Metadata only
Date
2018-10Type
- Journal Article
Abstract
Solutions to nonlinear, nonconvex optimization problems can fail to satisfy the Karush-Kuhn-Tucker (KKT) optimality conditions even when they are optimal. This is due to the fact that unless constraint qualifications (CQs) are satisfied, Lagrange multipliers may fail to exist. Even if the KKT conditions are applicable, the multipliers may not be unique. These possibilities also affect AC optimal power flow (OPF) problems which are routinely solved in power systems planning, scheduling and operations. The complex structure-in particular the presence of the nonlinear power flow equations which naturally exhibit a structural degeneracy-make any attempt to establish CQs for the entire class of problems very challenging. In this letter, we resort to tools from differential topology to show that for AC OPF problems in various contexts the linear independence constraint qualification is satisfied almost certainly, thus effectively obviating the usual assumption on CQs. Consequently, for any local optimizer there generically exists a unique set of multipliers that satisfy the KKT conditions. Show more
Publication status
publishedExternal links
Journal / series
IEEE Control Systems LettersVolume
Pages / Article No.
Publisher
IEEESubject
Optimization; power systemsOrganisational unit
09481 - Hug, Gabriela / Hug, Gabriela
09478 - Dörfler, Florian / Dörfler, Florian
Funding
160573 - Plug-and-Play Control & Optimization in Microgrids (SNF)
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