Copyright @ 2012 Zidong Wang et al. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. This article is made available through the Brunel Open Access Publishing Fund.Complex networks do exist in our lives. The brain is a neural network. The global economy
is a network of national economies. Computer viruses routinely spread through the Internet. Food-webs, ecosystems, and metabolic pathways can be represented by networks. Energy is distributed through transportation networks in living organisms, man-made infrastructures, and other physical systems. Dynamic behaviors of complex networks, such as stability, periodic oscillation, bifurcation, or even chaos, are ubiquitous in the real world and often reconfigurable. Networks have been studied in the context of dynamical systems in a range of disciplines. However, until recently there has been relatively little work that treats dynamics as a function of network structure, where the states of both the nodes and the edges can change, and the topology of the network itself often evolves in time. Some major problems have not been fully investigated, such as the behavior of stability, synchronization and chaos control for complex networks, as well as their applications in, for example, communication and bioinformatics

Liang, J

Liu, Y

Wang, Z

Mathematical Problems in Engineering

English

Zidong Wang

Jinling Liang

Yurong Liu

Directory of Open Access Journals

Mathematical Problems for Complex Networks

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Hindawi Publishing CorporationMathematical Problems in EngineeringVolume 2012, Article ID 934680, 5 pagesdoi:10.1155/2012/934680EditorialMathematical Problems for Complex NetworksZidong Wang,1, 2 Jinling Liang,3 and Yurong Liu41 School of Information Sciences and Technology, Donghua University, Shanghai 200051, China2 Department of Information Systems and Computing, Brunel University, Uxbridge,Middlesex UB8 3PH, UK3 Department of Mathematics, Southeast University, Nanjing 210096, China4 Department of Mathematics, Yangzhou University, Yangzhou 225002, ChinaCorrespondence should be addressed to Zidong Wang, zidong.wang@brunel.ac.ukReceived 16 November 2011; Accepted 16 November 2011Copyright q 2012 Zidong Wang et al. This is an open access article distributed under the CreativeCommons Attribution License, which permits unrestricted use, distribution, and reproduction inany medium, provided the original work is properly cited.Complex networks do exist in our lives. The brain is a neural network. The global economyis a network of national economies. Computer viruses routinely spread through the Internet.Food-webs, ecosystems, and metabolic pathways can be represented by networks. Energy isdistributed through transportation networks in living organisms, man-made infrastructures,and other physical systems. Dynamic behaviors of complex networks, such as stability,periodic oscillation, bifurcation, or even chaos, are ubiquitous in the real world and oftenreconfigurable. Networks have been studied in the context of dynamical systems in a range ofdisciplines. However, until recently there has been relatively little work that treats dynamicsas a function of network structure, where the states of both the nodes and the edges canchange, and the topology of the network itself often evolves in time. Some major problemshave not been fully investigated, such as the behavior of stability, synchronization and chaoscontrol for complex networks, as well as their applications in, for example, communicationand bioinformatics.Complex networks have already become an ideal research area for control engineers,mathematicians, computer scientists, and biologists to manage, analyze, and interpretfunctional information from real-world networks. Sophisticated computer system theoriesand computing algorithms have been exploited or emerged in the general area of computermathematics, such as analysis of algorithms, artificial intelligence, automata, computationalcomplexity, computer security, concurrency and parallelism, data structures, knowledgediscovery, DNA and quantum computing, randomization, semantics, symbol manipulation,numerical analysis, and mathematical software. This special issue aims to bring together thelatest approaches to understanding complex networks from a dynamic system perspective.Topics include, but are not limited to the following aspects of dynamics analysis for complex2 Mathematical Problems in Engineeringnetworks: 1 synchronization and control; 2 topology structure and dynamics; 3 stabilityanalysis; 4 robustness and fragility.This special issue aims to bring together the latest approaches to understanding themathematical issues of complex networks