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Christopher Crawford PHY

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1 Christopher Crawford PHY 416 2014-10-20
§3.1 Laplace’s equation Christopher Crawford PHY 416

2 Outline Overview Summary of Ch. 2 Intro to Ch. 3, Ch. 4
Laplacian – curvature (X-ray) operator PDEs in physics with Laplacian Laplacian in 1-d, 2-d, 3-d Boundary conditions Classification of hyperbolic, elliptic, parabolic PDE’s External boundaries: uniqueness theorem Internal boundaries: continuity conditions Numerical solution – real-life problems solved on computer Relaxation method Finite difference Finite element analysis – HW6

3 Summary of Ch. 2

4 Laplacian in physics Derivative chain: potential to conservative flux to source Example: electrostatic potential, electric flux, and charge

5 Laplacian in lower dimensions
1-d Laplacian 2nd derivative: curvature Flux: doesn’t spread out in space Solution: Boundary conditions: Mean field theorem 2-d Laplacian Flux: spreads out on surface 2nd order elliptic PDE No trivial integration Depends on boundary cond. No local extrema

6 Laplacian in 3-d Laplace equation:
Now curvature in all three dimensions – harder to visualize All three curvatures must add to zero Unique solution is determined by fixing V on boundary surface Mean value theorem:

7 Classification of Conic Sections
Quadratic bilinear form: matrix of coefficients Elliptic – 2 positive eigenvalues, det > 0 Hyperbolic – 1 negative eigenvalue, det < 0 Parabolic – 1 null eigenvalue, det = 0

8 Classification of 2nd order PDEs
Same as conic sections (where ) Elliptic – Laplacian Spacelike boundary everywhere 1 boundary condition at each point on the boundary surface Hyperbolic – wave equation Timelike (initial) and spacelike (edges) boundaries 2 initial conditions in time, 1 boundary condition at each edge Parabolic – diffusion equation 1 initial condition in time, 1 boundary condition at each edge

9 External boundary conditions
Uniqueness theorem – difference between any two solutions of Poisson’s equation is determined by values on the boundary External boundary conditions:

10 Internal boundary conditions
Possible singularities (charge, current) on the interface between two materials Boundary conditions “sew” together solutions on either side of the boundary External: 1 condition on each side Internal: 2 interconnected conditions General prescription to derive any boundary condition:

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