In quantum mechanics, it's (roughly) the wave function: [$]|\psi(x)|^2 dx = p(x) \, dx[$], where [$]p(x)[$] is a pdf.square root of probability any interpretation?
In quantum mechanics, it's (roughly) the wave function: [$]|\psi(x)|^2 dx = p(x) \, dx[$], where [$]p(x)[$] is a pdf.square root of probability any interpretation?
unfortunately these probabilities are not satisfactory, not even according to Prince Louis-Victor Pierre Raymond de Broglie :In quantum mechanics, it's (roughly) the wave function: [$]|\psi(x)|^2 dx = p(x) \, dx[$], where [$]p(x)[$] is a pdf.square root of probability any interpretation?
Also second year courses at Hogwarts, if I'm not mistaken ..."eidal ... quiddital ... and archaeal."
If you are building a mathematical object in stages and find that (i) you have not finished even after infinitely many stages, and (ii) there seems to be nothing to stop you continuing to build, then Zorn’s lemma may well be able to help you.
— William Timothy Gowers, "How to use Zorn’s lemma"[7]