Abstract
The mantle convection model with phase transitions, non-Newtonian viscosity, and internal heat sources is calculated for two-dimensional (2D) Cartesian geometry. The temperature dependence of viscosity is described by the Arrhenius law with a viscosity step of 50 at the boundary between the upper and lower mantle. The viscosity in the model ranges within 4.5 orders of magnitude. The use of the non-Newtonian rheology enabled us to model the processes of softening in the zone of bending and subduction of the oceanic plates. The yield stress in the model is assumed to be 50 MPa. Based on the obtained model, the structure of the mantle flows and the spatial fields of the stresses σ xz and σ xx in the Earth’s mantle are studied. The model demonstrates a stepwise migration of the subduction zones and reveals the sharp changes in the stress fields depending on the stage of the slab detachment. In contrast to the previous model (Bobrov and Baranov, 2014), the self-consistent appearance of the rigid moving lithospheric plates on the surface is observed. Here, the intense flows in the upper mantle cause the drift and bending of the top segments of the slabs and the displacement of the plumes. It is established that when the upwelling plume intersects the boundary between the lower and upper mantle, it assumes a characteristic two-level structure: in the upper mantle, the ascending jet of the mantle material gets thinner, whereas its velocity increases. This effect is caused by the jump in the viscosity at the boundary and is enhanced by the effect of the endothermic phase boundary which impedes the penetration of the plume material from the lower mantle to the upper mantle. The values and distribution of the shear stresses σ xz and superlithostatic horizontal stresses σ xx are calculated. In the model area of the subducting slabs the stresses are 60–80 MPa, which is by about an order of magnitude higher than in the other mantle regions. The character of the stress fields in the transition region of the phase boundaries and viscosity step by the plumes and slabs is analyzed. It is established that the viscosity step and endothermic phase boundary at a depth of 660 km induce heterogeneities in the stress fields at the upper/lower mantle boundary. With the assumed model parameters, the exothermic phase transition at 410 km barely affects the stress fields. The slab regions manifest themselves in the stress fields much stronger than the plume regions. This numerically demonstrates that it is the slabs, not the plumes that are the main drivers of the convection. The plumes partly drive the convection and are partly passively involved into the convection stirred by the sinking slabs.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Akaogi, M., Ito, E. and Navrotsky, A., Olivine-modified spinel-spinel transitions in the system Mg2SiO4–Fe2SiO4: calorimetric measurements, thermochemical calculations, and geophysical applications, J. Geophys. Res., 1989, vol. 94, pp. 15671–15685. doi 10.1029/JB094iB11p15671
Baranov, A.A. and Bobrov, A.M., The structure of 2D mantle convection and stress fields: effects of viscosity distribution, Izv., Phys. Solid Earth, 2011, vol. 47, no. 7, pp. 575–585.
Bina, C. and Helffrich, G., Phase transition Clapeyron slopes and transition zone seismic discontinuity topography, J. Geophys. Res., 1994, vol. 99, no. B8, pp. 15853–15860. doi 10.1029/94JB00462
Bobrov, A.M., Numerical modeling of the distribution of horizontal stresses in a moving continental plate, Izv., Phys. Solid Earth, 2010, vol. 46, no. 6, pp. 477–485.
Bobrov, A.M. and Baranov, A.A., Horizontal stresses in the mantle and in the moving continent for the model of twodimensional convection with varying viscosity, Izv. Phys. Solid Earth, 2011, vol. 47, no. 9, pp. 801–815.
Bobrov, A.M. and Baranov, A.A., The structure of mantle flows and stress fields in a two-dimensional convection model with non-Newtonian viscosity, Rus. Geol. Geophys., 2014, vol. 55, no. 7, pp. 801–811.
Brooks, A.N. and Hughes, T.J.R., Streamline Upwind/Petrov–Galerkin formulations for convection dominated flows with particular emphasis on the incompressible Navier–Stokes equations, Comput. Methods Appl. Mech. Eng., 1982, vol. 32, pp. 199–259.
