Quantum Physics II PHYS 402, Fall 2015 Instructor: Victor Galitski Lecture 2: A physical interpretation of QM Part I: Meaning of the wave function; the.
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Quantum Physics IIPHYS 402, Fall 2015 Instructor: Victor Galitski
Lecture 2: A physical interpretation of QMPart I: Meaning of the wave function; the Born rule
Schrödinger equation
The Nobel Prize in Physics 1933 was awarded jointly to Erwin Schrödinger and Paul Adrien Maurice Dirac "for the discovery of new productive forms of atomic theory."
Born interpretation
The Nobel Prize in Physics 1954 was divided equally between Max Born "for his fundamental research in quantum mechanics, especially for his statistical interpretation of the wavefunction"
So, what is the wave-function?
• It may be a wrong question to ask, as the wave-function is a mathematical construct(one among several others) that allows us to calculate what we are interested in (observables, i.e., something we can actually measure).
Quantum observable, X, at t=0
Know:
Quantum observable, X, at a later time t=T
Want to know:
No closed equation for X…
Find the wave-functionwhich satisfies a closed
Eq and determines X
• We certainly have seen such auxiliary concepts elsewhere in physics. For example:
Neither scalar nor vector potential is directly observable, which does not surpriseus, neither should we be surprised by the wave-function…
Quantum Physics IIPHYS 402, Fall 2015 Instructor: Victor Galitski
Lecture 2: A physical interpretation of QMPart II: Operators
Appearance of operators in Schrödinger’s “derivation”
Experimental fact: quantum electronsmay exhibit wave-like properties
Assume that they may be describedby a plane-wave function:
We have to reconcile it with
Hence the free Schrodinger equationWe can write it as
if we identify,
Generalize it to
with
Expectation values
Quantum Physics IIPHYS 402, Fall 2015 Instructor: Victor Galitski
A physical interpretation of quantum theoryPart III: Time-independent Schrödinger Eq. Eigenvalue problems
Getting rid of the time derivative, when it’s not needed
A simple (mathematical) example of an eigenvalue problem
Operators, eigenvalues, and eigenvectors in QM: summary
Quantum Physics IIPHYS 402, Fall 2015 Instructor: Victor Galitski
Lecture 2: A physical interpretation of QMPart IV: Superposition principle; Dirac notations; representations
Superposition principle in quantum mechanics
Simple reminder from linear algebra
x
y
x’
y’
How to choose a basis/representation
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