Climate model explained

Numerical climate models (or climate system models) are mathematical models that can simulate the interactions of important drivers of climate. These drivers are the atmosphere, oceans, land surface and ice. Scientists use climate models to study the dynamics of the climate system and to make projections of future climate and of climate change. Climate models can also be qualitative (i.e. not numerical) models and contain narratives, largely descriptive, of possible futures.[1]

Climate models take account of incoming energy from the Sun as well as outgoing energy from Earth. An imbalance results in a change in temperature. The incoming energy from the Sun is in the form of short wave electromagnetic radiation, chiefly visible and short-wave (near) infrared. The outgoing energy is in the form of long wave (far) infrared electromagnetic energy. These processes are part of the greenhouse effect.

Climate models vary in complexity. For example, a simple radiant heat transfer model treats the Earth as a single point and averages outgoing energy. This can be expanded vertically (radiative-convective models) and horizontally. More complex models are the coupled atmosphere–ocean–sea ice global climate models. These types of models solve the full equations for mass transfer, energy transfer and radiant exchange. In addition, other types of models can be interlinked. For example Earth System Models include also land use as well as land use changes. This allows researchers to predict the interactions between climate and ecosystems.

Climate models are systems of differential equations based on the basic laws of physics, fluid motion, and chemistry. Scientists divide the planet into a 3-dimensional grid and apply the basic equations to those grids. Atmospheric models calculate winds, heat transfer, radiation, relative humidity, and surface hydrology within each grid and evaluate interactions with neighboring points. These are coupled with oceanic models to simulate climate variability and change that occurs on different timescales due to shifting ocean currents and the much larger combined volume and heat capacity of the global ocean. External drivers of change may also be applied. Including an ice-sheet model better accounts for long term effects such as sea level rise.

Uses

There are three major types of institution where climate models are developed, implemented and used:

Big climate models are essential but they are not perfect. Attention still needs to be given to the real world (what is happening and why). The global models are essential to assimilate all the observations, especially from space (satellites) and produce comprehensive analyses of what is happening, and then they can be used to make predictions/projections. Simple models have a role to play that is widely abused and fails to recognize the simplifications such as not including a water cycle.[2]  

Energy balance models (EBMs)

Simulation of the climate system in full 3-D space and time was impractical prior to the establishment of large computational facilities starting in the 1960s. In order to begin to understand which factors may have changed Earth's paleoclimate states, the constituent and dimensional complexities of the system needed to be reduced. A simple quantitative model that balanced incoming/outgoing energy was first developed for the atmosphere in the late 19th century. Other EBMs similarly seek an economical description of surface temperatures by applying the conservation of energy constraint to individual columns of the Earth-atmosphere system.

Essential features of EBMs include their relative conceptual simplicity and their ability to sometimes produce analytical solutions. Some models account for effects of ocean, land, or ice features on the surface budget. Others include interactions with parts of the water cycle or carbon cycle. A variety of these and other reduced system models can be useful for specialized tasks that supplement GCMs, particularly to bridge gaps between simulation and understanding.[3] [4]

Zero-dimensional models

Zero-dimensional models consider Earth as a point in space, analogous to the pale blue dot viewed by Voyager 1 or an astronomer's view of very distant objects. This dimensionless view while highly limited is still useful in that the laws of physics are applicable in a bulk fashion to unknown objects, or in an appropriate lumped manner if some major properties of the object are known. For example, astronomers know that most planets in our own solar system feature some kind of solid/liquid surface surrounded by a gaseous atmosphere.

Model with combined surface and atmosphere

A very simple model of the radiative equilibrium of the Earth is

(1-a)S\pir2=4\pir2\epsilon\sigmaT4

where

The constant parameters include

\sigma

is the Stefan–Boltzmann constant—approximately 5.67×10−8 J·K−4·m−2·s−1

The constant

\pir2

can be factored out, giving a nildimensional equation for the equilibrium

(1-a)S=4\epsilon\sigmaT4

where

The remaining variable parameters which are specific to the planet include

a

is Earth's average albedo, measured to be 0.3.[5] [6]

T

is Earth's average surface temperature, measured as about 288 K as of year 2020[7]

\epsilon

is the effective emissivity of Earth's combined surface and atmosphere (including clouds). It is a quantity between 0 and 1 that is calculated from the equilibrium to be about 0.61. For the zero-dimensional treatment it is equivalent to an average value over all viewing angles.