from a dynamic system perspective. We havesolicited submissions to this special issue from electrical engineers, control engineers, math-ematicians, and computer scientists. After a rigorous peer-review process, 21 papers havebeen selected that provide overviews, solutions, or early promises, to manage, analyze,and interpret dynamical behaviors of complex networks. These papers have covered boththe practical and theoretical aspects of complex networks in the broad areas of dynamicalsystems, mathematics, statistics, operational research, and engineering.This special issue starts with a survey paper on the recent advances of filtering andcontrol for complex networked systems with incomplete information. Specifically, in thepaper entitled “Recent advances on filtering and control for nonlinear stochastic complex systemswith incomplete information” by Z. Wang, the focus is mainly on the filtering and controlproblem for complex systems with incomplete information and the main aim is to give asurvey on some recent advances in this area. The incomplete information under considerationincludes missingmeasurements, randomly varying sensor delays, signal quantization, sensorsaturations, and signal sampling. The modeling issues are first discussed to reflect the realcomplexity of the nonlinear stochastic systems. Based on the models established, variousfiltering and control problems with incomplete information are reviewed in detail. Then, thecomplex systems, are dealt with from three aspects, that is, nonlinear stochastic systems,complex networks and sensor networks. Both theories and techniques for dealing withcomplex systems are reviewed and, at the same time, some challenging issues for futureresearch are raised. Subsequently, the filtering problems for the stochastic nonlinear complexnetworks with incomplete information are paid particular attention by summarizing thelatest results. Finally, some conclusions are drawn and several possible related researchdirections are pointed out.Complex networks are composed of a large number of highly interconnected dy-namical units and therefore exhibit very complicate dynamics. Examples of such complexnetworks include the Internet, which is a network of routers domains, the World WideWeb, which is a network of web sites, the brain, which is a network of neurons, andan organization, which is a network of people. Synchronization for complex networks isattracting more and more research attention due to its ubiquity in many system models ofthe natural world. In another paper “Impulsive synchronization of nonlinearly-coupled complexnetworks” by J. Cao, the impulsive synchronization problem is investigated for nonlinearlycoupled complex networks. Based on the stability analysis of impulsive functional diﬀerentialequations, some suﬃcient synchronization criteria are established in terms of averageimpulsive interval. The model addressed is a nonlinearly coupled network that covers thelinearly coupled network and an array of linearly coupled systems as special cases. In thework “Enhancement of the quality and robustness in synchronization of nonlinear lur’e dynamicalnetworks” by Y. Yang, the synchronization is studied for a class of nonlinear dynamicalnetworks with faults and external disturbances. Suﬃcient conditions are given to guaranteethe global robust synchronization for the network by means of solving the linear matrixinequalities. By using adaptive-impulsive control approach, the projective synchronizationproblem is dealt with in “Adaptive-impulsive control of the projective synchronization in drive-response complex dynamical networks with time-varying coupling” by S. Zheng for drive-responsetime-varying coupling complex dynamical networks with time delay and time-varyingweight links. An adaptive feedback controller with impulsive control eﬀects is designed. InMathematical Problems in Engineering 3the paper entitled “Second-order consensus for multi-agent systems under directed and switchingtopologies” by L. Gao, based on the graph theory and Lypunov method, suﬃcient conditionsof the consensus stability are established for systems with neighbor-based feedback laws inleader-following case and leaderless case. As special cases, the consensus criteria for balancedand undirected interconnection topology cases can be readily established.Sensor networks have recently been undergoing a quiet revolution in all aspects of thehardware implementation, software development, and theoretical research. Sensor networkspossess their own characteristics due mainly to the large number of inexpensive wirelessdevices nodes densely distributed and loosely coupled over the region of interest. The pastdecade has seen successful