Assembly of the Mass Matrix using $P_1$ -Lagrange finite elements. More...

Functions
function M =	MassAssemblingP1OptV1 (nq, nme, me, areas)
	Assembly of the Mass Matrix using -Lagrange finite elements.

Detailed Description

Assembly of the Mass Matrix using $P_1$ -Lagrange finite elements.

Function Documentation

function M = MassAssemblingP1OptV1	(	nq,
		nme,
		me,
		areas
	)

Assembly of the Mass Matrix using $P_1$ -Lagrange finite elements.

The Mass Matrix $\Masse$ is given by

$\Masse_{i,j}=\int_\DOMH \FoncBase_i(\q) \FoncBase_j(\q) d\q,\ \forall (i,j)\in{\ENS{1}{\nq}}^2$

where $\FoncBase_i$ are $P_1$ -Lagrange basis functions

Example

    Th=SquareMesh(10);
    M=MassAssemblingP1OptV1(Th.nq,Th.nme,Th.me,Th.areas);

Parameters

nq	total number of nodes of the mesh, also denoted by $\nq$ ,
nme	total number of triangles, also denoted by $\nme$ ,
me	Connectivity array, $3\times\nme$ array. $\me(\jl,k)$ is the storage index of the $\jl$ -th vertex of the -th triangle in the array $\q$ of vertices coordinates, $\jl\in\{1,2,3\}$ and $k\in{\ENS{1}{\nme}}$ .
areas	Array of areas, $1\times\nme$ array. areas(k) is the area of the -th triangle.

Return values

M	Global mass matrix, $\nq\times\nq$ sparse matrix.

Definition at line 17 of file MassAssemblingP1OptV1.m.