Recent content by TTT
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I Rigged Hilbert Space X: Eq (1) and (2)
X=e+or-kx (1) <X(x)|Φ(x)>=∫-∞∞X*(x)Φ(x)dx (2) where Φ(x) satisfies the following. ∫-∞∞|Φ(x)|2(1+|x|)ndx is finte if n=0, 1, 2,...- TTT
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- Hilbert Hilbert space Space
- Replies: 1
- Forum: Quantum Physics
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Is the Integral ∫x|∅(x)|²(1+|x|)ⁿdx Finite in Quantum Mechanics?
This question is not quoted from the textbook I am using for this class, so I do not know where this question comes from- TTT
- Post #5
- Forum: Advanced Physics Homework Help
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Is the Integral ∫x|∅(x)|²(1+|x|)ⁿdx Finite in Quantum Mechanics?
I have tried to do this with integrating it by parts, but it did not go well. Are you suggesting something else?- TTT
- Post #4
- Forum: Advanced Physics Homework Help
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Is the Integral ∫x|∅(x)|²(1+|x|)ⁿdx Finite in Quantum Mechanics?
If I understand this question correctly, I am supposed to prove an integrate from negative infinity to infinity ∫x|∅(x)|2(1+|x|)ndx is finite. Sorry, but I have no idea.- TTT
- Thread
- Nuclear Qm Space
- Replies: 9
- Forum: Advanced Physics Homework Help