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Stability criterion for synchronization of linearly coupled unified chaotic systems

Institution:	1. Institute of Mathematics, University of Lübeck, D-23562 Lübeck, Germany;2. Graduate School for Computing in Medicine and Life Sciences, University of Lübeck, D-23562 Lübeck, Germany;1. Department of Cognition, Development and Educational Psychology, University of Barcelona, Passeig de la Vall d''Hebron, 171, 08035 Barcelona, Spain;2. Institute of Neurosciences, University of Barcelona, Passeig de la Vall d''Hebron, 171, 08035 Barcelona, Spain;3. Cognition and Brain Plasticity Group, Bellvitge Biomedical Research Institute (IDIBELL), L''Hospitalet de Llobregat, Barcelona 08097, Spain;4. Department of Communication Sciences and Disorders, Eleanor M. Saffran Center for Cognitive Neuroscience, Temple University, Philadephia, PA 19122, USA;5. Department of Psychology, Abo Akademi University, 20500 Turku, Finland;6. Catalan Institution for Research and Advanced Studies (ICREA), Barcelona, Spain;1. The Florey Institute of Neuroscience and Mental Health, Austin Campus, Melbourne, VIC, Australia;2. Florey Department of Neuroscience and Mental Health, The University of Melbourne, Melbourne, VIC, Australia;3. Department of Neurology, Austin Health, Melbourne, VIC, Australia;1. The Mind Research Network, Albuquerque, NM, 87106, USA;2. School of Computer and Information Technology, Shanxi University, Taiyuan, 030006, China;3. Brainnetome Center and National Laboratory of Pattern Recognition, Institute of Automation, Chinese Academy of Science, Beijing, 100190, China;4. CAS Center for Excellence in Brain Science and Intelligence Technology, University of Chinese Academy of Sciences in Beijing, 100049, China;5. Department of Psychology, Georgia State University, GA, 30303, USA;6. Department of Psychiatry and Human Behavior, School of Medicine, University of California, Irvine, CA, 92697, USA;7. Department of Psychiatry, University of North Carolina, Chapel Hill, NC, 27514, USA;8. Department of Psychiatry, University of California San Francisco, CA, 94143, USA;9. San Francisco VA Medical Center, San Francisco, CA, 94121, USA;10. Department of Psychiatry and Biobehavioral Sciences, University of California Los Angeles, CA, 90095, USA;11. Department of Psychiatry, University of Minnesota, Minneapolis, MN, 55454, USA;12. Department of Psychiatry, University of Iowa, IA, 52242, USA;13. Olin Neuropsychiatry Research Center, Hartford, CT 06106, USA;14. Department of Neuroscience, Yale University, New Haven, CT 06520, USA;15. Department of Psychiatry, Yale University, New Haven, CT, 06520, USA;p. Department of Electrical and Computer Engineering, University of New Mexico, Albuquerque, NM, 87016, USA;1. CNR - Institute of Complex Systems, Via Madonna del Piano, 10, 50019 Sesto Fiorentino, Florence, Italy;2. The Italian Embassy in Israel, 25 Hamered st., 68125 Tel Aviv, Israel;3. School of Mathematical Sciences, Queen Mary University of London, London, United Kingdom;4. Departamento de Matemática Aplicada, Universidad Rey Juan Carlos, 28933 Móstoles, Madrid, Spain;5. Center for Biomedical Technology, Universidad Politécnica de Madrid, 28223 Pozuelo de Alarcón, Madrid, Spain;6. Warwick Mathematics Institute, University of Warwick, Gibbet Hill Road, Coventry CV4 7AL, United Kingdom;7. Centre for Complexity Science, University of Warwick, Gibbet Hill Road, Coventry CV4 7AL, United Kingdom;8. Warwick Infectious Disease Epidemiology Research (WIDER) Centre, University of Warwick, Gibbet Hill Road, Coventry CV4 7AL, United Kingdom;9. Institute for Biocomputation and Physics of Complex Systems, University of Zaragoza, Zaragoza, Spain;10. Complex Systems Group, Universidad Rey Juan Carlos, 28933 Móstoles, Madrid, Spain;11. Department of Physics, Hong Kong Baptist University, Kowloon Tong, Hong Kong Special Administrative Region;12. Center for Nonlinear Studies, Beijing–Hong Kong–Singapore Joint Center for Nonlinear and Complex Systems (Hong Kong) and Institute of Computational and Theoretical Studies, Hong Kong Baptist University, Kowloon Tong, Hong Kong Special Administrative Region;13. Innaxis Foundation & Research Institute, José Ortega y Gasset 20, 28006 Madrid, Spain;14. Faculdade de Ciências e Tecnologia, Departamento de Engenharia Electrotécnica, Universidade Nova de Lisboa, 2829-516 Caparica, Portugal

Abstract:	This paper investigates the synchronization of two linearly coupled unified chaotic systems. A new stability criterion for asymptotic synchronization is attained using the Lyapunov stability theory and linear matrix inequality (LMI) approach. A numerical example is given to illuminate the design procedure and advantage of the result derived.

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