Existence and Uniqueness of Solutions to Backward 2D and 3D Stochastic Convective Brinkman–Forchheimer Equations Forced by Lévy Noise

Antontsev, S.N., de Oliveira, H.B.: The Navier-Stokes problem modified by an absorption term. Appl. Anal. 89(12), 1805–1825 (2010) Applebaum, D.: Lévy processes and stochastic calculus, Cambridge Studies in Advanced Mathematics, Vol. 93, Cambridge University Press, Cambridge (2004) Al-Hussein, A.: Backward stochastic partial differential equations driven by infinite-dimensional martingales and applications. Stochastics 81(6), 601–626 (2009) Bardos, C., Tartar, L.: Sur l’unicité retrograde des équations paraboliques et questions voisines. Arch. Ration. Mech. Anal. 50, 10–25 (1973) Barbu, V., Röckner, M.: Backward uniqueness of stochastic parabolic like equations driven by Gaussian multiplicative noise. Stochastic Process. Appl. 126(7), 2163–2179 (2016) Bessaih, H., Millet, A.: On stochastic modified 3D Navier-Stokes equations with anisotropic viscosity. J. Math. Anal. Appl. 462, 915–956 (2018) Briand, P., Delyon, B., Hu, Y., Pardoux, E., Stoica, L.: \(L^p\) solutions of backward stochastic differential equations. Stochastic Process. Appl. 108, 109–129 (2003) Brzeźniak, Z., Dhariwal, G.: Stochastic tamed Navier-Stokes equations on \(\mathbb{R}^3\): the existence and the uniqueness of solutions and the existence of an invariant measure, J. Math. Fluid Mech., 22, Ar. 23 (2020) Brzeźniak, Z., Hausenblas, E., Razafimandimby, P.A.: Stochastic reaction-diffusion equations driven by jump processes. Potential Anal. 49, 131–201 (2018) Brzeźniak, Z., Hausenblas, E., Zhu, J.: 2D stochastic Navier-Stokes equations driven by jump noise. Nonlinear Anal. 79, 122–139 (2013) Burkholder, D.L.: The best constant in the Davis inequality for the expectation of the martingale square function. Trans. Am. Math. Soc. 354(1), 91–105 (2002) Chen, S., Tang, S.: Semi-linear backward stochastic integral partial differential equations driven by a Brownian motion and a Poisson point process. Math. Control Relat. Fields 5(3), 401–434 (2015) Da Prato, G., Zabczyk, J.: Stochastic Equations in Infinite Dimensions. Cambridge University Press, Cambridge (1992) Davis, B.: On the integrability of the martingale square function. Israel J. Math. 8(2), 187–190 (1970) Delbaen, F., Tang, S.: Harmonic analysis of stochastic equations and backward stochastic differential equations. Probab. Theory Related Fields 146, 291–336 (2010) Delbaen, F., Qiu, J., Tang, S.: Forward-backward stochastic differential systems associated to Navier-Stokes equations in the whole space. Stochastic Process. Appl. 125(7), 2516–2561 (2015) Dong, Z., Zhang, R.: 3D tamed Navier-Stokes equations driven by multiplicative Lévy noise: Existence, uniqueness and large deviations. J. Math. Anal. Appl. 492(1), 124404 (2020) Du, K., Qiu, J., Tang, S.: \(L^p\) theory for super-parabolic backward stochastic partial differential equations in the whole space. Appl. Math. Optim. 65(2), 175–219 (2012) Du, K., Tang, S.: Strong solution of backward stochastic partial differential equations in \(C^2\) domains. Probab. Theory Related Fields 154(1–2), 255–285 (2012) Du, K., Tang, S., Zhang, Q.: \(W^{m, p}\)-solution (\(p\ge 2\)) of linear degenerate backward stochastic partial differential equations in the whole space. J. Differential Equations 254(7), 2877–2904 (2013) Duffie, D., Epstein, L.: Stochastic differential utility. Econometrica 60, 353–394 (1992) El Karoui, N., Mazliak, L.: Backward Stochastic Differential Equations. Longman, Harlow, HK (1997) Farwig, R., Kozono, H., Sohr, H.: An \(L^q\)-approach to Stokes and Navier-Stokes equations in general domains. Acta Math. 195, 21–53 (2005) Fefferman, C.L., Hajduk, K.W., Robinson, J.C.: Simultaneous approximation in Lebesgue and Sobolev norms via eigenspaces. Proc. Lond. Math. Soc. (3)125(4), 759–777 (2022) Fernando, B.P.W., Sritharan, S.S.: Nonlinear filtering of stochastic Navier-Stokes equation with Itô-Lévy noise. Stoch. Anal. Appl. 31(3), 381–426 (2013) Galdi, G.P.: An introduction to the Navier–Stokes initial-boundary value problem. pp. 11–70 in Fundamental directions in mathematical fluid mechanics. Adv. Math. Fluid Mech. Birkhaüser, Basel (2000) Ghidaglia, J.M.: Some