applications of sensor networks in many practical areas rangingfrom military sensing, physical security, air traﬃc control, to industrial and manufacturingautomation. In the paper addressed “Energy-aware topology evolution model with link and nodedeletion in wireless sensor networks” by X. Luo, based on the complex network theory, a newtopological evolving model is proposed. In the evolution of the topology of sensor networks,the energy-aware mechanism is taken into account, and the phenomenon of change of thelink and node in the network is discussed. Theoretical results and numerical simulationare given to analyze the topology characteristics and network performance with diﬀerentnode energy distributions. It is shown that, when nodes energy is more heterogeneous, thenetwork is better clustered and the higher performance is achieved in terms of the networkeﬃciency and the average path length of transmitting data. In order to maintain k disjointcommunication paths from source sensors to the macronodes, a hybrid routing scheme isdeveloped in “An immune cooperative particle swarm optimization algorithm for fault-tolerantrouting optimization in heterogeneous wireless sensor networks” by Y.-S. Ding, where multiplepaths are calculated andmaintained in advance, and alternative paths are created on demand.Also, an immune cooperative particle swarm optimization algorithm ICPSOA is developedto guarantee the fast routing recovery and reconstruct the network topology from path failurein heterogeneous wireless sensor networks H-WSNs. In another paper “Geometric buildupalgorithms for sensor network localization” by Z. Wu, a geometric build-up algorithm is givenfor the sensor network localization problem with either accurate or noisy distance data.Moreover, an algorithm with two buildup phases is presented to handle the noisy and sparsedistance data. By comparing with the existing approaches, the advantages of the proposedalgorithms are shown.In the past few decades, neural networks have received considerable research interestsand have found successful applications in a variety of areas such as pattern recognition,associative memory, and combinatorial optimization. The dynamical characteristics of neuralnetworks with time delays have become a subject of intense research activities. In the paperentitled “Global robust stability of switched interval neural networks with discrete and distributedtime-varying delays of neural type” by H. Wu, a switched interval neural network is discussedwith discrete and distributed time-varying delays. Together with the Lyapunov approachand linear matrix inequality LMI technique, a delay-dependent criterion is given such thatthe switched interval neural network is globally asymptotically stable. By constructing theLyapunov-Krasovskii functional and using the reciprocal convex technique, a new suﬃcientcondition is derived in “Further stability criterion on delayed recurrent neural networks basedon reciprocal convex technique,” by T. Li to guarantee the global stability for recurrent neuralnetworks with both time-varying and continuously distributed delays. Numerical examplesare given to show the eﬀectiveness and less conservatism of the proposed method. In anotherpaper “H∞ Neural-network-based discrete-time fuzzy control of continuous-time nonlinear systemswith dither,” by J.-D. Hwang, and by constructing a discrete-time DT fuzzy controller, the4 Mathematical Problems in Engineeringstabilization problem is investigated for a class of continuous-time CT nonlinear systems.After discretizing the CT nonlinear system, a neural-network NN system is established toapproximate the DT nonlinear system. Then, a Takagi-Sugeno DT fuzzy controller is designedto stabilize this NN system. It is shown that when the discretized frequency or samplingfrequency of the CT system is suﬃciently high, the DT system can maintain the dynamic ofthe original CT system. Moreover, the trajectory of the DT system and the CT system can bemade as close as desired by designing the sampling frequency.As being well known, the cyber world brings massive changes to the society.There have been many cyber-related challenging problems that arise inevitably and shouldbe handled. In the paper addressed “Two quarantine models on the attack of maliciousobjects in computer network,” by B. K. Mishra, SEIQR susceptible, exposed, infectious,quarantined, and recoveredmodels for the transmission of malicious objects are discussed incomputer network with simple mass action incidence and standard incidence rate. Suﬃcientconditions for global stability and asymptotic stability of endemic equilibrium are givenfor simple mass action incidence. Also, the behaviors are analyzed for