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Natural Science Forum / Physics / Research / May 2008Question about Gaussian Intergal Underlying the "Central Identity of Quantum Field Theory"
I am trying to pinpoint the precise origins of the the term d/dJ which appears as the argument in the potential V(d/dJ) in the so-called "Central Identity of Quantum Field Theory," given on page 460 of Zee's QFT in an Nutshell, and especially how one gets from V(x) --> V(d/dJ). I have outlined my queries about this in a one page file linked below, which also ties this query together with some of my other recent queries: http://jayryablon.files.wordpress.com/2008/04/central-identity.pdf . Any help is appreciated. If clicking the link above does not work, then right click and download the file, then open. Thanks, Jay. ____________________________ Jay R. Yablon Email: jyablon@nycap.rr.com co-moderator: sci.physics.foundations Weblog: http://jayryablon.wordpress.com/ Web Site: http://home.nycap.rr.com/jry/FermionMass.htm > I am trying to pinpoint the precise origins of the the term d/dJ which > appears as the argument in the potential V(d/dJ) in the so-called > "Central Identity of Quantum Field Theory," given on page 460 of Zee's > QFT in an Nutshell, and especially how one gets from V(x) --> V(d/dJ). Hey J-boy! Isn't this done in Zee's "A baby problem" on pp42-43 ? The steps leading up to formulas (3) and (4) ? LOL with Neuropulp! >> I am trying to pinpoint the precise origins of the the term d/dJ >> which [quoted text clipped - 10 lines] > > LOL with Neuropulp! Hey pulp-boy! ;-) Yes it is. I was mulling though exactly that when I first made the post, because I was looking for a good way to frame that derivation in the most general way possible, and not be tied to that specific "baby problem" in Zee. I think I have succeeded in that complete generalization, which I have laid out in the ~1 page file linked below. (If left click does not work, then right click to download, then open.) http://jayryablon.files.wordpress.com/2008/05/zee-baby-problem.pdf Does this pretty much answer the original question? Thanks, Jay. One other question: The identity (6) at http://jayryablon.files.wordpress.com/2008/05/zee-baby-problem.pdf is based on B<>0 in (4). Does this dependence on non-zero B still apply to (6)? In other words: if B=0, then (6) transparently reduces to ($=integral -oo to +oo): $exp[Ax^2-V(x)] = exp[-V(d/dB)] sqrt(2pi/A) (7) But, what happens to the V(d/dB), since this only arises from (4) based on assuming non-zero B. In (7), exp[-V(d/dB)] is only operating on sqrt(2pi/A), with B=0. So, is (7) above a valid expression, and if so, am I to conclude from taking a series expansion of exp[-V(d/dB)], then having it operate on sqrt(2pi/A), that the whole expression (7) = 0? Thanks. Jay. |
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