On predicting climate under climate change
暂无分享,去创建一个
[1] Adam A. Scaife,et al. What is the current state of scientific knowledge with regard to seasonal and decadal forecasting? , 2012 .
[2] Martin L. Weitzman,et al. Fat-Tailed Uncertainty in the Economics of Catastrophic Climate Change , 2011, Review of Environmental Economics and Policy.
[3] A. Whitehead,et al. What might we learn from Climate Forecasts? , 2002 .
[4] E. Guilyardi,et al. Past and future polar amplification of climate change: climate model intercomparisons and ice-core constraints , 2006 .
[5] E. Hawkins,et al. The Potential to Narrow Uncertainty in Regional Climate Predictions , 2009 .
[6] Edward N. Lorenz,et al. Irregularity: a fundamental property of the atmosphere* , 1984 .
[7] D. Easterling,et al. Changes in climate extremes and their impacts on the natural physical environment , 2012 .
[8] Leonard A. Smith,et al. TITLE: The Myopia of Imperfect Climate Models: The Case of UKCP09 AUTHORS AND AFFILIATIONS: , 2013 .
[9] D A Stainforth,et al. Confidence, uncertainty and decision-support relevance in climate predictions , 2007, Philosophical Transactions of the Royal Society A: Mathematical, Physical and Engineering Sciences.
[10] Peter C. Chu,et al. Two Kinds of Predictability in the Lorenz System , 1999 .
[11] Vincent R. Gray. Climate Change 2007: The Physical Science Basis Summary for Policymakers , 2007 .
[12] Matthew D. Collins,et al. Climate predictability on interannual to decadal time scales: the initial value problem , 2002 .
[13] Michael Ghil,et al. Stochastic climate dynamics: Random attractors and time-dependent invariant measures , 2011 .
[14] Leonard A. Smith,et al. Adaptation to Global Warming: Do Climate Models Tell Us What We Need to Know? , 2010, Philosophy of Science.
[15] Carles Simó,et al. Bifurcations and strange attractors in the Lorenz-84 climate model with seasonal forcing , 2002 .
[16] L. K. Gohar,et al. How difficult is it to recover from dangerous levels of global warming? , 2009 .
[17] Anupam Sahay,et al. The search for a low-dimensional characterization of a local climate system , 1996, Philosophical Transactions of the Royal Society of London. Series A: Mathematical, Physical and Engineering Sciences.
[18] C. Deser,et al. Uncertainty in climate change projections: the role of internal variability , 2012, Climate Dynamics.
[19] David Ramsbottom,et al. The UK Climate Change Risk Assessment 2012 Evidence Report , 2012 .
[20] Paul J. Roebber,et al. Climate variability in a low-order coupled atmosphere-ocean model , 1995 .
[21] L. H. Miller. Table of Percentage Points of Kolmogorov Statistics , 1956 .
[22] T. Palmer. Extended-range atmospheric prediction and the Lorenz model , 1993 .
[23] Lennaert van Veen,et al. Active and passive ocean regimes in a low-order climate model , 2001 .
[24] Edward N. Lorenz,et al. Can chaos and intransitivity lead to interannual variability , 1990 .
[25] Richard L. Smith,et al. Quantifying Uncertainty in Projections of Regional Climate Change: A Bayesian Approach to the Analysis of Multimodel Ensembles , 2005 .
[26] F. Massey. The Kolmogorov-Smirnov Test for Goodness of Fit , 1951 .
[27] Edward S. Epstein,et al. The Role of Initial Uncertainties in Predicion , 1969 .
[28] Edward N. Lorenz,et al. Climatic Change as a Mathematical Problem , 1970 .
[29] Klaus Fraedrich,et al. Estimating the Dimensions of Weather and Climate Attractors , 1986 .
[30] W. Briggs. Statistical Methods in the Atmospheric Sciences , 2007 .
[31] William James Burroughs,et al. Climate : into the 21st century , 2003 .
[32] Matthew D. Collins,et al. UK Climate Projections Science Report: Climate Change Projections , 2009 .
[33] David B. Stephenson,et al. A Changing Climate for Prediction , 2007, Science.
[34] Tim Palmer,et al. A Nonlinear Dynamical Perspective on Climate Prediction , 1999 .
[35] J. Yorke,et al. Chaos, Strange Attractors, and Fractal Basin Boundaries in Nonlinear Dynamics , 1987, Science.
[36] J. Yorke,et al. Fractal basin boundaries , 1985 .
[37] Edward N. Lorenz,et al. Nondeterministic Theories of Climatic Change , 1976, Quaternary Research.
[38] José A. Langa,et al. Characterization of non-autonomous attractors of a perturbed infinite-dimensional gradient system , 2007 .
[39] H. Broer,et al. Quasi-periodic Henon-like attractors in the Lorenz-84 climate model with seasonal forcing , 2005 .
[40] E. Lorenz. Dimension of weather and climate attractors , 1991, Nature.
[41] Jim W Hall,et al. Using probabilistic climate change information from a multimodel ensemble for water resources assessment , 2009 .
[42] H. Stommel,et al. Thermohaline Convection with Two Stable Regimes of Flow , 1961 .
[43] C. Tebaldi,et al. Developing and applying uncertain global climate change projections for regional water management planning , 2008 .
[44] Peter Cox,et al. Nonlinearities, Feedbacks and Critical Thresholds within the Earth's Climate System , 2004 .
[45] Riddled basins in complex physical and biological systems , 2009 .