P. [. Athans, . A. Falbalb05-]-v, P. L. Alexeev, J. R. Langen, and . Bates, Optimal Control: An Introduction to the Theory and its Applications, Courier Corporation Polar amplification of surface warming on an aquaplanet in " ghost forcing " experiments without sea ice feedbacks, Climate Dynamics, vol.24, pp.7-8, 2005.

U. [. Alt and . Mackenroth, Convergence of Finite Element Approximations to State Constrained Convex Parabolic Boundary Control Problems, SIAM Journal on Control and Optimization, vol.27, issue.4, pp.718-736, 1989.
DOI : 10.1137/0327038

R. Bermejo, J. Carpio, J. I. Díaz, and L. Tello, Mathematical and numerical analysis of a nonlinear diffusive climate energy balance model, Mathematical and Computer Modelling, vol.49, issue.5-6, pp.1180-1210, 2009.
DOI : 10.1016/j.mcm.2008.04.010

A. Bensoussan, G. Da-prato, M. C. Delfour, and S. Mitter, Representation and control of infinite dimensional systems Energy balance climate models and general equilibrium optimal mitigation policies, J. Economic Dynamics and Control, vol.37, pp.2371-2396, 2007.

K. [. Banks and . Kunisch, The Linear Regulator Problem for Parabolic Systems, SIAM Journal on Control and Optimization, vol.22, issue.5, pp.684-698, 1984.
DOI : 10.1137/0322043

M. D. Chekroun, M. Ghil, H. Liu, and S. Wang, Low-dimensional Galerkin approximations of nonlinear delay differential equations, Disc. Cont. Dyn. Sys. A, vol.36, issue.8, pp.4133-4177, 2016.

M. [. Chekroun, J. D. Ghil, and . Neelin, Pullback attractor crisis in a delay differential ENSO model Advances in Nonlinear Geosciences, to appear (A. Tsonis Cazenave and A. Haraux, An Introduction to Semilinear Evolution Equations, Oxford Lecture Series in Mathematics and its Applications Chekroun and H. Liu, Finite-horizon parameterizing manifolds, and applications to suboptimal control of nonlinear parabolic PDEs, pp.81-144, 1998.

M. D. Chekroun, H. Liu, and S. Wang, Approximation of Stochastic Invariant Manifolds: Stochastic Manifolds for Nonlinear SPDEs I Stochastic Parameterizing Manifolds and Non-Markovian Reduced Equations: Stochastic Manifolds for Nonlinear SPDEs II, Briefs in Mathematics, 2015.
DOI : 10.1007/978-3-319-12496-4

M. D. Chekroun, J. D. Neelin, D. Kondrashov, J. C. Mcwilliams, and M. Ghil, Rough parameter dependence in climate models: The role of Ruelle-Pollicott resonances Climate intervention: Carbon dioxide removal and reliable sequestration Climate intervention: Reflecting sunlight to cool earth, Proc. Natl. Acad. Sci. USACou15a] National Research Council Crowley, Causes of climate change over the past 1000 years, pp.1684-1690, 2000.

J. I. Díaz and G. Hetzer, A quasilinear functional reaction-diffusion equation arising in climatology, Equations aux dérivées partielles et applications (Articles dédiés à J, Lions), Gauthier-Villars (Éditions Scientifique et Médicales Elsevier, pp.461-480, 1998.

K. Deckelnick and M. Hinze, Semidiscretization and error estimates for distributed control of the instationary Navier- Stokes equations, Numerische Mathematik, vol.97, issue.2, pp.297-320, 2004.

]. J. Día94a and . Díaz, Approximate controlability for some simple climate models, Environment, economic and their mathematical models, Research Notes in Applied Mathematics, issue.35, pp.29-43, 1994.

. A. Dtv-+-16-]-h, A. Dijkstra, J. Tantet, E. Viebahn, M. Mulder et al., A numerical framework to understand transitions in high-dimensional stochastic dynamical systems, dzw003. [Fat99] H. O. Fattorini, Infinite Dimensional Optimization and Control Theory, Encyclopedia of Mathematics and its Applications, 1999.

R. Ferretti, Internal approximation schemes for optimal control problems in Hilbert spaces, J. Mathematical Systems Estimation and Control, vol.7, pp.1-25, 1997.