the susceptible,exposed, infected, quarantined, and recovered nodes in the computer network. The spatiallyembedded networks are tackled in “Structural models of cortical networks with long-rangeconnectivity,” by S. Rotter with specific distance-dependent connectivity profiles. By applyingthe stochastic graph theory, the structure and the topology of such networks are considered.In another paper “Abstract description of internet traﬃc of generalized cauchy type,” by M.Li, the set-valued analyses are investigated for the traﬃc of the fractional Gaussian noisefGn type and the generalized Cauchy GC type. Meanwhile, a design procedure of theautocorrelation function ACF is presented for the GC process in Hilbert spaces. Multiplecomplex tasks commonly occur in the water distribution networks, such as design, planning,operation, maintenance, and management. In the paper entitled “On the complexities of thedesign of water distribution networks,” by J. Izquierdo, a synergetic association between swarmintelligence and multiagent systems is discussed for water distribution networks, wherehuman interaction is simultaneously enabled. In the paper addressed “A novel algorithm ofstochastic chance-constrained linear programming and its application,” by C. Wang, the stochasticchance-constrained linear programming problem is investigated. A simplex algorithm isdeveloped based on the stochastic simulation and a practical example is presented toillustrate the applicability of the proposed algorithm.Stability analysis and stabilization problems of stochastic systems have attractedmuchattention in the past decades, since stochastic modeling has come to play an importantrole in many real-world systems, including nuclear, thermal, chemical processes, biology,socioeconomics, immunology, and so forth. In another paper “Mixed H2/H∞ performanceanalysis and state-feedback control design for networked systems with fading communicationchannels,” by A.–M. Stoica, the aim is to develop a performance analysis approach fornetworked systems with fading communication channels. A state feedback controller isdesigned to accomplish a mixed H2/H∞ performance requirement. A numerical iterativeprocedure is presented which can be utilized to compute the stabilizing solution for systemwith jumps. The practical stabilization problem is investigated in “The practical stabilization fora class of networked systems with actuator saturation and input additive disturbances,” by D. Chenfor a class of linear systems with actuator saturation and input additive disturbances. Thetime-invariant and time-varying input additive disturbances are considered, respectively. Byapplying the Riccati equation approach and designing the linear state feedback controllers,suﬃcient conditions are established to guarantee the semiglobal practical stabilization forthe closed-loop systems. In the paper entitled “A quasi-ARX model for multivariable decouplingMathematical Problems in Engineering 5control of nonlinear MIMO system,” by J. Hu, a multiinput and multioutput MIMOquasi-autoregressive exogenous ARX model is presented and a multivariable-decouplingproportional integral diﬀerential PID controller is designed for the MIMO nonlinearsystems. An adaptive control algorithm is given by using the MIMO quasi-ARX radial basisfunction network RBFN prediction model. In another paper “Practical stability in the pthmean for Itoˆ stochastic diﬀerential equations,” by H. Shu, the pth mean practical stability problemis investigated for a general class of Itoˆ-type stochastic diﬀerential equations over both finite-time and infinite-time horizons. Suﬃcient conditions are established such that the addresseddiﬀerential equations are pth moment practically stable. The practical stability problemis studied in “pth mean practical stability for large-scale Itoˆ stochastic systems with markovianswitching,” by H. Shu for Markovian switching systems in the pth mean sense. By using theLyapunov method, some criteria are presented such that various types of practical stabilityin the pth mean are guaranteed for the nonlinear stochastic systems.AcknowledgmentsThis special issue is a timely reflection of the research progress in the area of mathematicalproblems for complex networks. We would like to acknowledge all authors for their eﬀorts insubmitting high-quality papers. We are also very grateful to the reviewers for their thoroughand ontime reviews of the papers.Zidong WangJinling LiangYurong LiuSubmit your manuscripts athttp://www.hindawi.comHindawi Publishing Corporationhttp://www.hindawi.com Volume 2014MathematicsJournal ofHindawi Publishing Corporationhttp://www.hindawi.com Volume 2014Mathematical Problems in EngineeringHindawi Publishing