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Toward a Comprehensive Theory of Climatic change

Published online by Cambridge University Press:  20 January 2017

Alan D. Hecht
Affiliation:
Climate Dynamics Program, National Science Foundation, Washington, D.C. 20550
John Imbrie
Affiliation:
Department of Geological Sciences, Brown University, Providence, Rhode Island 02912

Abstract

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Type
Editorial Introduction
Copyright
University of Washington

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References

Frankignoul, C., Hasselmann, K., (1977). Stochastic Climate Models. Part II. Application to Sea Surface Temperature Anomalies. Tellus. 29, 285305.Google Scholar
Hasselmann, K., (1976). Stochastic Climate Models. Part I. Theory. Tellus. 28, 473485.Google Scholar
Hays, J., Imbrie, J., Shackleton, N., (1976). Variations in the Earth's Orbit: Pacemaker of the Ice Age. Science. 194, 11211132.Google Scholar
Kuhn, T., (1970). The Structure of Scientific Revolution. Foundations of the Unity of Science. Vol. 2, Univ. of Chicago Press, Chicago, No.2.Google Scholar
Lemke, P., (1977). Stochastic Climate Models. Part 3. Application to Zonally Averaged Energy Models. Tellus. 29, 385392.Google Scholar
Mitchell, J.M. Jr., (1966). Stochastic Models of Air-Sea Interaction and Climatic Fluctuations. Symposium on the Arctic Heat Budget and Atmospheric Circulation. Lake Arrowhead, California 1966 Mem. RM-5233-NSF. The Rand Corp, Santa Monica, Calif. Google Scholar
Mitchell, J.M. Jr., (1976). An Overview of Climatic Variability and Its Causal Mechanisms. Quaternary Research. 6, 481493.Google Scholar
Pisias, N.G., Kipp, N.G., Imbrie, J., (1978). Spectra of Oceanic Variations in the Frequency Range 10−4 to 10−2 cycles/yr: Do Two-Time Constant Stochastic Models Fit?. Transactions of the American Geophysical Union. 59, 293.Google Scholar