]. A. Fur00, M. Fursikov, M. D. Ghil, E. Chekroun, and . Simonnet, Optimal Control of Distributed Systems Climate dynamics and fluid mechanics: Natural variability and related uncertainties, Theory and Applications, Translations of Mathematical Monographs Physica D: Nonlinear Phenomena, vol.187, issue.237 14, pp.2111-2126, 2000.

]. M. Ghi76 and . Ghil, Climate stability for a Sellers-type model, J. Atmos. Sci, vol.33, pp.3-20, 1976.

J. S. Gibson, The Riccati Integral Equations for Optimal Control Problems on Hilbert Spaces, SIAM Journal on Control and Optimization, vol.17, issue.4, pp.537-565, 1979.
DOI : 10.1137/0317039

A. [. Garcke and . Kröner, Suboptimal Feedback Control of PDEs by Solving HJB Equations on Adaptive Sparse Grids, Journal of Scientific Computing, vol.28, issue.4, pp.1-28, 2016.
DOI : 10.1007/s10915-016-0240-7
URL : https://hal.archives-ouvertes.fr/hal-01185912

W. [. Graves, G. R. Lee, and . North, New parameterizations and sensitivities for simple climate models, Journal of Geophysical Research: Atmospheres, vol.28, issue.D3, pp.5025-5036, 1993.
DOI : 10.1029/92JD02666

]. J. Gol85 and . Goldstein, Semigroups of Linear Operators and Applications [Gri09] A. Grigor'yan, Heat Kernel and Analysis on Manifolds [Hal09] S. Hallegatte, Strategies to adapt to an uncertain climate change, Global environmental change, vol.19, issue.2, pp.240-247, 1985.

W. T. Hyde, T. J. Crowley, K. Kim, and G. R. North, Comparison of GCM and Energy Balance Model Simulations of Seasonal Temperature Changes over the Past 18 000 Years, Journal of Climate, vol.2, issue.8, pp.864-887, 1989.
DOI : 10.1175/1520-0442(1989)002<0864:COGAEB>2.0.CO;2

M. Hinze, R. Pinnau, M. Ulbrich, and S. Ulbrich, Optimization with PDE Constraints Mathematical Modeling: Theory and Applications Atmospheric general circulation modeling, Climate system modeling, pp.317-370, 1992.

K. [. Kröner, H. Kunisch, and . Zidani, Optimal feedback control for undamped wave equations by solving a HJB equation, ESAIM: Control, Optimisation and Calculus of Variations, vol.21, issue.2, pp.442-464, 1982.
DOI : 10.1051/cocv/2014033

K. [. Kiehl and . Trenberth, Earth's Annual Global Mean Energy Budget, Bulletin of the American Meteorological Society, vol.78, issue.2, pp.197-208, 1997.
DOI : 10.1175/1520-0477(1997)078<0197:EAGMEB>2.0.CO;2
URL : http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.168.831

]. I. Las80 and . Lasiecka, Unified theory for abstract parabolic boundary problems-a semigroup approach, Applied mathematics & optimization, vol.6, issue.1, pp.287-333, 1980.

I. Lasiecka and R. Triggiani, The regulator problem for parabolic equations with dirichlet boundary control, Applied Mathematics & Optimization, vol.16, issue.1, pp.147-168, 1987.
DOI : 10.1007/BF01442189

N. [. Lenton and . Vaughan, Control Theory for Partial Differential Equations: Continuous and Approximation Theories. I, Encyclopedia of Mathematics and its Applications The radiative forcing potential of different climate geoengineering options, Atmos. Chem. Phys, vol.74, issue.9, pp.5539-5561, 2000.

]. K. Mal82 and . Malanowski, Convergence of approximations vs regularity of solutions for convex, control-constrained optimalcontrol problems, Applied Mathematics & Optimization, vol.8, issue.1, pp.69-95, 1982.