This very simple model is quite instructive. For example, it shows the temperature sensitivity to changes in the solar constant, Earth albedo, or effective Earth emissivity. The effective emissivity also gauges the strength of the atmospheric greenhouse effect, since it is the ratio of the thermal emissions escaping to space versus those emanating from the surface.[8]

The calculated emissivity can be compared to available data. Terrestrial surface emissivities are all in the range of 0.96 to 0.99[9] [10] (except for some small desert areas which may be as low as 0.7). Clouds, however, which cover about half of the planet's surface, have an average emissivity of about 0.5[11] (which must be reduced by the fourth power of the ratio of cloud absolute temperature to average surface absolute temperature) and an average cloud temperature of about 258K.[12] Taking all this properly into account results in an effective earth emissivity of about 0.64 (earth average temperature 285K).

Models with separated surface and atmospheric layers

thumb|upright=1|right|One-layer EBM with blackbody surface

Dimensionless models have also been constructed with functionally separated atmospheric layers from the surface. The simplest of these is the zero-dimensional, one-layer model,[13] which may be readily extended to an arbitrary number of atmospheric layers. The surface and atmospheric layer(s) are each characterized by a corresponding temperature and emissivity value, but no thickness. Applying radiative equilibrium (i.e conservation of energy) at the interfaces between layers produces a set of coupled equations which are solvable.[14]

Layered models produce temperatures that better estimate those observed for Earth's surface and atmospheric levels.[15] They likewise further illustrate the radiative heat transfer processes which underlie the greenhouse effect. Quantification of this phenomenon using a version of the one-layer model was first published by Svante Arrhenius in year 1896.[16]

Radiative-convective models

Water vapor is a main determinant of the emissivity of Earth's atmosphere. It both influences the flows of radiation and is influenced by convective flows of heat in a manner that is consistent with its equilibrium concentration and temperature as a function of elevation (i.e. relative humidity distribution). This has been shown by refining the zero dimension model in the vertical to a one-dimensional radiative-convective model which considers two processes of energy transport:[17]

Radiative-convective models have advantages over simpler models and also lay a foundation for more complex models.[18] They can estimate both surface temperature and the temperature variation with elevation in a more realistic manner. They also simulate the observed decline in upper atmospheric temperature and rise in surface temperature when trace amounts of other non-condensible greenhouse gases such as carbon dioxide are included.

Other parameters are sometimes included to simulate localized effects in other dimensions and to address the factors that move energy about Earth. For example, the effect of ice-albedo feedback on global climate sensitivity has been investigated using a one-dimensional radiative-convective climate model.[19] [20]

Higher-dimension models

The zero-dimensional model may be expanded to consider the energy transported horizontally in the atmosphere. This kind of model may well be zonally averaged. This model has the advantage of allowing a rational dependence of local albedo and emissivity on temperature – the poles can be allowed to be icy and the equator warm – but the lack of true dynamics means that horizontal transports have to be specified.[21]

Early examples include research of Mikhail Budyko and William D. Sellers who worked on the Budyko-Sellers model).[22] [23] This work also showed the role of positive feedback in the climate system and has been considered foundational for the energy balance models since its publication in 1969.[24]

Earth systems models of intermediate complexity (EMICs)

See main article: Earth systems model of intermediate complexity. Depending on the nature of questions asked and the pertinent time scales, there are, on the one extreme, conceptual, more inductive models, and, on the other extreme, general circulation models operating at the highest spatial and temporal resolution currently feasible. Models of intermediate complexity bridge the gap. One example is the Climber-3 model. Its atmosphere is a 2.5-dimensional statistical-dynamical model with 7.5° × 22.5° resolution and time step of half a day; the ocean is MOM-3 (Modular Ocean Model) with a 3.75° × 3.75° grid and 24 vertical levels.[25]

Box models

Box models are simplified versions of complex systems, reducing them to boxes (or reservoirs) linked by fluxes. The boxes are assumed to be mixed homogeneously. Within a given box, the concentration of any chemical species is therefore uniform. However, the abundance of a species within a given box may vary as a function of time due to the input to (or loss from) the box or due to the production, consumption or decay of this species within the box.

Simple box models, i.e. box model with a small number of boxes whose properties (e.g. their volume) do not change with time, are often useful to derive analytical formulas describing the dynamics and steady-state abundance of a species. More complex box models are usually solved using numerical techniques.

Box models are used extensively to model environmental systems or ecosystems and in studies of ocean circulation and the carbon cycle.[26] They are instances of a multi-compartment model.

History

See also: History of climate change science.

Increase of forecasts confidence over time

The IPCC stated in 2010 it has increased confidence in forecasts coming from climate models:

"There is considerable confidence that climate models provide credible quantitative estimates of future climate change, particularly at continental scales and above. This confidence comes from the foundation of the models in accepted physical principles and from their ability to reproduce observed features of current climate and past climate changes. Confidence in model estimates is higher for some climate variables (e.g., temperature) than for others (e.g., precipitation). Over several decades of development, models have consistently provided a robust and unambiguous picture of significant climate warming in response to increasing greenhouse gases."[27]

Coordination of research

The World Climate Research Programme (WCRP), hosted by the World Meteorological Organization (WMO), coordinates research activities on climate modelling worldwide.

