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nonstandard boundary conditions
Posted Apr 17, 2012, 12:45 p.m. EDT 1 Reply
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I have a 2D vector field (2D in X and y) that I need to apply nonstandard boundary conditions. Does anyone know how to apply a boundary condition for the jump in the tangential component of a vector field across two regions?
For example
an x [F1-F2]=az C
where an in the normal unit vector, F1 and F2 are the vector fields in region 1 and region 2, az is the unit vector in along the z-axis, and C is a constant.
I can cast the problem as a scalar field is which the BC would be:
f1_l - f2_l = C
where f1_l and f2_l is the derivative of the scalar field (f1 and f2) along the boundary.
The vector problem is defined in the attached file.
Thanks for any input.
For example
an x [F1-F2]=az C
where an in the normal unit vector, F1 and F2 are the vector fields in region 1 and region 2, az is the unit vector in along the z-axis, and C is a constant.
I can cast the problem as a scalar field is which the BC would be:
f1_l - f2_l = C
where f1_l and f2_l is the derivative of the scalar field (f1 and f2) along the boundary.
The vector problem is defined in the attached file.
Thanks for any input.
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1 Reply Last Post Apr 18, 2012, 9:00 a.m. EDT