Abstract
Most off-highway constructions and agriculture equipment use hydraulics, which has unmatched power density, for power transmission and throttling as a means for control. A novel hybrid hydraulic-electric architecture (HHEA) has recently been proposed to improve efficiency for high-power machines that would have been cost-prohibitive to electrify directly. HHEA uses a set of common pressure rails (CPRs) to transmit the majority of power hydraulically and small electric motor drives to modulate that power and to achieve precise control. This article proposes a computationally efficient Lagrange multiplier method (LMM) for computing the optimal sequence of pressure rail selections to minimize energy use. This is needed to evaluate HHEA's energy-saving potential and for iterative architecture design and sizing. An interesting complication is that the cost function is not fully defined until the candidate control sequence is fully specified. This issue is dealt with by decomposing the original problem into a set of sub-problems with additional constraints that can be solved efficiently. Computational effort can be further reduced if actuators are optimized individually instead of together. However, additional steps are required to prevent the constraint functions from becoming discontinuous with respect to the Lagrange multipliers, which is necessary for meeting the constraints. A case study of a construction machine demonstrates the efficacy of the method and shows that the HHEA reduces energy consumption by 68%-73% compared to the baseline load-sensing architecture.
Original language | English (US) |
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Pages (from-to) | 2018-2029 |
Number of pages | 12 |
Journal | IEEE Transactions on Control Systems Technology |
Volume | 30 |
Issue number | 5 |
DOIs | |
State | Published - Sep 1 2022 |
Externally published | Yes |
Bibliographical note
Funding Information:This work was supported by the Department of Energy, Office of Energy Efficiency and Renewable Energy (EERE) under Grant DE-0008384.
Publisher Copyright:
© 1993-2012 IEEE.
Keywords
- Constrained optimization
- Lagrange multiplier
- discrete options
- hybrid hydraulic-electric
- hydraulics
- off-road vehicles
- optimal control
- power-train