backward uniqueness results. Nonlinear Anal. TMA 10(8), 777–790 (1986) Hajduk, K.W., Robinson, J.C.: Energy equality for the 3D critical convective Brinkman-Forchheimer equations. J. Differential Equations 263, 7141–7161 (2017) Hong, Y.: Stochastic analysis of backward tidal dynamics equation. Commun. Stoch. Anal. 5(4), 745–768 (2011) Hu, Y., Ma, J., Yong, J.: On semi-linear degenerate backward stochastic partial differential equations. Probab. Theory Related Fields 123, 381–411 (2002) Hu, Y., Peng, S.: Adapted solution of a backward semilinear stochastic evolution equations. Stoch. Anal. Appl. 9, 445–459 (1991) Ichikawa, A.: Some inequalities for martingales and stochastic convolutions. Stoch. Anal. Appl. 4(3), 329–339 (1986) Ikeda, N., Watanabe, S.: Stochastic Differential Equations and Diffusion Processes. North-Holland Publishing Company, Amsterdam (1981) Kalantarov, V.K., Zelik, S.: Smooth attractors for the Brinkman-Forchheimer equations with fast growing nonlinearities, Commun. Pure. Appl. Anal. 11, 2037–2054 (2012) Kruse, T., Popier, A.: Lp-solution for BSDEs with jumps in the case \(p<2\): corrections to the paper ‘BSDEs with monotone generator driven by Brownian and Poisson noises in a general filtration’. Stochastics 89(8), 1201–1227 (2017) Kukavica, I.: Log-log convexity and backward uniqueness. Proc. Amer. Math. Soc. 135(8), 2415–2421 (2007) Kumar, P., Mohan, M.T.: Well-posedness of an inverse problem for two and three dimensional convective Brinkman-Forchheimer equations with the final overdetermination. Inverse Probl. Imaging 16(5), 1255–1298 (2022) Kumar, P., Mohan, M.T.: Existence, uniqueness and stability of an inverse problem for two-dimensional convective Brinkman–Forchheimer equations with the integral overdetermination. Banach J. Math. Anal. 16(4), Paper No. 58, 32 pp (2022) Kunita, H.: Stochastic flows and jump-diffusions, Probability Theory and Stochastic Modelling, 92. Springer, Singapore (2019) Ladyzhenskaya, O.A.: The Mathematical Theory of Viscous Incompressible Flow. Gordon and Breach, New York (1969) Lions, J.L.: Optimal Control of Systems Governed by Partial Differential Equations. Springer, New York (1978) Liu, H., Gao, H.: Stochastic 3D Navier-Stokes equations with nonlinear damping: martingale solution, strong solution and small time LDP, Chapter 2 in Interdisciplinary Mathematical SciencesStochastic PDEs and Modelling of Multiscale Complex System, 9–36 (2019) Liu, W., Röckner, M.: Local and global well-posedness of SPDE with generalized coercivity conditions. J. Differ. Equ. 254, 725–755 (2013) Liu, W., Zhu, R.: Well-posedness of backward stochastic partial differential equations with Lyapunov condition. Forum Math. 32(3), 723–738 (2020) Ma, J., Yong, J.: Adapted solution of a degenerate backward SPDE, with applications. Stochastic Process. Appl. 70, 59–84 (1997) Ma, J., Yong, J.: On linear, degenerate backward stochastic partial differential equations. Probab. Theory Related Fields 113, 135–170 (1999) Ma, J., Protter, P., Yong, J.: Solving forward-backward stochastic differential equations explicitly: a four step scheme. Probab. Theory Related Fields 98, 339–359 (1994) Markowich, P.A., Titi, E.S., Trabelsi, S.: Continuous data assimilation for the three-dimensional Brinkman-Forchheimer-extended Darcy model. Nonlinearity 29(4), 1292–1328 (2016) Manna, U., Mohan, M.T., Sritharan, S.S.: Stochastic non-resistive magnetohydrodynamic system with Lévy noise. Random Oper. Stoch. Equ. 25(3), 155–194 (2017) Menaldi, J.-L., Sritharan, S.S.: Stochastic 2-D Navier-Stokes equation. Appl. Math. Optim. 46(1), 31–53 (2002) Métivier, M.: Stochastic partial differential equations in infinite-dimensional spaces. Quaderni, Scuola Normale Superiore, Pisa (1988) Mohan, M.T.: On convective Brinkman-Forchheimer equations, Submitted Mohan, M.T.: Stochastic convective Brinkman-Forchheimer equations. arXiv:2007.09376 Mohan, M.T.: Well-posedness and asymptotic behavior of stochastic convective Brinkman–Forchheimer equations perturbed by pure jump noise. Stoch. PDE: Anal. Comp. 10, 614–690 (2022) Mohan, M.T.: \({\mathbb{L}}^p\)-solutions of deterministic and stochastic convective Brinkman-Forchheimer equations. Anal. Math. Phys. 11, Ar. No.: 164 (2021) Mohan, M.T.: