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ASPDAC
2008
ACM
2008
ACM
Scheduling with integer time budgeting for low-power optimization
In this paper we present a mathematical programming formulation of the integer time budgeting problem for directed acyclic graphs. In particular, we formally prove that our constraint matrix has a special property that enables a polynomial-time algorithm to solve the problem optimally with a guaranteed integral solution. Our theory can be directly applied to solving a scheduling problem in behavioral synthesis with the objective of minimizing the system power consumption. Given a set of scheduling constraints and a collection of convex power-delay tradeoff curves for each type of operation, our scheduler can intelligently schedule the operations to appropriate clock cycles and simultaneously select the module implementations that lead to low-power solutions. Experiments demonstrate that our proposed technique can produce near-optimal results (within 6% of the optimum by the ILP formulation), with 40x+ speedup.
Real-time TrafficASPDAC 2008 | Convex Power-delay Tradeoff | Hardware | Mathematical Programming Formulation | Time Budgeting Problem |
Related Content
| Added | 12 Oct 2010 |
| Updated | 12 Oct 2010 |
| Type | Conference |
| Year | 2008 |
| Where | ASPDAC |
| Authors | Wei Jiang, Zhiru Zhang, Miodrag Potkonjak, Jason Cong |
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