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Nash equilibrium design and price-based coordination in hierarchical systems

References Alpcan, T. and Pavel, L. (2009). Nash equilibrium design and optimization, International Conference on Game Theory for Networks, GameNets’ 09 , Istanbul, Turkey , pp. 164-170. Alpcan, T., Pavel, L. and Stefanovic, N. (2010). An optimization and control theoretic approach to noncooperative game design, arXiv:1007.0144 . Arrow, K.J. and Hurwicz, L. (1977). Studies in Resource Allocation Processes , Cambridge University Press, New York, NY. Basar, T. and Olsder, G. J. (1999

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Negotiating transfer pricing using the Nash bargaining solution

, International Journal of Applied Mathematics and Computer Science 21(2): 349-361, DOI: 10.2478/v10006-011-0026-x. Clempner, J.B. and Poznyak, A.S. (2015). Computing the strong Nash equilibrium forMarkov chains games, Applied Mathematics and Computation 265: 911-927. Clempner, J.B. and Poznyak, A.S. (2016). Convergence analysis for pure and stationary strategies in repeated potential games: Nash, Lyapunov and correlated equilibria, Expert Systems with Applications 46: 474-484. Clempner, J.B. and Poznyak, A.S. (2017

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On the Solutions of Games in Normal Forms: Particular Models based on Nash Equilibrium Theory

Behavior 3rd Ed., Princeton: Princeton University Press. Nax, H. (2015) Behavioral Game Theory . Zurich, Switzerland: ETH Editions. Owen G., (1995). Game Theory . New York: Academic Press. Pruzhansky V. (2011). Some interesting properties of maxi-min strategies. International Journal of Game Theory, IJGT. 40, 351-365. Quint T. and M. Shubik (1994). On the Number of Nash Equilibria in a Bimatrix Game, Technical Report . New York: Yale University Quint T. and M. Shubik (1995). A Bound on the Number of Pure Strategy Nash Equilibria in

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A symbolic shortest path algorithm for computing subgame-perfect Nash equilibria

decision diagrams: An efficient data structure for matrix representation, Formal Methods in System Design 10(2-3): 149-169. Garroppo, R.G., Giordano, S. and Tavanti, L. (2010). A survey on multi-constrained optimal path computation: Exact and approximate algorithms, Computer Networks 54(17): 3081-3107. Harrenstein, P., van der Hoek, W., Meyer, J.-J.C. and Witteveen, C. (2003). A modal characterization of Nash equilibrium, Fundamenta Informaticae 57(2-4): 281-321. Hermanns, H., Meyer-Kayser, J. and Siegle, M. (1999). Multi

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The Impact of the Variability of Precipitation and Temperatures on the Efficiency of a Conceptual Rainfall-Runoff Model

) Parameter transferability under changing climate: case study with a land surface model in the Durance watershed France . Hydrological Sciences Journal, 60:7-8, pp. 1408-1423. Doi: 10.1080/02626667.2014.993643. Merz, R. – Parajka, J. – Blöschl, G. (2011) Time stability of catchment model parameters: Implication for climate impact analyses . Water Resour. Res., 47, W02531. Doi: 10.1029/2010WR009505. Merz, R. – Blöschl, G. (2004) Regionalisation of catchment model parameters . Journal of Hydrology, (27), pp. 95-123. Doi: 10.1002/hyp.6253. Nash, J. E

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Effect of pentoxifylline on histological activity and fibrosis of nonalcoholic steatohepatitis patients: A one year randomized control trial

factor.[ 4 ] The prevalence of NAFLD in general population of Bangladesh has been estimated to vary from 4 to 18.4%, which jumps up to 49.8% in diabetic patients.[ 5 , 6 ] Nonalcoholic steatohepatitis (NASH), the progressive form of NAFLD, is characterized by hepatocellular damage, inflammation and liver fibrosis that can progress to cirrhosis.[ 7 - 9 ] The pathogenesis of NASH is multifactorial, inflammatory activation clearly plays a pivotal role in the disease progression. Chronic inflammation interplaying with increased oxidative stress, cytokine production

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Competitive Traffic Assignment in Road Networks

.H. (1980) Optimal traffic assignment with elastic demands: a review. Part I. Analysis framework. Transportation Science, 14(2), 174-191. 12. Haurie, A., Marcotte, P. (1985) On the relationship between Nash-Cournot and Wardrop equilibria. Networks, 15, 295-308. 13. Korilis, Y.A., Lazar, A.A. (1995) On the existence of equilibria in noncooperative optimal flow control. Journal of the Association for Computing Machinery, 42(3), 584-613. 14. Korilis, Y.A., Lazar, A.A., Orda, A. (1995) Architecting noncooperative networks. IEEE

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Serum Levels of Oxidative Stress Markers in Patients with Type 2 Diabetes Mellitus and Non-alcoholic Steatohepatitis

detect NASH patients responsive to an antioxidant treatment: a pilot study. Oxid Med Cell Longev. 2014; 2014:169216, 8 pages (1-8). 8. RUST C, GORES GJ. Apoptosis and liver disease. Am J Med. 2000; 108:567-574. 9. HALLIWELL B. Oxidative stress, nutrition and health. Experimental strategies for optimization of nutritional antioxidant intake in humans. Free Radic Res. 1996; 25:57-74. 10. ALBERTI KG, ECKEL RH, GRUNDY SM, ZIMMET PZ, CLEEMAN JI, DONATO KA, FRUCHART JC, JAMES WP, LORIA CM, SMITH SC JR; INTERNATIONAL DIABETES

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Investigating the role of customer churn in the optimal allocation of offensive and defensive advertising: the case of the competitive growing market

, G. (1983). The Nash solution of an advertising differential game: generalization of a model by Leitmann and Schmitendorf. IEEE Transactions on Automatic Control, 28(11), 1044-1048. Fruchter, G. E. (1999). Short communications-oligopoly advertising strategies with market expansion. Optimal Control Applications and Methods, 20(4), 199-212. Fruchter, G. E., & Kalish, S. (1997). Closed-loop advertising strategies in a duopoly. Management Science, 43(1), 54-63. Grosset, L., & Viscolani, B. (2015). Open-loop Nash

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Connection Between Non-Alcoholic Fatty Liver Disease and Diabetes Mellitus

References 1. Everhart JE, Bambha KM. Fatty liver: think globally. Hepatology 51: 1491-1493, 2010. 2. Day CP. Non-alcoholic fatty liver disease: a massive problem. Clin Med 11: 176-178, 2011. 3. Lazlo M, Clark JM. The epidemiology of nonalcoholic fatty liver disease: a global perspectiv. Semin Liver Dis 28: 339-350, 2008. 4. Serfaty L, Lemoine M. Definition and natural history of metabolic steatosis: clinical aspects of NAFLD, NASH and cirrhosis. Diabetes Metab 34: 634-637, 2008

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