Martingale solutions of two and three dimensional stochastic convective Brinkman-Forchheimer equations forced by Lévy noise, Submitted. arXiv:2109.05510 Motyl, E.: Stochastic Navier-Stokes equations driven by Lévy noise in unbounded 3D domains. Potential Anal. 38, 863–912 (2013) Oksendal, B., Sulem, A.: Applied Stochastic Control of Jump Diffusions, 3rd edn. Springer, New York (2019) Oksendal, B., Proske, F., Zhang, T.: Backward stochastic partial differential equations with jumps and application to optimal control of random jump fields. Stochastics 77(5), 381–399 (2005) Pardoux, E., Peng, S.: Adapted solution of a backward stochastic differential equation. Syst. Control Lett. 14, 55–61 (1990) Peszat, S., Zabczyk, J.: Stochastic Partial Differential Equations with Lévy Noise. Cambridge University Press, Cambridge, UK (2007) Pardoux, E., Rascanu, A.: Stochastic Differential Equations. Backward SDEs, Partial Differential Equations, Springer, Cham (2014) Qiu, J., Tang, S., You, Y.: 2D backward stochastic Navier-Stokes equations with nonlinear forcing. Stochastic Process. Appl. 122(1), 334–356 (2012) Robinson, J.C.: Infinite-Dimensional Dynamical Systems, An Introduction to Dissipative Parabolic PDEs and the Theory of Global Attractors, Cambridge Texts in Applied Mathematics (2001) Robinson, J.C., Rodrigo, J.L., Sadowski, W.: The Three-Dimensional Navier-Stokes Equations. Cambridge Studies in Advanced Mathematics, Cambridge University Press, Classical Theory (2016) Robinson, J.C., Sadowski, W.: A local smoothness criterion for solutions of the 3D Navier-Stokes equations. Rend. Semin. Mat. Univ. Padova 131, 159–178 (2014) Robinson, J.C.: Attractors and finite-dimensional behaviour in the 2D Navier-Stokes equations. ISRN Math. Anal. 2013, Art. ID 291823, 29 pp Röckner, M., Zhang, X.: Tamed 3D Navier-Stokes equation: existence, uniqueness and regularity, Infin. Dimens. Anal. Quantum Probab. Relat. Top. 12, 525–549 (2009) Röckner, M., Zhang, X.: Stochastic tamed 3D Navier-Stokes equation: existence, uniqueness and ergodicity. Probab. Theory Related Fields 145, 211–267 (2009) Rong, S.: On solutions of backward stochastic differential equations with jumps and applications. Stochas. Process. Appl. 66, 209–236 (1997) Rong, S.: Theory of Stochastic Differential Equations with Jumps and Applications. Springer, New York (2005) Sakthivel, K., Sritharan, S.S., Sivaguru, S.: Martingale solutions for stochastic Navier-Stokes equations driven by Lévy noise. Evol. Equ. Control Theory 1(2), 355–392 (2012) Sritharan, S.S.: An Introduction to Deterministic and Stochastic Control of Viscous Flow, Chapter in Optimal Control of Viscous Flow, 1–42. SIAM, Philadelphia, PA (1998) Sritharan, S.S.: Deterministic and stochastic control of Navier-Stokes equation with linear, monotone, and hyperviscosities. Appl. Math. Optim. 41(2), 255–308 (2000) Sritharan, S.S., Sundar, P.: Large deviations for the two-dimensional Navier-Stokes equations with multiplicative noise. Stochastic Process. Appl. 116, 1636–1659 (2006) Sundar, P., Yin, H.: Existence and uniqueness of solutions to the backward stochastic Lorenz system. Commun. Stoch. Anal. 1(3), 473–483 (2007) Sundar, P., Yin, H.: Existence and uniqueness of solutions to the backward 2D stochastic Navier-Stokes equations. Stochastic Process. Appl. 119, 1216–1234 (2009) Tang, S.: Semi-linear systems of backward stochastic partial differential equations in \({\mathbb{R} }^n\). Chin. Ann. Math. Ser. B 26, 437–456 (2005) Temam, R.: Navier–Stokes Equations. Theory and Numerical Analysis, North-Holland, Amsterdam (1984) Temam, R.: Navier–Stokes Equations and Nonlinear Functional Analysis, 2nd Edition, CBMS-NSF Regional Conference Series in Applied Mathematics (1995) Yao, S.: \({\mathbb{L} }^p\) solutions of backward stochastic differential equations with jumps. Stochastic Process. Appl. 127(11), 3465–3511 (2017) Yong, J., Zhou, X.Y.: Stochastic Controls-Hamiltonian Systems and HJB Equations. Springer, New York (1999) Zhang, J.: Backward Stochastic Differential Equations. Springer, New York (2017) Zhou, Q., Ren, Y., Wu, W.: On solutions to backward stochastic partial differential equations for Lévy processes., J. Comput. Appl. Math.235(18), 5411–5421 (2011)