Ng, F. S. L. (1998) Mathematical modelling of subglacial drainage and erosion. PhD thesis, University of Oxford.

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Abstract
The classical theory of channelized subglacial drainage,due orginally to Röthlisberger (1972) and Nye (1976), considers water flow in an ice channel overlying a rigid, impermeable bed. At steady flow, creep closure of the channel walls is counteracted by meltback due to heat dissipation, and this leads to an equilibrium relation between channel water pressure and discharge. More generally, such a balance exhibits an instability that can be used to describe the mechanics of catastrophic flood events known as `jökulhlaups'. In this thesis, we substantiate these developments by exploring a detailed model where the channel is underlain by subglacial till and the flow supports a sediment load. Attention is given to the physics of bed processes and its effect on channel morphology. In particular, we propose a theory in which the channel need not be semicircular, but has independently evolving depth and width determined by a local balance between melting and closure, and in which sediment erosion and deposition is taken into account. The corresponding equilibrium relation indicates a reverse dependence to that in the classical model, justifying the possibility of the subglacial canals envisaged by Walder and Fowler (1994). Theoretical predictions for sediment discharge are also derived. Regarding timedependent flood drainage, we demonstrate how rapid channel widening caused by bank erosion can explain the abrupt recession observed in the flood hydrographs. This allows us to produce an improved simulation of the 1972 jökulhlaup from Grímsvötn, Iceland, and selfconsistently, a plausible estimate for the total sediment yield. We also propose a mechanism for the observed flood initiation lakelevel at Grímsvötn. These investigations expose the intimate interactions between drainage and sediment transport, which have profound implications on the hydrology, sedimentology and dynamics of ice masses, but which have received little attention.
Item Type:  Thesis (PhD) 

Subjects:  D  G > Geophysics O  Z > Partial differential equations A  C > Approximations and expansions D  G > Fluid mechanics 
Research Groups:  Mathematical Geoscience Group Oxford Centre for Industrial and Applied Mathematics 
ID Code:  31 
Deposited By:  Eprints Administrator 
Deposited On:  10 Mar 2004 
Last Modified:  29 May 2015 18:15 
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