Problem Product Partition differs from the NP-complete problem Partition in that the addition operation is replaced by the multiplication operation. Furthermore it differs from the NP-complete problem Subset Product in that it does not contain the product value B in its input. We prove that problem Product Partition and several of its modifications are NP-complete in the strong sense. Our results imply the strong NP-hardness of a number of scheduling problems with start-time-dependent job processing times and a problem of designing a reliable system with a series-parallel structure. It should be noticed that the strong NP-hardness of the considered optimization problems does not preclude the existence of a fully polynomial time approximatio...
This paper is a note on “Complexity analysis of job-shop scheduling with deteriorating jobs” [G. Mos...
We investigate the preemptive scheduling of periodic tasks with hard deadlines. We show that, even i...
We study the complexity and the efficient approximability of graph and satisfiability problems when ...
Problem Product Partition differs from the NP-complete problem Partition in that the addition operat...
AbstractA special class of quadratic pseudo-boolean functions called “half-products” (HP) has recent...
hard problem but does admit a pseudo-polynomial time algorithm and can be solved efficiently if the ...
The paper is concerned with scheduling problems with multiprocessor tasks and presents conditions un...
We show that the problem of finding an optimal schedule for a set of jobs is NP-complete even in the...
AbstractThe paper is concerned with scheduling problems with multiprocessor tasks and presents condi...
We survey and extend the results on the complexity of machine scheduling problems. After a brief rev...
AbstractWe consider a scheduling problem with a single machine and a set of jobs which have to be pr...
AbstractThis note presents a generic approach to proving NP-hardness of unconstrained partition type...
We investigate the preemptive scheduling of periodic tasks with hard deadlines. We show that, even i...
We investigate the computational complexity of scheduling problems, where the operations consume cer...
This paper is a note on “Complexity analysis of job-shop scheduling with deteriorating jobs” [G. Mos...
We investigate the preemptive scheduling of periodic tasks with hard deadlines. We show that, even i...
We study the complexity and the efficient approximability of graph and satisfiability problems when ...
Problem Product Partition differs from the NP-complete problem Partition in that the addition operat...
AbstractA special class of quadratic pseudo-boolean functions called “half-products” (HP) has recent...
hard problem but does admit a pseudo-polynomial time algorithm and can be solved efficiently if the ...
The paper is concerned with scheduling problems with multiprocessor tasks and presents conditions un...
We show that the problem of finding an optimal schedule for a set of jobs is NP-complete even in the...
AbstractThe paper is concerned with scheduling problems with multiprocessor tasks and presents condi...
We survey and extend the results on the complexity of machine scheduling problems. After a brief rev...
AbstractWe consider a scheduling problem with a single machine and a set of jobs which have to be pr...
AbstractThis note presents a generic approach to proving NP-hardness of unconstrained partition type...
We investigate the preemptive scheduling of periodic tasks with hard deadlines. We show that, even i...
We investigate the computational complexity of scheduling problems, where the operations consume cer...
This paper is a note on “Complexity analysis of job-shop scheduling with deteriorating jobs” [G. Mos...
We investigate the preemptive scheduling of periodic tasks with hard deadlines. We show that, even i...
We study the complexity and the efficient approximability of graph and satisfiability problems when ...