A Mixed-Integer Conic Formulation for Optimal Placement and Dimensioning of DGs in DC Distribution Networks

Molina-Martin, Federico; Montoya, Oscar Danilo; Grisales-Noreña, Luis Fernando; Hernández, Jesús C.

doi:10.3390/electronics10020176

Cited by 12 publications

(13 citation statements)

References 43 publications

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“…The mixed-integer convex reformulation proposed in this research is a convex reformulation problem with integrality constraints on some variables [17]. Therefore, we take advantage of the fact that the mixed-integer convex reformulation proposed is a convex problem, which can be solved efficiently with some integer programming solvers such as the Branch & Bound (B&B) algorithm [34].…”

Section: Solution Methodologymentioning

confidence: 99%

“…Equation ( 10) is a conic equality constraint that is still non-convex due to the presence of the equality symbol [17]. However, as described in [38], this symbol can be replaced by a low equal symbol, which allows transforming it into a convex constraint, as represented below.…”

Section: Mixed-integer Convex Reformulationmentioning

confidence: 99%

“…The authors in [16] have presented optimization models to locate and size distributed generators in DC grids using mixed-integer nonlinear programming model, which is solved with optimization tools available in the general algebraic modeling system, i.e., GAMS, and heuristic optimization methods such as black hole optimizer, and population-based incremental learning. References [17] and [18] have proposed convex optimization models to place and size distributed generators in DC grids considering conic and semidefinite approximations considering the peak load conditions. For their part, authors in [12] and [19] have presented MINLP models to operate battery energy storage systems in DC grids, and their solutions are reached with heuristic algorithms and convex reformulations.…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Exact minimization of the energy losses and the CO2 emissions in isolated DC distribution networks using PV sources

Molina

Montoya

Gil-González

2021

DYNA

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This paper addresses the optimal location and sizing of photovoltaic (PV) sources in isolated direct current (DC) electrical networks, considering time-varying load and renewable generation curves. The mathematical formulation of this problem corresponds to mixed-integer nonlinear programming (MINLP), which is reformulated via mixed-integer convex optimization: This ensures the global optimum solving the resulting optimization model via branch & bound and interior-point methods. The main idea of including PV sources in the DC grid is to minimize the daily energy losses and greenhouse emissions produced by diesel generators in isolated areas. The GAMS package is employed to solve the MINLP model, using mixed and integer variables; also, the CVX and MOSEK solvers are used to obtain solutions from the proposed mixed-integer convex model in the MATLAB. Numerical results demonstrate important reductions in the daily energy losses and the harmful gas emissions when PV sources are optimally integrated into DC grid.

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Section: Solution Methodologymentioning

confidence: 99%

Section: Mixed-integer Convex Reformulationmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Exact minimization of the energy losses and the CO2 emissions in isolated DC distribution networks using PV sources

Molina

Montoya

Gil-González

2021

DYNA

Self Cite

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“…This paper presents a mixed-integer quadratic formulation to this problem, which allows to find an optimal solution. In this way, by using the paradigm of disciplined convex programming, the non-linear integer stochastic problem is transformed into a tractable model [21,23].…”

Section: A B Cmentioning

confidence: 99%

“…Stochastic non-linear mixed-integer problems, such as (1) to (3) are highly complicated to solve, so heuristic algorithms are commonly used to solve them [16]. However, the proposed approximations transform the problem from a general non-linear mixed-integer problem to a convex-quadratic mixed-integer model, given by (16) to (23), since the objective function is quadratic and all the constraints are linear expressions with binary components; this type of problem may be solved in practice, using the Branch and Bound (B&B) algorithm [27]. The B&B algorithm departs from a relaxed problem; in this case, the convex quadratic programming problem QP.…”

Section: Matrix Value Permutation Determinantmentioning

confidence: 99%

A Mixed-Integer Quadratic Formulation of the Phase-Balancing Problem in Residential Microgrids

et al. 2021

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Phase balancing is a classical optimization problem in power distribution grids that involve phase swapping of the loads and generators to reduce power loss. The problem is a non-linear integer and, hence, it is usually solved using heuristic algorithms. This paper proposes a mathematical reformulation that transforms the phase-balancing problem in low-voltage distribution networks into a mixed-integer convex quadratic optimization model. To consider both conventional secondary feeders and microgrids, renewable energies and their subsequent stochastic nature are included in the model. The power flow equations are linearized, and the combinatorial part is represented using a Birkhoff polytope B3 that allows the selection of phase swapping in each node. The numerical experiments on the CIGRE low-voltage test system demonstrate the use of the proposed formulation.

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Enhancing PV distributed generator planning in medium‐voltage DC distribution networks: A multi‐design techno‐economic analysis with load demand response

Zellagui,

Belbachir,

Lasmari

et al. 2023

IET Generation Trans & Dist

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Distributed generators have grown in significance for the technical and financial operation of electric power systems in recent years. The integration of these generators into the electrical distribution network (EDN) has experienced rapid growth, primarily driven by advancements in renewable energy sources (RESs), particularly photovoltaic distributed generators (PVDGs). With the increasing implementation of solar energy as a RES, designing the optimal integration of PVDGs into medium voltage direct current (MVDC) networks is crucial to comprehensively analyzing technical and economic factors. To address this issue, a new multiple objective function (MOF) is proposed, which combines various techno‐economic parameters such as total active power loss (APL), voltage deviation (VD), and the investment cost of PVDGs (ICPVDG) installed in the test system. The objective is to minimize the MOF simultaneously to achieve the optimal incorporation of PVDGs. This study aims to solve the allocation problems related to the location and size of PVDG units in the modified MVDC test systems IEEE 27 and 33‐bus. Simulation results demonstrate the superior accuracy and effectiveness of the equilibrium optimization algorithm (EOA) in achieving the minimum MOF. The utilization of multiple PVDG units reduces overall active power losses and improves voltage profiles across all buses.

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A Mixed-Integer Conic Formulation for Optimal Placement and Dimensioning of DGs in DC Distribution Networks

Cited by 12 publications

References 43 publications

Exact minimization of the energy losses and the CO2 emissions in isolated DC distribution networks using PV sources

Exact minimization of the energy losses and the CO2 emissions in isolated DC distribution networks using PV sources

A Mixed-Integer Quadratic Formulation of the Phase-Balancing Problem in Residential Microgrids

Enhancing PV distributed generator planning in medium‐voltage DC distribution networks: A multi‐design techno‐economic analysis with load demand response

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