Fig. 2. A schemaric sec- rion of a glacier to illu- strate symbols. Mynd 2. Þversnið af jökli og vatnslóni. glacier parallel to the bed. The potential (pt) is given by (J) Cpb = PwSzb + Pb The symbol zb represents the elevation of the glacier bed relative to a horizontal datum level which is placed at the level of the glacier snout, pw represents the. density of water, g is the acceleration of gravity, and pb denotes the water pressure at the bed-rock. Ones aim is to find a representative mean distribution for cpb along the glacier bed. The pressure pb is taken equal to the overburden pressure which the ice and water exert on the glacier bed. For a certain length scale 1 along the bed the ice overburden pressure can be taken to be hydrostatic (or glaciostatic, cf. litho- static) as a result of the glacier creep. On this scale one can estimate (2) Pb = Pi g Hj + pw g Hw in which Hj and Hw are the thicknesses of the ice and water masses, respectively. The symbols Pj and pw represent the densities of ice and water, respectively. This estimate for pb re- presents mean values for areas of the order of l2 in which 1 is of the order of, say 10—100 m. The potential cpb can now be written (^) cpb = pw g (zb + Hw) + Pi g Hj By eliminating Hj = zs - zw and Hw = zw - zb one obtains (4) cpb = (pw - Pi) g zw + Pi g zs and the negative pressure gradient (5) Vcpb = (pw - Pi) g Vzw + p, g Vzs in which zw represents the elevation of the top surface of the subglacial water layer, and zs is the elevation of the glacier surface. Numerical values for the densities are pw = 1000 kg m-3 for water and pj = 910 kg m~3 for ice. Equation (5) contains important results. First, the glacier surface slope is about ten times more effective than the surface slope of the sub- glacial water layer in directing the water flow at the bed-rock of the glacier. In the case of a sheet flow of water Hw«H^. Then, one can put Hw sO in Equation (2), and zwíszb. The slope of the water sheet is then equal to the slope of the glacier bed. Second, Equation (5) defines the conditions for the formation of a water re- servoir at the bed of a glacier, a neccessary condi- tion for which is that V cpb = ° in the area. Hence, the equation defines the relationship between the slopes of the water/glacier boundary and the glacier sur- face. The surface of the water reservoir tends to slope some ten times steeper than the glacier surface. The slopes of these two surfaces are opposite in direction. Figs. 3 a and b show two 4 JÖKULL 25. ÁR

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