Corporationhttp://www.hindawi.comDifferential EquationsInternational Journal ofVolume 2014Applied MathematicsJournal ofHindawi Publishing Corporationhttp://www.hindawi.com Volume 2014Probability and StatisticsHindawi Publishing Corporationhttp://www.hindawi.com Volume 2014Journal ofHindawi Publishing Corporationhttp://www.hindawi.com Volume 2014Mathematical PhysicsAdvances inComplex AnalysisJournal ofHindawi Publishing Corporationhttp://www.hindawi.com Volume 2014OptimizationJournal ofHindawi Publishing Corporationhttp://www.hindawi.com Volume 2014CombinatoricsHindawi Publishing Corporationhttp://www.hindawi.com Volume 2014International Journal ofHindawi Publishing Corporationhttp://www.hindawi.com Volume 2014Operations ResearchAdvances inJournal ofHindawi Publishing Corporationhttp://www.hindawi.com Volume 2014Function SpacesAbstract and Applied AnalysisHindawi Publishing Corporationhttp://www.hindawi.com Volume 2014International Journal of Mathematics and Mathematical SciencesHindawi Publishing Corporationhttp://www.hindawi.com Volume 2014The Scientific World JournalHindawi Publishing Corporation http://www.hindawi.com Volume 2014Hindawi Publishing Corporationhttp://www.hindawi.com Volume 2014AlgebraDiscrete Dynamics in Nature and SocietyHindawi Publishing Corporationhttp://www.hindawi.com Volume 2014Hindawi Publishing Corporationhttp://www.hindawi.com Volume 2014Decision SciencesAdvances inDiscrete MathematicsJournal ofHindawi Publishing Corporationhttp://www.hindawi.comVolume 2014 Hindawi Publishing Corporationhttp://www.hindawi.com Volume 2014Stochastic AnalysisInternational Journal of

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Hindawi Publishing CorporationMathematical Problems in EngineeringVolume 2012, Article ID 934680, 5 pagesdoi:10.1155/2012/934680EditorialMathematical Problems for Complex NetworksZidong Wang,1, 2 Jinling Liang,3 and Yurong Liu41 School of Information Sciences and Technology, Donghua University, Shanghai 200051, China2 Department of Information Systems and Computing, Brunel University, Uxbridge,Middlesex UB8 3PH, UK3 Department of Mathematics, Southeast University, Nanjing 210096, China4 Department of Mathematics, Yangzhou University, Yangzhou 225002, ChinaCorrespondence should be addressed to Zidong Wang, zidong.wang@brunel.ac.ukReceived 16 November 2011; Accepted 16 November 2011Copyright q 2012 Zidong Wang et al. This is an open access article distributed under the CreativeCommons Attribution License, which permits unrestricted use, distribution, and reproduction inany medium, provided the original work is properly cited.Complex networks do exist in our lives. The brain is a neural network. The global economyis a network of national economies. Computer viruses routinely spread through the Internet.Food-webs, ecosystems, and metabolic pathways can be represented by networks. Energy isdistributed through transportation networks in living organisms, man-made infrastructures,and other physical systems. Dynamic behaviors of complex networks, such as stability,periodic oscillation, bifurcation, or even chaos, are ubiquitous in the real world and oftenreconfigurable. Networks have been studied in the context of dynamical systems in a range ofdisciplines. However, until recently there has been relatively little work that treats dynamicsas a function of network structure, where the states of both the nodes and the edges canchange, and the topology of the network itself often evolves in time. Some major problemshave not been fully investigated, such as the behavior of stability, synchronization and chaoscontrol for complex networks, as well as their applications in, for example, communicationand bioinformatics.Complex networks have already become an ideal research area for control engineers,mathematicians, computer scientists, and biologists to manage, analyze, and interpretfunctional information from real-world networks. Sophisticated computer system theoriesand computing algorithms have been exploited or emerged in the general area of computermathematics, such as analysis of algorithms, artificial intelligence, automata, computationalcomplexity, computer security, concurrency and parallelism, data structures, knowledgediscovery, DNA and quantum computing, randomization, semantics, symbol manipulation,numerical analysis, and mathematical software. This special issue aims to bring together thelatest approaches to understanding complex networks from a dynamic system perspective.Topics include, but are not limited to the following aspects of dynamics analysis for complex2 Mathematical Problems in Engineeringnetworks: 1 synchronization and control; 2 topology structure and dynamics; 3 stabilityanalysis; 4 