Butler, S.L. and Jarvis, G.T., Stresses induced in continental lithospheres by axisymmetric spherical convection, Geophys. J. Int., 2004, vol. 157, pp. 1359–1376. doi 10.1111/j.1365-246X.2004.02257.x
Capitanio, F.A., Morra, G., and Goes, S., Dynamics of plate bending at the trench and slab-plate coupling, Geochem. Geophys. Geosyst., 2009, vol. 10, Q04002. doi 10.1029/2008GC002348
Christensen, U. and Yuen, D.A., Layered convection induced by phase transition, J. Geophys. Res., 1985, vol. 90, pp. 10291–10300.
Christensen, U., Effects of phase transitions on mantle convection, Annu. Rev. Earth Planet. Sci., 1995, vol. 23, pp. 65–87. doi 10.1146/annurev.ea.23.050195.000433
Christensen, U., The influence of trench migration on slab penetration into the lower mantle, Earth Planet. Sci. Lett., 1996, vol. 140, pp. 27–39.
Cizkova, H., van Hunen, J., van den Berg, A.P., and Vlaar, N.J., The influence of rheological weakening and yield stress on the interaction of slabs with the 670 km discontinuity, Earth Planet. Sci. Lett., 2002, vol. 199, nos. 3–4, pp. 447–457. doi 10.1016/S0012-821X(02)00586-1
Cíková, H., van Hunen, J., and van den Berg, A., Stress distribution within subducting slabs and their deformation in the transition zone, Phys. Earth Planet. Inter., 2007, vol. 161, nos. 3–4, pp. 202–214. doi 10.1016/j.pepi.2007.02.002
Dobretsov, N.L., Global geodynamic evolution of the Earth and global geodynamic models, Rus. Geol. Geophys., 2010, no. 6, pp. 592–610.
Fei, Y., Orman, J.V., Li, J., van Westrenen, W., Sanloup, C., Minarik, W., Hirose, K., Komabayashi, T., Walter, M., and Funakoshi, K., Experimentally determined postspinel transformation boundary in Mg2SiO4 using MgO as an internal pressure standard and its geophysical implications, J. Geophys. Res., 2004, vol. 109, B02305. doi 10.1029/2003JB002562
Helffrich, G. and Wood, B.J., The Earth’s mantle, Nature, 2001, vol. 412, pp. 501–507. doi 10.1038/35087500
Hughes, T.J.R., The Finite Element Method: Linear Static and Dynamic Finite Element Analysis, New Jersey: PrenticeHall, 1987.
Karato, S. and Wu, P., Rheology of the upper mantle: a synthesis, Science, 1993, vol. 260, pp. 771–778.
Katsura, T., and Ito, E., The system Mg2SiO4–Fe2SiO4 at high pressures and temperatures: precise determination of stabilities of olivine, modified spinel, and spinel, J. Geophys. Res., 1989, vol. 94, pp. 15663–15670. doi 10.1029/JB094iB11p15663
Lowman, J.P., King, S.D., and Gable, C.W., Steady plumes in viscously stratified, vigorously convecting, three-dimensional numerical mantle convection models with mobile plates, Geochem. Geophys. Geosyst., 2004, vol. 5, Q01L01. doi 10.1029/2003GC000583
Mei, S., Bai, W., Hiraga, T., and Kohlstedt, D.L., Influence of melt on the creep behavior of olivine-basalt aggregates under hydrous conditions, Earth Planet. Sci. Lett., 2002, vol. 201, pp. 491–507.
Moresi, L.N. and Gurnis, M., Constraints on the lateral strength of slabs from three dimensional dynamic flow models, Earth Planet. Sci. Lett., 1996, vol. 138, pp. 15–28.
Moresi, L.N. and Solomatov, V., Mantle convection with a brittle lithosphere: thoughts on the global tectonic styles of the Earth and Venus, Geophys. J. Int., 1998, vol. 133, pp. 669–682.
Nakakuki, T., Hamada, C., and Tagawa, M., Generation and driving forces of plate-like motion and asymmetric subduction in dynamical models of an integrated mantle-lithosphere system, Phys. Earth Planet. Inter., 2008, vol. 166, pp. 128–146.
Nakakuki, T. and Mura, E., Dynamics of slab rollback and induced back-arc basin formation, Earth Planet. Sci. Lett., 2013, vol. 361, pp. 287–297.
