THE CONVERGENCE OF A MULTIDIMENSIONAL, LOCALLY CONSERVATIVE EULERIAN–LAGRANGIAN FINITE ELEMENT METHOD FOR A SEMILINEAR PARABOLIC EQUATION
2010 ◽
Vol 20
(02)
◽
pp. 315-348
◽
Keyword(s):
We study a locally conservative Eulerian–Lagrangian finite element method for approximating the solution of a semilinear parabolic equation and prove that a post-processed version of the method converges at an optimal rate as the space and time increments tend to zero.
2009 ◽
Vol 47
(1)
◽
pp. 204-226
◽
Keyword(s):
2016 ◽
Vol 311
◽
pp. 374-392
◽
Keyword(s):
Superconvergence of anH1-Galerkin nonconforming mixed finite element method for a parabolic equation
2013 ◽
Vol 66
(11)
◽
pp. 2362-2375
◽
2009 ◽
Vol 31
(4)
◽
pp. 2528-2548
◽
2014 ◽
Vol 267
◽
pp. 33-48
◽
2011 ◽
Vol 68
(6)
◽
pp. 782-804
◽
Keyword(s):
2014 ◽
Vol 52
(5)
◽
pp. 2272-2294
◽
Keyword(s):