Mantle Geophysics and Tectonophysics

1. Mantle Geophysics and Tectonophysics Topics: • Heat transport within the Earth • Mantle convection • Elastic (seismic) properties • The CMB • The upper mantle – lithosphere • Crust and surface expression of mantle circulation

2. A simple Earth model

3. Heat conduction through the lithosphere • The Earth is cooling... losing internal energy. • Heat is being released from the Earth's interior at a rate of about 44TW. Averaged over the surface of the Earth, this amounts to a heat flow of about 70mW/m2 through the crust . • Heat energy diffuses through the crust and lithosphere by conduction according to Fourier's Law of Thermal Conduction. • With magmas at volcanoes and spreading ridges, heat is being advected to the surface. Actually, this accounts for only a fraction of the heat that is brought to the surface and radiated through the atmosphere into space.

4. Global distribution of heat flow

5. Temperature through the lithosphere and crust For a lithosphere with 100km depth (i.e., an average gradient of 12K/km), the average lithospheric thermal conductivity:k ~ 4 W m-2 K-1 . Measured conductivities of surface rocks: k ~ 2-3 W m-2 K-1 .

6. Thermal diffusion (conductive)

7. Thermally driven mantle convection • The contribution of diffusive cooling of the mantle is insignificant in comparison to convective heat transport through the mantle. • The mantle behaves like a viscous fluid on long timescales; being a fluid, it can flow and can be driven into convection by a temperature gradient. • Heat flows out of the depths of the cooling Earth transported through the mantle between the D'' layer and the base of the lithosphere by convective fluid motions rather than conduction. This is the more effective means of moving heat through a fluid. How does convection work?

8. Adiabatic compression Consider a cube of mantle material under pressure

9. Adiabatic temperature gradient

10. Mantle temperature?

11. If the actual temperature gradient exceeds the adiabatic gradient? • If the actual temperature gradient (i.e. the increase of temperature with depth) exceeds the local adiabatic temperature gradient, then any infinitesmal displacement of a volume of mantle material will be enhanced through bouyancy if displaced upwards or negative bouyancy if displaced downwards. • We have “convection”! • The process of convection removes heat from depth in the mantle to the base of the lithosphere where it is conducted out to the surface. The interior cools; the actual temperature gradient reduces. • The process of convection pulls the entire mantle temperature toward the adiabatic gradient. If the temperature gradient falls to the adiabatic or below, convection ceases!

12. Temperature gradient in the mantle • Vigourous convection in the mantle pulls the actual temperature gradient toward the adiabatic gradient. • If the temperature at the base of the lithosphere is 1500K as corresponds to Hawaiian lava eruptions, then the adiabatic gradient to top of the D'' layer would account for a base temperature in excess of about 2100K depending on the distributed thermal expansivity, αp, and heat capacity, Cp, throughout the mantle. • Heat “conducts” into the fluid mantle through the D'' boundary layer.

13. Vigour and Rayleigh Number Convection can be driven by internal or bottom heating. Surely, both contribute. The Rayleigh number measures the ratio of the forcing-to-retardation of the convection. For internal heating: For bottom heating: Here, η is the local viscosity, Tsx, the local adiabatic excess. d is mantle thickness, base of lithosphere to D''.

14. The 660km spinel-perovskite transition adiabat The negative Clapyron slope shows an endothermic effect as the mantle rises through the 660km transition. The absorbed heat contributes a slight cooling and relative density increase that retards convection. The effect reverses for a descending lithospheric plate or slab.

