A Novel Reduced Model for Electrical Networks With Constant Power Loads

Nima Monshizadeh; Claudio De Persis; Arjan J. van der Schaft; Jacquelien M. A. Scherpen

doi:10.1109/TAC.2017.2747763

A Novel Reduced Model for Electrical Networks With Constant Power Loads

Nima Monshizadeh^*, Claudio De Persis, Arjan J. van der Schaft, Jacquelien M. A. Scherpen

^*Corresponding author for this work

Research output: Contribution to journal › Article › Academic › peer-review

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Abstract

We consider a network-preserved model of power networks with proper algebraic constraints resulting from constant power loads. Both for the linear and the nonlinear differential algebraic model of the network, we derive explicit reduced models which are fully expressed in terms of ordinary differential equations. For deriving these reduced models, we introduce the "projected incidence" matrix which yields a novel decomposition of the reduced Laplacian matrix. With the help of this new matrix, we provide a complementary approach to Kron reduction, which is able to cope with constant power loads and nonlinear power flow equations.

Original language	English
Pages (from-to)	1288-1299
Number of pages	12
Journal	IEEE Transactions on Automatic Control
Volume	63
Issue number	5
DOIs	https://doi.org/10.1109/TAC.2017.2747763
Publication status	Published - May-2018

Keywords

Kron reduction
power networks
laplacian matrix
differential-algebraic model
STRUCTURE-PRESERVING MODEL
ISLANDED MICROGRIDS
ECONOMIC-DISPATCH
KRON REDUCTION
SYSTEMS
STABILITY
GRIDS
SYNCHRONIZATION
PERSPECTIVES
DYNAMICS

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A Novel Reduced Model for Electrical Networks With Constant Power LoadsFinal publisher's version, 604 KBLicence: Taverne

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title = "A Novel Reduced Model for Electrical Networks With Constant Power Loads",

abstract = "We consider a network-preserved model of power networks with proper algebraic constraints resulting from constant power loads. Both for the linear and the nonlinear differential algebraic model of the network, we derive explicit reduced models which are fully expressed in terms of ordinary differential equations. For deriving these reduced models, we introduce the {"}projected incidence{"} matrix which yields a novel decomposition of the reduced Laplacian matrix. With the help of this new matrix, we provide a complementary approach to Kron reduction, which is able to cope with constant power loads and nonlinear power flow equations.",

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author = "Nima Monshizadeh and {De Persis}, Claudio and {van der Schaft}, {Arjan J.} and Scherpen, {Jacquelien M. A.}",

year = "2018",

month = may,

doi = "10.1109/TAC.2017.2747763",

language = "English",

volume = "63",

pages = "1288--1299",

journal = "IEEE Transactions on Automatic Control",

issn = "0018-9286",

publisher = "IEEE-INST ELECTRICAL ELECTRONICS ENGINEERS INC",

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T1 - A Novel Reduced Model for Electrical Networks With Constant Power Loads

AU - Monshizadeh, Nima

AU - De Persis, Claudio

AU - van der Schaft, Arjan J.

AU - Scherpen, Jacquelien M. A.

PY - 2018/5

Y1 - 2018/5

N2 - We consider a network-preserved model of power networks with proper algebraic constraints resulting from constant power loads. Both for the linear and the nonlinear differential algebraic model of the network, we derive explicit reduced models which are fully expressed in terms of ordinary differential equations. For deriving these reduced models, we introduce the "projected incidence" matrix which yields a novel decomposition of the reduced Laplacian matrix. With the help of this new matrix, we provide a complementary approach to Kron reduction, which is able to cope with constant power loads and nonlinear power flow equations.

AB - We consider a network-preserved model of power networks with proper algebraic constraints resulting from constant power loads. Both for the linear and the nonlinear differential algebraic model of the network, we derive explicit reduced models which are fully expressed in terms of ordinary differential equations. For deriving these reduced models, we introduce the "projected incidence" matrix which yields a novel decomposition of the reduced Laplacian matrix. With the help of this new matrix, we provide a complementary approach to Kron reduction, which is able to cope with constant power loads and nonlinear power flow equations.

KW - Kron reduction

KW - power networks

KW - laplacian matrix

KW - differential-algebraic model

KW - STRUCTURE-PRESERVING MODEL

KW - ISLANDED MICROGRIDS

KW - ECONOMIC-DISPATCH

KW - KRON REDUCTION

KW - SYSTEMS

KW - STABILITY

KW - GRIDS

KW - SYNCHRONIZATION

KW - PERSPECTIVES

KW - DYNAMICS

U2 - 10.1109/TAC.2017.2747763

DO - 10.1109/TAC.2017.2747763

M3 - Article

SN - 0018-9286

VL - 63

SP - 1288

EP - 1299

JO - IEEE Transactions on Automatic Control

JF - IEEE Transactions on Automatic Control

IS - 5

ER -

A Novel Reduced Model for Electrical Networks With Constant Power Loads

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Keywords

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