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Hello Everyone,
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I have problem to define a Discontinuous Interface Condition. The basic structure is that there are two 3D cube 1 and 2 sharing a common interface and the 2D side view is like this:
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<span style="white-space:normal;">| 1 | 2 |</span>
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For a static electric problem(laplace equation), given some boundary condition, and a interface resistance--which means that the potential does not continuous in the interface, I want to solve the potential phi.
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The phsics at the interface should be \Delta phi \cdot \hat{n} = phi_1-phi_2, where \hat{n} is the normal vector of the interface and phi_1 and phi_2 are the value of potential phi at the interface(actually extremely closing to the interface) from cube 1 and cube 2, respectively.
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The problem is that I donot know how to the describe this boundary as a formulation, and I have searched the archive of this mail-list but didnot get good information.
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Can you give some suggestion on this kind of interface boundary condition?
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Massive thanks in advance!!
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Yuanzhi Zhu.
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