15. Layered mantle convection? • There is/was a long-standing debate concerning the possibly layered convection in the mantle. • There is general agreement that the 660km phase change does retard sinking subducting plates and bouyant rising melts during convection. • There is also general agreement that plates can and do penetrate through 660 and that rising plumes and convective sheets rise through 660. • Seismic tomography shows that we have a pooling of material around 660 as would be expected of layered convection while there remains sufficient penetration to involve the whole mantle in the convective process. from seismology.harvard.edu

16. D'' – postperovskite transition • Recently, it has been determined that the perovskite mineral phase of [Mg, Fe]SiO3 compresses into a denser postperovskite phase (same stoichiometry?) at about 120GPa pressure and 2500K temperature. • This condition is interpreted to be the cause of the seismic, velocity-slowing anomaly of the D'' layer. • This is not entirely out-of-line with our adiabatic temperature estimate; we don't have tight measures of thermal expansivity, αp, and heat capacity, Cp, throughout the mantle. The missing ingredient: Kie Hirose

17. Boundary layers – lithosphere and CMB-D'' • Heat conducts into the mantle from the core through the D'' boundary layer. • Heat is carried through the mantle to the base of of the lithosphere via convection. • Heat is conducted through the lithosphere to the crust and surface. • Convection moves heat with a smaller temperature gradient than does conduction. The temperature gradients across the D'' layer and lithosphere are much greater than through the 2900km of the mantle!

18. Heat conduction through D'' • The D'' layer is between 100 and 200 km thick. • It's area is about ¼ that of the Earth's surface area. • The heat flow from the core into the mantle is variously estimated* to be ~9 TW. The heat flux, then, is about 40 mW m-2. • If the thermal conductivity is similar to that of the lithosphere, ~4 W m-2 K-1, the temperature gradient through the D'' layer takes us to a temperature of 3500-4000 K. *See Don Anderson: Energetics of the Earthhttp://www.mantleplumes.org/Energetics.html

19. The outer and inner core Temperature and pressure within Earth The outer core is convecting vigourously; its temperature gradient must be very close to adiabatic. Still, we don't have good constraints on the thermal properties of the liquid outer core. Temperature at the inner-core/outer-core boundary? Probably about 4500 K. Assuming an essentially iron-nickel inner core and adiabatic equilibrium, the inner core's central temperature is estimated to be about 5500 K. Mao and Hemley, 2007

20. Part II

21. Seismotectonics • Kanimori (1977) estimated that earthquakes release (use) about 5 x 1017 J per year. The theoretical limit of the annual energy available from the convective heat engine is about 5.4 x 1020 J per year. The work “done” by earthquakes accounts for only about 0.1% of the annual energy available to the convection engine. • What else? • Moving masses laterally across the geoid requires no work apart from the resistance or friction of the motions. Lifting masses above the geoid requires work. On long time scales, we believe that the topography of the Earth is approximately stable: uplift and erosion are in balance. The energy required to uplift the topography must somehow be provided by the convection engine.

22. Seismotectonics • The heat engine that is expressed in mantle convection works on the body and surface of the Earth. • It is not an especially thermodynamically “efficient”: its theoretically limiting efficiency is determined by the temperature differences at the bottom and top of the circulating mantle. • We might expect, then, that the convection engine could accomplish “work” at the rate of about 17TW. This is a tremendous power to move and uplift continents, spread ocean basins, lift mountain-building magmas above the surface and fracture surface rocks in earthquakes.

23. Core convection and the geodynamo • The compensation of the continuing dissipation of the geomagnetic field requires a continuous power input of ~1-4TW to maintain the field. • The convective engine of the core provides this power input. • The temperature gradient under which this engine operates is (we have) estimated to range from about 5100K to 4300K. • The theoretically limiting efficiency of this engine – it is this engine that drives the geodynamo – is then: • ~77% of the power available in the convective engine is exhausted into the mantle. This corresponds to a heat flow out of the core into the mantle of at least 3.5TW and possibly more than 14TW if all the available power of the convection drive feeds the geodynamo. There are myriad other losses. Caveat If we believe our temperature profile, we might accept Andersons's 9mW/m2 heat flow from the core into the mantle ... But! Note that our argument is really a circular one. We have obtained our termperature on the basis of Anderson's heat flow estimate.