W. [. Mcknight and J. Bosarge, The Ritz???Galerkin Procedure for Parabolic Control Problems, SIAM Journal on Control, vol.11, issue.3, pp.510-524, 1973.
DOI : 10.1137/0311040

M. Meinshausen, N. Meinshausen, W. Hare, S. C. Raper, K. Frieler et al., Greenhouse-gas emission targets for limiting global warming to 2?????C, Nature, vol.104, issue.7242, pp.1158-1162, 2009.
DOI : 10.1038/nature08017

J. M. Murphy, D. M. Sexton, D. N. Barnett, G. S. Jones, M. J. Webb et al., Quantification of modelling uncertainties in a large ensemble of climate change simulations, Nature, vol.430, issue.7001, pp.768-772, 2004.
DOI : 10.1038/nature01092a

R. [. Medjo, M. Temam, and . Ziane, Optimal and robust control of fluid flows: some theoretical and computational aspects Adaptive space-time finite element methods for parabolic optimization problems, Applied Mechanics Reviews SIAM Journal on Control and Optimization, vol.61, issue.46 1, pp.116-142, 2007.

J. D. Neelin, D. S. Battisti, A. C. Hirst, F. Jin, Y. Wakata et al., ENSO theory, Journal of Geophysical Research: Oceans, vol.115, issue.C7, pp.14261-14290, 1978.
DOI : 10.1029/97JC03424

R. [. North, J. A. Cahalan, and . Coakley, Energy balance climate models, Reviews of Geophysics, vol.207, issue.1, pp.91-121, 1981.
DOI : 10.1029/RG019i001p00091
URL : http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.451.9474

D. [. North and J. G. Short, Simple energy balance model resolving the seasons and the continents: Application to the astronomical theory of the ice ages, Journal of Geophysical Research, vol.261, issue.C11, pp.88-6576, 1983.
DOI : 10.1029/JC088iC11p06576

I. Neitzel and B. Vexler, A priori error estimates for space???time finite element discretization of semilinear parabolic optimal control problems, Numerische Mathematik, vol.117, issue.4, pp.345-386, 2012.
DOI : 10.1007/s00211-011-0409-9

]. A. Paz83 and . Pazy, Semigroups of Linear Operators and Applications to Partial Differential Equations, Applied Mathematical Sciences, vol.44, 1983.

M. L. Roques, M. Chekroun, S. Cristofol, M. Soubeyrand, and . Ghil, Parameter estimation for energy balance models with memory, Proc. R. Soc. A, pp.20140349-20140356, 2014.
DOI : 10.1126/science.261.5121.578
URL : https://hal.archives-ouvertes.fr/hal-01264057

D. Stone, M. R. Allen, F. Selten, M. Kliphuis, and P. A. Stott, The Detection and Attribution of Climate Change Using an Ensemble of Opportunity, Journal of Climate, vol.20, issue.3, pp.504-516, 2007.
DOI : 10.1175/JCLI3966.1

W. D. Sellers, A Global Climatic Model Based on the Energy Balance of the Earth-Atmosphere System, Journal of Applied Meteorology, vol.8, issue.3, pp.392-400, 1969.
DOI : 10.1175/1520-0450(1969)008<0392:AGCMBO>2.0.CO;2

]. J. She09 and . Shepherd, Geoengineering the climate: Science, governance and uncertainty, 2009.

. L. Slw-+-12-]-g, J. Stephens, M. Li, C. A. Wild, N. Clayson et al., An update on Earth's energy balance in light of the latest global observations, Nature Geoscience, vol.5, issue.10, pp.691-696, 2012.

]. F. Trö93 and . Tröltzsch, Semidiscrete Ritz-Galerkin approximation of nonlinear parabolic boundary control problems, Optimal control, Internat. Ser. Numer. Math, vol.111, pp.57-68, 1991.

F. Tröltzsch, Optimal Control of Partial Differential Equations: Theory, Methods and Applications, Graduate Studies in Mathematics, vol.112, 2010.
DOI : 10.1090/gsm/112

L. [. Tziperman, M. A. Stone, H. Cane, and . Jarosh, El Nino Chaos: Overlapping of Resonances Between the Seasonal Cycle and the Pacific Ocean-Atmosphere Oscillator, Science, vol.264, issue.5155, pp.72-74, 1994.
DOI : 10.1126/science.264.5155.72

T. [. Vaughan and . Lenton, A review of climate geoengineering proposals, Climatic Change, vol.71, issue.1???2, pp.745-790, 2011.
DOI : 10.1007/s10584-011-0027-7

[. Neumann, Can we survive technology?, Fortune, 1955.

D. Of, . Oceanic, . Sciences, . University, L. California et al., CA 90095- 1565, USA E-mail address: mchekroun@atmos.ucla