robustness and fragility.This special issue aims to bring together the latest approaches to understanding themathematical issues of complex networks from a dynamic system perspective. We havesolicited submissions to this special issue from electrical engineers, control engineers, math-ematicians, and computer scientists. After a rigorous peer-review process, 21 papers havebeen selected that provide overviews, solutions, or early promises, to manage, analyze,and interpret dynamical behaviors of complex networks. These papers have covered boththe practical and theoretical aspects of complex networks in the broad areas of dynamicalsystems, mathematics, statistics, operational research, and engineering.This special issue starts with a survey paper on the recent advances of filtering andcontrol for complex networked systems with incomplete information. Specifically, in thepaper entitled “Recent advances on filtering and control for nonlinear stochastic complex systemswith incomplete information” by Z. Wang, the focus is mainly on the filtering and controlproblem for complex systems with incomplete information and the main aim is to give asurvey on some recent advances in this area. The incomplete information under considerationincludes missingmeasurements, randomly varying sensor delays, signal quantization, sensorsaturations, and signal sampling. The modeling issues are first discussed to reflect the realcomplexity of the nonlinear stochastic systems. Based on the models established, variousfiltering and control problems with incomplete information are reviewed in detail. Then, thecomplex systems, are dealt with from three aspects, that is, nonlinear stochastic systems,complex networks and sensor networks. Both theories and techniques for dealing withcomplex systems are reviewed and, at the same time, some challenging issues for futureresearch are raised. Subsequently, the filtering problems for the stochastic nonlinear complexnetworks with incomplete information are paid particular attention by summarizing thelatest results. Finally, some conclusions are drawn and several possible related researchdirections are pointed out.Complex networks are composed of a large number of highly interconnected dy-namical units and therefore exhibit very complicate dynamics. Examples of such complexnetworks include the Internet, which is a network of routers domains, the World WideWeb, which is a network of web sites, the brain, which is a network of neurons, andan organization, which is a network of people. Synchronization for complex networks isattracting more and more research attention due to its ubiquity in many system models ofthe natural world. In another paper “Impulsive synchronization of nonlinearly-coupled complexnetworks” by J. Cao, the impulsive synchronization problem is investigated for nonlinearlycoupled complex networks. Based on the stability analysis of impulsive functional diﬀerentialequations, some suﬃcient synchronization criteria are established in terms of averageimpulsive interval. The model addressed is a nonlinearly coupled network that covers thelinearly coupled network and an array of linearly coupled systems as special cases. In thework “Enhancement of the quality and robustness in synchronization of nonlinear lur’e dynamicalnetworks” by Y. Yang, the synchronization is studied for a class of nonlinear dynamicalnetworks with faults and external disturbances. Suﬃcient conditions are given to guaranteethe global robust synchronization for the network by means of solving the linear matrixinequalities. By using adaptive-impulsive control approach, the projective synchronizationproblem is dealt with in “Adaptive-impulsive control of the projective synchronization in drive-response complex dynamical networks with time-varying coupling” by S. Zheng for drive-responsetime-varying coupling complex dynamical networks with time delay and time-varyingweight links. An adaptive feedback controller with impulsive control eﬀects is designed. InMathematical Problems in Engineering 3the paper entitled “Second-order consensus for multi-agent systems under directed and switchingtopologies” by L. Gao, based on the graph theory and Lypunov method, suﬃcient conditionsof the consensus stability are established for systems with neighbor-based feedback laws inleader-following case and leaderless case. As special cases, the consensus criteria for balancedand undirected interconnection topology cases can be readily established.Sensor networks have recently been undergoing a quiet revolution in all aspects of thehardware implementation, software development, and theoretical research. Sensor networkspossess their own characteristics due mainly to the large