A 2012 U.S. National Research Council report discussed how the large and diverse U.S. climate modeling enterprise could evolve to become more unified.[28] Efficiencies could be gained by developing a common software infrastructure shared by all U.S. climate researchers, and holding an annual climate modeling forum, the report found.[29]

Issues

Electricity consumption

Cloud-resolving climate models are nowadays run on high intensity super-computers which have a high power consumption and thus cause CO2 emissions.[30]  They require exascale computing (billion billion – i.e., a quintillion – calculations per second). For example, the Frontier exascale supercomputer consumes 29 MW.[31] It can simulate a year’s worth of climate at cloud resolving scales in a day.[32]

Techniques that could lead to energy savings, include for example: "reducing floating point precision computation; developing machine learning algorithms to avoid unnecessary computations; and creating a new generation of scalable numerical algorithms that would enable higher throughput in terms of simulated years per wall clock day."

Parametrization

See also

External links

Climate models on the web:

Notes and References

  1. IPCC . 2014 . AR5 Synthesis Report - Climate Change 2014. Contribution of Working Groups I, II and III to the Fifth Assessment Report of the Intergovernmental Panel on Climate Change . 58 . Box 2.3. ‘Models’ are typically numerical simulations of real-world systems, calibrated and validated using observations from experiments or analogies, and then run using input data representing future climate. Models can also include largely descriptive narratives of possible futures, such as those used in scenario construction. Quantitative and descriptive models are often used together. .
  2. Book: Trenberth, Kevin E. . The Changing Flow of Energy Through the Climate System . 2022 . Cambridge University Press . 978-1-108-97903-0 . 1 . Chapter 1: Earth and Climate System . 10.1017/9781108979030.
  3. Held . Isaac M. . The gap between simulation and understanding in climate modelling . Bulletin of the American Meteorological Society . 86 . 11 . 1609-1614 . 2005 . 10.1175/BAMS-86-11-1609 .
  4. Polvani . L. M. . Clement . A. C. . Medeiros . B. . Benedict . J. J. . Simpson . I. R. . When less is more: opening the door to simpler climate models . 2017 . Eos . 98 . 10.1029/2017EO079417. free .
  5. Goode . P. R. . 2001 . Earthshine Observations of the Earth's Reflectance . Geophys. Res. Lett. . 28 . 9 . 1671–4 . 10.1029/2000GL012580 . 2001GeoRL..28.1671G. 34790317 . etal. https://web.archive.org/web/20180722192421/https://authors.library.caltech.edu/50838/1/grl14388.pdf . 2018-07-22 . live .
  6. Web site: Scientists Watch Dark Side of the Moon to Monitor Earth's Climate . American Geophysical Union . 17 April 2001 . 1 March 2010 . 27 February 2009 . https://web.archive.org/web/20090227182139/http://www.agu.org/sci_soc/prrl/prrl0113.html . dead .
  7. Web site: Climate Change: Global Temperature . NOAA . 6 July 2023.
  8. Web site: Clouds and the Earth's Radiant Energy System . NASA . https://web.archive.org/web/20130218204711/http://eospso.gsfc.nasa.gov/ftp_docs/lithographs/CERES_litho.pdf . 18 February 2013 . 2013 . dead.
  9. Web site: Seawater Samples - Emissivities. ucsb.edu.
  10. 10.1175/JCLI3720.1 . Jin M, Liang S . An Improved Land Surface Emissivity Parameter for Land Surface Models Using Global Remote Sensing Observations . J. Climate . 19 . 12 . 2867–81 . 15 June 2006 . https://web.archive.org/web/20070604185622/http://www.glue.umd.edu/~sliang/papers/Jin2006.emissivity.pdf . 2007-06-04 . live . 2006JCli...19.2867J .
  11. T.R. Shippert . S.A. Clough . P.D. Brown . W.L. Smith . R.O. Knuteson . S.A. Ackerman . Spectral Cloud Emissivities from LBLRTM/AERI QME . Proceedings of the Eighth Atmospheric Radiation Measurement (ARM) Science Team Meeting March 1998 Tucson, Arizona . https://web.archive.org/web/20060925194147/http://www.arm.gov/publications/proceedings/conf08/extended_abs/shippert_tr.pdf . 2006-09-25 . live .
