| Course: | LPS 141D/241; Phil 141D/241 |
| Name: | Probability and Determinism |
| Description: | The course will examine a cluster of interrelated issues concerning
probability, determinism, logic, and the foundations of quantum mechanics.
After reviewing basic ideas of probability theory and quantum mechanics,
we will first carefully analyze (versions of) "Bell's theorem". These can
be understood to show the impossibility of reconciling determinism with
"locality" in microphysics. They can also be taken to show that "quantum
probability" is non-standard, i.e., not in conformity with the characterization
of probability given by Kolmogorov. After that we will consider certain
controversial claims of Hilary Putnam about the connection between probability
and logic in quantum mechanics. (It was Putnam's view, at least at one
time, that "quantum probability" is standard, but "quantum logic" is not.)
The course will not presuppose any specific course work in physics, but will take for granted familiarity with formal logic (LPS 105B or its equivalent), and basic undergraduate mathematics (at least calculus and linear algebra). More advanced prior training in mathematics and/or physics will certainly be helpful For further information and a syllabus, see the Course
Webpage
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