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§3.3.1 Sturm-Liouville theorem: orthogonal eigenfunctions

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Presentation on theme: "§3.3.1 Sturm-Liouville theorem: orthogonal eigenfunctions"— Presentation transcript:

1 §3.3.1 Sturm-Liouville theorem: orthogonal eigenfunctions
Christopher Crawford PHY 416

2 Outline Review of eigenvalue problem Linear function spaces: Sturm-Liouville theorem Review of rectangular BVP in term of vectors / eigenstuff Separation of Cartesian variables: Plane waves: exponentials

3 Vectors vs. Functions Functions can be added or stretched (pointwise operation) Continuous vs. discrete vector space Components: function value at each point Visualization: graphs, not arrows ` `

4 Vectors vs. Functions ` `

5 Sturm-Liouville Theorem
Laplacian (self-adjoint) has orthogonal eigenfunctions This is true in any orthogonal coordinate system! Sturm-Liouville operator – eigenvalue problem Theorem: eigenfunctions with different eigenvalues are orthogonal

6 Rectangular box: eigenfunctions
Boundary value problem: Laplace equation

7 Rectangular box: components
Boundary value problem: Boundary conditions 7

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