  12. A.G. Gorelik . V. Sterljadkin . E. Kadygrov . A. Koldaev . Microwave and IR Radiometry for Estimation of Atmospheric Radiation Balance and Sea Ice Formation . Proceedings of the Eleventh Atmospheric Radiation Measurement (ARM) Science Team Meeting March 2001 Atlanta, Georgia . https://web.archive.org/web/20060925174423/http://www.arm.gov/publications/proceedings/conf11/extended_abs/gorelik_ag.pdf . 2006-09-25 . live .
  13. Web site: ACS Climate Science Toolkit - Atmospheric Warming - A Single-Layer Atmosphere Model . . 2 October 2022.
  14. Web site: ACS Climate Science Toolkit - Atmospheric Warming - A Multi-Layer Atmosphere Model . . 2 October 2022.
  15. Web site: METEO 469: From Meteorology to Mitigation - Understanding Global Warming - Lesson 5 - Modelling of the Climate System - One-Layer Energy Balance Model . Pennsylvania State University College of Mineral and Earth Sciences - Department of Meteorology and Atmospheric Sciences . 2 October 2022.
  16. Svante Arrhenius . 1896 . On the influence of carbonic acid in the air upon the temperature of the ground . Philosophical Magazine and Journal of Science . 41 . 251 . 237–276 . en. 10.1080/14786449608620846 .
  17. Manabe . Syukuro . Syukuro Manabe . Wetherald . Richard T. . Thermal Equilibrium of the Atmosphere with a Given Distribution of Relative Humidity . Journal of the Atmospheric Sciences . 24 . 3 . 241–259 . 1 May 1967 . 1967JAtS...24..241M . 10.1175/1520-0469(1967)024<0241:TEOTAW>2.0.CO;2 . free.
  18. Web site: Syukuro Manabe Facts . nobelprize.org . 14 November 2023.
  19. Web site: Pubs.GISS: Wang and Stone 1980: Effect of ice-albedo feedback on global sensitivity in a one-dimensional.... https://archive.today/20120730021359/http://pubs.giss.nasa.gov/cgi-bin/abstract.cgi?id=wa03100m. dead. 2012-07-30. nasa.gov.
  20. Wang . W.C. . P.H. Stone . Effect of ice-albedo feedback on global sensitivity in a one-dimensional radiative-convective climate model . J. Atmos. Sci. . 37 . 3 . 545–52 . 1980 . 10.1175/1520-0469(1980)037<0545:EOIAFO>2.0.CO;2 . 1980JAtS...37..545W . free .
  21. Web site: Energy Balance Models. shodor.org.
  22. The effect of solar radiation variations on the climate of the Earth. M.I. Budyko. Tellus. 1969. 21. 5. 611-619. 10.3402/tellusa.v21i5.10109 . free.
  23. A Global Climatic Model Based on the Energy Balance of the Earth-Atmosphere System. 1969. 10.1175/1520-0450(1969)008<0392:AGCMBO>2.0.CO;2. William D. Sellers. Journal of Applied Meteorology. 8. 3. 392–400. 1969JApMe...8..392S. free.
  24. Twenty-five years of physical climatology. 1990. J. Graham Cogley. 10.1016/0921-8181(90)90001-S. Global and Planetary Change. 2. 3-4. 213-216.
  25. Web site: emics1. pik-potsdam.de.
  26. Sarmiento, J.L. . Toggweiler, J.R. . 1984 . A new model for the role of the oceans in determining atmospheric P CO 2 . Nature . 308 . 5960 . 621–24 . 1984Natur.308..621S . 10.1038/308621a0 . 4312683.
  27. Web site: Climate Models and Their Evaluation . dead . https://web.archive.org/web/20100922124304/http://www.ipcc.ch/pdf/assessment-report/ar4/wg1/ar4-wg1-chapter8.pdf . 22 September 2010 . 29 August 2010 . dmy-all.
  28. Web site: U.S. National Research Council Report, A National Strategy for Advancing Climate Modeling . 18 January 2021 . 3 October 2012 . https://web.archive.org/web/20121003043232/http://dels.nas.edu/Report/National-Strategy-Advancing-Climate/13430 . dead .
  29. Web site: U.S. National Research Council Report-in-Brief, A National Strategy for Advancing Climate Modeling . 3 October 2012 . 18 October 2012 . https://web.archive.org/web/20121018071324/http://dels.nas.edu/Materials/Report-In-Brief/4291-Climate-Modeling . dead .
  30. Loft . Richard . 2020 . Earth System Modeling Must Become More Energy Efficient . Eos . 101 . 10.1029/2020EO147051 . 2324-9250. free .
  31. Web site: Trader . Tiffany . 2021 . Frontier to Meet 20MW Exascale Power Target Set by DARPA in 2008 . 2023-12-08 . HPCwire . en-US.
  32. Web site: Cloud-resolving climate model meets world’s fastest supercomputer . 2023-12-08 . LabNews . en-US.