000006242 001__ 6242
000006242 005__ 20230127135634.0
000006242 037__ $$aSEMIN-2023-0005
000006242 100__ $$aBeuthe, Mikael
000006242 245__ $$aIsostasy at the planetary scale
000006242 260__ $$c2022
000006242 269__ $$c2022-11-04
000006242 520__ $$aIsostasy is one of the earliest quantitative geophysical theories still in current use. It explains why observed gravity anomalies are generally much weaker than what is inferred from visible topography, and why planetary crusts can support large mountains without breaking up. At large scale, most topography (including bathymetry) is in isostatic equilibrium, meaning that surface loads are buoyantly supported by crustal thickness variations or density variations within the crust and lithosphere, in such a way that deeper layers are hydrostatic. On Earth, examples of isostasy are the average depth of the oceans, the elevation of the Himalayas, and the subsidence of ocean floor away from mid-ocean ridges, which are respectively attributed to the crust-ocean thickness difference, to crustal thickening under mountain belts, and to the density increase due to plate cooling. Outside Earth, isostasy is useful to constrain the crustal thickness of terrestrial planets and the shell thickness of icy moons with subsurface oceans. Given the apparent simplicity of the isostatic concept – buoyant support of mountains by iceberg-like roots – it is surprising that a debate has been going on for over a century about its various implementations. Classical isostasy is indeed not self-consistent, neglects internal stresses and geoid contributions to topographical support, and yields ambiguous predictions of geoid anomalies at the planetary scale. In the last few years, these problems have attracted renewed attention when applying isostasy to planetary bodies with an unbroken crustal shell. In this talk I will discuss isostatic models based on the minimization of stress, on time-dependent viscous evolution, and on stationary viscous flow. I will show that these new isostatic approaches are mostly equivalent and discuss their implications for the structure of icy moons.
000006242 536__ $$aPRODEX program managed by ESA and BELSPO/$$cPRODEX program managed by ESA and BELSPO/$$fPRODEX program managed by ESA and BELSPO
000006242 594__ $$aNO
000006242 773__ $$tUniversity of Oxford Mathematical Institute
000006242 8560_ $$fmikael.beuthe@observatoire.be
000006242 85642 $$ahttps://www.maths.ox.ac.uk/node/61152
000006242 980__ $$aSEMIN