@inproceedings{mor-lop-fel-21-aa-3phase,
  author = {Mor{\'a}n, John Pe{\~n}aloza and L{\'o}pez, Julio C. and Feltrin, Antonio Padilha},
  title = {Three-Phase Optimal Power Flow based on Affine Arithmetic}, 
  booktitle = {IEEE PES Innovative Smart Grid Technologies Conference - Latin America (ISGT-LA 2021)}, 
  year = 2021,
  volume = {},
  number = {},
  pages = {1-5},
  doi = {10.1109/ISGTLatinAmerica52371.2021.9543033},
  issn = {2643-8798},
  month = sep,
  comment = {Reduced AA},
  abstract = {This paper presents a non-linear stochastic mathematical formulation for the three-phase optimal power flow problem, which addresses the uncertainties of both the load and the renewable generation using the self-validation method called Affine Arithmetic. The affine shapes for tree-phase variables was performed using the theoretical approach of Reduced Affine Arithmetic together with the Chebyshev approximation method for non-affine operations. The stochastic mathematical model is formulated into as an equivalent optimization problem through a set of affine operators to later be solved by a two-stage stochastic optimization problem. Two three-phase distribution systems 19-bus and 25-bus are used to show the effectiveness of the proposed methodology.},
  altkeys = {mor-pen-lop-fel-21-aa-3phase}
}