Jorge Gonzalez
c82279f5c5
Now, the solver needs to be an input parameter of the case, to select if it is for charged or neutral particles. Resolution of Poisson equation with Dirichlet boundary conditions is possible. The source vector is the charge density. This resolution is done in two steps to save computational time: 1. When reading the mesh, the PLU factorization of the K matrix is computed. 2. In each iteration, the system K*u = f is solved, in which f is the source vector (charge density) and u is the solution (potential) in each node. No case has been added to the repository. This will be done in next commit. The 'non-analog' scheme has been commented. It still needs to split the particle to avoid 'overweight' particles.
6 lines
73 B
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6 lines
73 B
Text
PPartiC
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mod/
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obj/
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doc/user_manual/
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doc/coding_style/
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json-fortran-8.2.0/
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