number of inexpensive wirelessdevices nodes densely distributed and loosely coupled over the region of interest. The pastdecade has seen successful applications of sensor networks in many practical areas rangingfrom military sensing, physical security, air traﬃc control, to industrial and manufacturingautomation. In the paper addressed “Energy-aware topology evolution model with link and nodedeletion in wireless sensor networks” by X. Luo, based on the complex network theory, a newtopological evolving model is proposed. In the evolution of the topology of sensor networks,the energy-aware mechanism is taken into account, and the phenomenon of change of thelink and node in the network is discussed. Theoretical results and numerical simulationare given to analyze the topology characteristics and network performance with diﬀerentnode energy distributions. It is shown that, when nodes energy is more heterogeneous, thenetwork is better clustered and the higher performance is achieved in terms of the networkeﬃciency and the average path length of transmitting data. In order to maintain k disjointcommunication paths from source sensors to the macronodes, a hybrid routing scheme isdeveloped in “An immune cooperative particle swarm optimization algorithm for fault-tolerantrouting optimization in heterogeneous wireless sensor networks” by Y.-S. Ding, where multiplepaths are calculated andmaintained in advance, and alternative paths are created on demand.Also, an immune cooperative particle swarm optimization algorithm ICPSOA is developedto guarantee the fast routing recovery and reconstruct the network topology from path failurein heterogeneous wireless sensor networks H-WSNs. In another paper “Geometric buildupalgorithms for sensor network localization” by Z. Wu, a geometric build-up algorithm is givenfor the sensor network localization problem with either accurate or noisy distance data.Moreover, an algorithm with two buildup phases is presented to handle the noisy and sparsedistance data. By comparing with the existing approaches, the advantages of the proposedalgorithms are shown.In the past few decades, neural networks have received considerable research interestsand have found successful applications in a variety of areas such as pattern recognition,associative memory, and combinatorial optimization. The dynamical characteristics of neuralnetworks with time delays have become a subject of intense research activities. In the paperentitled “Global robust stability of switched interval neural networks with discrete and distributedtime-varying delays of neural type” by H. Wu, a switched interval neural network is discussedwith discrete and distributed time-varying delays. Together with the Lyapunov approachand linear matrix inequality LMI technique, a delay-dependent criterion is given such thatthe switched interval neural network is globally asymptotically stable. By constructing theLyapunov-Krasovskii functional and using the reciprocal convex technique, a new suﬃcientcondition is derived in “Further stability criterion on delayed recurrent neural networks basedon reciprocal convex technique,” by T. Li to guarantee the global stability for recurrent neuralnetworks with both time-varying and continuously distributed delays. Numerical examplesare given to show the eﬀectiveness and less conservatism of the proposed method. In anotherpaper “H∞ Neural-network-based discrete-time fuzzy control of continuous-time nonlinear systemswith dither,” by J.-D. Hwang, and by constructing a discrete-time DT fuzzy controller, the4 Mathematical Problems in Engineeringstabilization problem is investigated for a class of continuous-time CT nonlinear systems.After discretizing the CT nonlinear system, a neural-network NN system is established toapproximate the DT nonlinear system. Then, a Takagi-Sugeno DT fuzzy controller is designedto stabilize this NN system. It is shown that when the discretized frequency or samplingfrequency of the CT system is suﬃciently high, the DT system can maintain the dynamic ofthe original CT system. Moreover, the trajectory of the DT system and the CT system can bemade as close as desired by designing the sampling frequency.As being well known, the cyber world brings massive changes to the society.There have been many cyber-related challenging problems that arise inevitably and shouldbe handled. In the paper addressed “Two quarantine models on the attack of maliciousobjects in computer network,” by B. K. Mishra, SEIQR susceptible, exposed, infectious,quarantined, and recoveredmodels for the transmission of malicious objects are discussed incomputer network with simple mass action incidence and standard incidence rate. Suﬃcientconditions