Nonzero-Sum Stochastic Games and Mean-Field Games with Impulse Controls
Published Online:16 Sep 2021https://doi.org/10.1287/moor.2021.1131
References
- [1] (2020) Nonzero-sum stochastic differential games with impulse controls: A verification theorem with applications. Math. Oper. Res. 45(1):205–232.Link, Google Scholar
- [2] (2019) A zero-sum stochastic differential game with impulses, precommitment, and unrestricted cost functions. Appl. Math. Optim. 79(2):483–514.Crossref, Google Scholar
- [3] (2019) Optimal price management in retail energy markets: An impulse control problem with asymptotic estimates. Math. Methods Oper. Res. 89(3):355–383.Crossref, Google Scholar
- [4] (2013) On the impulse control of jump diffusions. SIAM J. Control Optim. 51(3):2612–2637.Google Scholar
- [5] (2019) Sequential capacity expansion options. Oper. Res. 67(1):33–57.Link, Google Scholar
- [6] (1982) Impulse Control and Quasi-Variational Inequalities (Bordas, Paris).Google Scholar
- [7] (2016) Linear-quadratic mean field games. J. Optim. Theory Appl. 169(2):496–529.Google Scholar
- [8] (2016) On classical and restricted impulse stochastic control for the exchange rate. Appl. Math. Optim. 74(2):423–545.Google Scholar
- [9] (2000) Risk sensitive asset management with transaction costs. Finance Stochastics 4(1):1–33.Crossref, Google Scholar
- [10] (2000) Classical and impulse stochastic control of the exchange rate using interest rates and reserves. Math. Finance 10(2):141–156.Crossref, Google Scholar
- [11] (2010) Optimal control of a mean-reverting inventory. Oper. Res. 58(6):1697–1710.Link, Google Scholar
- [12] Campi L, De Santis D (2020) Nonzero-sum stochastic differential games between an impulse controller and a stopper. J. Optim. Theory Appl. 186:688–724.Crossref, Google Scholar
- [13] (2006) Classical and impulse stochastic control for the optimization of the dividend and risk policies of an insurance firm. Math. Finance 16(1):181–202.Google Scholar
- [14] Carmona R, Delarue F (2018) Probabilistic Theory of Mean Field Games with Applications I, vol. 83 (Springer, Cham).Google Scholar
- [15] (2018) Probabilistic Theory of Mean Field Games with Applications II, vol. 84 (Springer, Cham).Google Scholar
- [16] (2015) Mean field games and systemic risk. Comm. Math. Sci. 13(4):911–933.Google Scholar
- [17] (1978) Existence of optimal simple policies for discounted-cost inventory and cash management in continuous time. Oper. Res. 26(4):620–636.Google Scholar
- [18] (2013) Stochastic differential games involving impulse controls and double-obstacle quasi-variational inequalities. SIAM J. Control Optim. 51(3):2102–2131.Crossref, Google Scholar
- [19] (1988) Optimal impulse control of portfolios. Math. Oper. Res. 13(4):588–605.Link, Google Scholar
- [20] (2019) On a strategic model of pollution control. Ann. Oper. Res. 275(2):297–319.Crossref, Google Scholar
- [21] Cao H, Guo X (2021) MFGs for partially reversible investment. Stochastic Processes Their Appl. Forthcoming.Google Scholar
- [22] (2010) Smooth fit principle for impulse control of multi-dimensional diffusion processes. SIAM J. Control Optim. 48(2):594–617.Google Scholar
- [23] (2019) Stochastic games for fuel followers problem: N vs MFG. SIAM J. Control Optim. 57(1):659–692.Crossref, Google Scholar
- [24] (1983) Instantaneous control of Brownian motion. Math. Oper. Res. 8(3):439–453.Google Scholar
- [25] (1983) Impulse control of Brownian motion. Math. Oper. Res. 8(3):454–466.Google Scholar
- [26] (2006) Large population stochastic dynamic games: Closed-loop McKean-Vlasov systems and the Nash certainty equivalence principle. Comm. Inform. Systems 6(3):221–252.Crossref, Google Scholar
- [27] (1995) Optimization of the flow of dividends. Russian Math. Surveys 50(2):257–277.Crossref, Google Scholar
- [28] (1998) Portfolio optimisation with strictly positive transaction costs and impulse control. Finance Stochastics 2(2):85–114.Google Scholar
- [29] Korn R (1999) Some applications of impulse control in mathematical finance. Math. Methods Oper. Res. 50(3):493–518.Google Scholar
- [30] (2019) Mean field and n-agent games for optimal investment under relative performance criteria. Math. Finance 29(4):1003–1038.Crossref, Google Scholar
- [31] (2007) Mean field games. Japanese J. Math. 2(1):229–260.Crossref, Google Scholar
- [32] (2007) A model of optimal portfolio selection under liquidity risk and price impact. Finance Stochastics 11(1):51–90.Google Scholar
- [33] (1994) Interactions of corporate financing and investment decisions: A dynamic framework. J. Finance 49(4):1253–1277.Crossref, Google Scholar
- [34] (2014) Impulse control of interest rates. Oper. Res. 62(3):602–615.Link, Google Scholar
- [35] (1995) Optimal portfolio management with fixed transaction costs. Math. Finance 5(4):337–356.Crossref, Google Scholar
- [36] (1998) Optimal stochastic intervention control with application to the exchange rate. J. Math. Econom. 29(2):225–243.Crossref, Google Scholar
- [37] (2003) Stochastic Differential Equations (Springer, Berlin, Heidelberg).Crossref, Google Scholar
- [38] (2002) Optimal consumption and portfolio with both fixed and proportional transaction costs. SIAM J. Control Optim. 40(6):1765–1790.Crossref, Google Scholar
- [39] (2007) Applied Stochastic Control of Jump Diffusions, 2nd ed. (Springer, Berlin).Crossref, Google Scholar
- [40] (1986) A solvable one-dimensional model of a diffusion inventory system. Math. Oper. Res. 11(1):125–133.Google Scholar
- [41] (1990) Valuing flexibility as a complex option. J. Finance 45(2):549–565.Crossref, Google Scholar
