We examine the construction of a symmetric positive definite conductance matrix for eddy-current problems, using a discrete approach. We construct a new set of piecewise uniform basis vector functions on both the primal and the dual complex. We define these vector functions for both tetrahedra and prisms.
Symmetric Positive-Definite Costitutive Matrices for Discrete Eddy-Current Problems
SPECOGNA, Ruben;TREVISAN, Francesco
2007-01-01
Abstract
We examine the construction of a symmetric positive definite conductance matrix for eddy-current problems, using a discrete approach. We construct a new set of piecewise uniform basis vector functions on both the primal and the dual complex. We define these vector functions for both tetrahedra and prisms.File in questo prodotto:
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