Abstract
The nonlinear, nonconvex AC optimal power flow problem is of growing importance as the nature of the power grid evolves. This problem can be difficult to solve for interior point methods. However, the advent of optimization algorithms over smooth Riemannian manifolds presents an alternative approach. The nonlinear, nonconvex constraints in the AC power flow problem form an embedded submanifold of Euclidean space. In this paper, the authors explore the performance of Riemannian optimization algorithms for the ACOPF problem where the optimization is performed directly on the AC power flow manifold. They demonstrate that these are viable computational alternatives to interior point methods. This is done by using Julia and the packages PowerModels.jl and Manopt.jl.
Original language | American English |
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Number of pages | 8 |
State | Published - 2024 |
Event | IEEE PESGM - Seatle, Washington Duration: 21 Jul 2024 → 25 Jul 2024 |
Conference
Conference | IEEE PESGM |
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City | Seatle, Washington |
Period | 21/07/24 → 25/07/24 |
NREL Publication Number
- NREL/CP-2C00-88090
Keywords
- manifold optimization
- nonlinear programming
- numerical optimization
- optimal power flow