Polyansky, O.P., Korobeynikov, S.N., Babichev, A.V., and Reverdatto, V.V., Formation and upwelling of mantle diapirs through the cratonic lithosphere: numerical thermomechanical modeling, Petrology, 2012, vol. 20, no. 2, pp. 120–137.
Ranalli, G., Rheology of the Earth, London: Chapman and Hall, 1995.
Schubert, G., Turcotte, D.L., and Olson, P., Mantle Convection in the Earth and Planets, Cambridge: Cambridge Univ. Press, 2001.
Simon, K., Huismans, R.S., and Beaumont, C., Dynamical modeling of lithospheric extension and small-scale convection:implications for magmatism during the formation of volcanic rifted margins, Geophys. J. Int., 2009, vol. 176, pp. 327–350.
Steinberger, B., Slabs in the lower mantle—results of dynamic modelling compared with tomographic images and the geoid, Phys. Earth Planet. Inter., 2000, vol. 118, pp. 241–257.
Steinberger, B., Schmeling, H., and Marquart, G., Largescale lithospheric stress field and topography induced by global mantle circulation, Earth Planet. Sci. Lett., 2001, vol. 186, pp. 75–91.
Tackley, P.J., Self-consistent generation of tectonic plates in time-dependent, three-dimensional mantle convection simulations: 1. Pseudoplastic yielding, Geochem. Geophys. Geosyst., 2000, vol. 1, p. 1021. doi 10.1029/2000GC000036
Tosi, N. and Yuen, D.A., Bent-shaped plumes and horizontal channel flow beneath the 660 km discontinuity, Earth Planet. Sci. Lett., 2011, vol. 312, pp. 348–359.
Trubitsyn, V.P., Baranov, A.A., and Kharybin, E.V., Numerical models of subduction of the oceanic crust with basaltic plateaus, Izv., Phys. Solid Earth, 2007, vol. 43, no. 7, pp. 533–542.
Trubitsyn, V.P., Evseev, A.N., Baranov, A.A., and Trubitsyn, A.P., Phase transition zone width implications for convection structure, Izv., Phys. Solid Earth, 2008, vol. 44, no. 8, pp. 603–614.
Trubitsyn, V.P., Rheology of the mantle and tectonics of the oceanic lithospheric plates, Izv., Phys. Solid Earth, 2012, vol. 48, no. 6, pp. 467–485.
Trubitsyn, V.P. and Trubitsyn, A.P., Numerical model for the generation of the ensemble of lithospheric plates and their penetration through the 660-km boundary, Izv. Phys. Solid Earth, 2014, vol. 50, no. 6, pp. 853–864.
Turcotte, D.L. and Schubert, G., Geodynamics, Cambridge: Cambridge Univ. Press, 2002.
Yoshida, M., Preliminary three-dimensional model of mantle convection with deformable, mobile continental lithosphere, Earth Planet. Sci. Lett., 2010, vol. 295, nos. 1–2, pp. 205–218. doi 10.1016/j.epsl.2010.04.001
Yoshida, M., Dynamic role of the rheological contrast between cratonic and oceanic lithospheres in the longevity of cratonic lithosphere: a three-dimensional numerical study, Tectonophysics, 2012, vols. 532–535, pp. 156–166.
Zhong, S., Zuber, M.T., Moresi, L.N., and Gurnis, M., The role of temperature-dependent viscosity and surface plates in spherical shell models of mantle convection, J. Geophys. Res., 2000, vol. 105, pp. 11063–11082.
Author information
Authors and Affiliations
Corresponding author
Additional information
Original Russian Text © A.M. Bobrov, A.A. Baranov, 2016, published in Fizika Zemli, 2016, No. 1, pp. 133–148.
Rights and permissions
About this article
Cite this article
Bobrova, A.M., Baranov, A.A. The mantle convection model with non-Newtonian rheology and phase transitions: The flow structure and stress fields. Izv., Phys. Solid Earth 52, 129–143 (2016). https://doi.org/10.1134/S1069351316010031
Received:
Published:
Issue Date:
DOI: https://doi.org/10.1134/S1069351316010031