for global stability and asymptotic stability of endemic equilibrium are givenfor simple mass action incidence. Also, the behaviors are analyzed for the susceptible,exposed, infected, quarantined, and recovered nodes in the computer network. The spatiallyembedded networks are tackled in “Structural models of cortical networks with long-rangeconnectivity,” by S. Rotter with specific distance-dependent connectivity profiles. By applyingthe stochastic graph theory, the structure and the topology of such networks are considered.In another paper “Abstract description of internet traﬃc of generalized cauchy type,” by M.Li, the set-valued analyses are investigated for the traﬃc of the fractional Gaussian noisefGn type and the generalized Cauchy GC type. Meanwhile, a design procedure of theautocorrelation function ACF is presented for the GC process in Hilbert spaces. Multiplecomplex tasks commonly occur in the water distribution networks, such as design, planning,operation, maintenance, and management. In the paper entitled “On the complexities of thedesign of water distribution networks,” by J. Izquierdo, a synergetic association between swarmintelligence and multiagent systems is discussed for water distribution networks, wherehuman interaction is simultaneously enabled. In the paper addressed “A novel algorithm ofstochastic chance-constrained linear programming and its application,” by C. Wang, the stochasticchance-constrained linear programming problem is investigated. A simplex algorithm isdeveloped based on the stochastic simulation and a practical example is presented toillustrate the applicability of the proposed algorithm.Stability analysis and stabilization problems of stochastic systems have attractedmuchattention in the past decades, since stochastic modeling has come to play an importantrole in many real-world systems, including nuclear, thermal, chemical processes, biology,socioeconomics, immunology, and so forth. In another paper “Mixed H2/H∞ performanceanalysis and state-feedback control design for networked systems with fading communicationchannels,” by A.–M. Stoica, the aim is to develop a performance analysis approach fornetworked systems with fading communication channels. A state feedback controller isdesigned to accomplish a mixed H2/H∞ performance requirement. A numerical iterativeprocedure is presented which can be utilized to compute the stabilizing solution for systemwith jumps. The practical stabilization problem is investigated in “The practical stabilization fora class of networked systems with actuator saturation and input additive disturbances,” by D. Chenfor a class of linear systems with actuator saturation and input additive disturbances. Thetime-invariant and time-varying input additive disturbances are considered, respectively. Byapplying the Riccati equation approach and designing the linear state feedback controllers,suﬃcient conditions are established to guarantee the semiglobal practical stabilization forthe closed-loop systems. In the paper entitled “A quasi-ARX model for multivariable decouplingMathematical Problems in Engineering 5control of nonlinear MIMO system,” by J. Hu, a multiinput and multioutput MIMOquasi-autoregressive exogenous ARX model is presented and a multivariable-decouplingproportional integral diﬀerential PID controller is designed for the MIMO nonlinearsystems. An adaptive control algorithm is given by using the MIMO quasi-ARX radial basisfunction network RBFN prediction model. In another paper “Practical stability in the pthmean for Itoˆ stochastic diﬀerential equations,” by H. Shu, the pth mean practical stability problemis investigated for a general class of Itoˆ-type stochastic diﬀerential equations over both finite-time and infinite-time horizons. Suﬃcient conditions are established such that the addresseddiﬀerential equations are pth moment practically stable. The practical stability problemis studied in “pth mean practical stability for large-scale Itoˆ stochastic systems with markovianswitching,” by H. Shu for Markovian switching systems in the pth mean sense. By using theLyapunov method, some criteria are presented such that various types of practical stabilityin the pth mean are guaranteed for the nonlinear stochastic systems.AcknowledgmentsThis special issue is a timely reflection of the research progress in the area of mathematicalproblems for complex networks. We would like to acknowledge all authors for their eﬀorts insubmitting high-quality papers. We are also very grateful to the reviewers for their thoroughand ontime reviews of the papers.Zidong WangJinling LiangYurong Liu

Mathematical problems for complex networks

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