-24.pddl p24.pddl
instance-25.pddl p25.pddl
instance-26.pddl p26.pddl
instance-27.pddl p27.pddl
instance-28.pddl p28.pddl
instance-29.pddl p29.pddl
instance-30.pddl p30.pddl