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Prove Sturm-Liouville differential operator is self adjoint.
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[QUOTE="LCKurtz, post: 6086448, member: 198114"] I haven't looked at that stuff for years, but my first suggestion to you is to give a more complete statement of the problem. By stating clearly what the problem is, you may see a way to solve it. For example, in the relevant equations you should list the various boundary conditions. Also give the definition of what it means for this differential operator to be self-adjoint. That will surely involve an integral or two. In other words, write down exactly what you need to prove. Once you carefully do that, if my memory serves me correctly, an integration by parts and using the BC's may solve your problem. [/QUOTE]
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Calculus and Beyond Homework Help
Prove Sturm-Liouville differential operator is self adjoint.
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