STATIONARY SOLUTIONS TO A QUASI-NEWTONIAN FLOW WITH VISCOUS HEATING
1995 ◽
Vol 05
(06)
◽
pp. 725-738
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Keyword(s):
System of equations describing the stationary flow of a quasi-Newtonian fluid, with temperature-dependent viscosity and with a viscous heating, is considered. Existence of at least one appropriate weak solution is proved, i.e. we get existence of at least one velocity field having finite energy and existence of a non-negative temperature field. Its regularity is a consequence of the L1-forcing term generated by the viscous heating.
2007 ◽
Vol 571
◽
pp. 359-370
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2001 ◽
Vol 39
(10)
◽
pp. 1143-1165
◽
1986 ◽
Vol 29
(8)
◽
pp. 1177-1183
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2005 ◽
Vol 540
(-1)
◽
pp. 21
◽
1998 ◽
Vol 32
(4)
◽
pp. 391-404
◽
2003 ◽
Vol 10
(6)
◽
pp. 545-555
◽
2009 ◽
Vol 36
(3)
◽
pp. 272-288
◽
2007 ◽
Vol 10
(2)
◽
pp. 209-218
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