PATH INTEGRAL for the HARMONIC OSCILLATOR
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1 PATH ITEGRAL for the HAROIC OSCILLATOR I class, I have showed how to use path itegral formalism to calculate the partitio fuctio of a quatum system. Formally, ] ZT = Tr e it Ĥ = ÛT, 0 = dx 0 Ux 0, T ; x 0, 0 = dx 0 xt =x 0 x0=x 0 D xt] e isxt] = xt =x0 Dxt] e isxt] where T Sxt] = dt ẋ V x 0 is the Lagragia actio fuctioal. ote the boudary coditios i the last path itegral i eq. : xt is required to be periodic i time, xt = x0 but there are o separate iitial or fial coditios. I class, I evaluated the path itegral for the harmoic oscillator, but I was deliberately igorig all issues of covergece ad hopig that all the pre-expoetial factors would somehow tae care of themselves. I this ote I tae care of all those pesy pre-expoetial factors. Actually, there are two separate covergece problems. defied via time discretizatio accordig to Formally, the path itegral is xt =x0 / Dxt] e isxt] = lim dx πit dx exp is discr x, x,...,, x, 3 so there is a obvious covergece problem of the cotiuum-time limit of. But eve for fiite there is a separate covergece problem of a dimesioal itegral of a rapidlyoscillatig but uiular fuctio e is. I fact, for this itegral does ot coverge, ot eve coditioally, so it must be re-defied via aalytic cotiuatio.
2 The usual aalytic cotiuatio eeps the x = xt real but maes the time itself imagiary, t = it E which rus from 0 to T = iβ. I field theory, t E is called the Euclidea time because the 4D spacetime spaed by x, x, x 3, x 4 = t E is Euclidea rather tha iowsi. Goig from the real iowsi time t to the real Euclidea time t E = it turs the oscillatig phase fuctio exp is discr = it = x x V x ] T/ of the discretized path itegral ito a real arrowly peaed fuctio exp S discr E = β = 4 x x + V x ]. 5 β/ ote that i the Euclidea actio SE discr both ietic-eergy ad potetial-eergy are positive, so for each fiite we have a absolutely coverget itegral / dx πβ dx exp SE discr x, x,...,, x. 6 This is geerally true for all ids of quatum systems ad ot just for the Harmoic oscillator. The cotiuous-euclidea-time limit is also well-behaved i most cases. Therefore, the techical defiitio of the iowsi-time path itegral is othig but the aalytic cotiuatio of the Euclidea-time PI bac to iowsi time t = it E. By the way, the cotiuous Euclidea-time actio is S E xt E ] = β 0 dx + V x], 7 ad the Euclidea partictio fuctio is xβ=x0 Z E β = Tr e βĥ] = Dxt E ] e SExtE], 8 which loos exacly lie a partitio fuctio i Statistical echaics. Regardless of the path itegral, it is well worth calculatig i its ow right.
3 So, after all these prelimiaries, let is calculate the Euclidea path itegral for the harmoic oscillator. The Euclidea actio of the oscillator S E = β 0 ] dx + ω x 9 discretizes to SE discr x,..., x = β x x + ω β = x ]. 0 which is a quadratic fuctio of the itegratio variables x,..., x. Cosequetly, the discretized path itegral Zβ, = / πβ d x exp S discr E x,..., x is Gaussia ad may be evaluated exactly. Ufortuately, the determiat of the quadratic form 0 is rather formidable, so the best way to evaluate the itegral is to diagoalize the actio as a quadratic form. The cotiuum-time Euclidea actio is diagoalized via Fourier trasform xt E = + = S E x] = β / e πite/β y, ω + π y : β ote that the frequecies here are discrete because the Euclidea time is periodic; also, y = y. For the discretized actio 0 however, we eed the discrete Fourier trasform x = e πi/ y 3 = where the discrete frequecies are defied ulo, i.e. y 0 y, y y, etc., etc.; agai, the frequecy es y are complex, but the complete set of y,... y is self-cojugate 3
4 as y = y. The ey formula of the discrete Fourier trasform is Cosequetly, e πi l/ = δ l. 4 x = x x = y y 5 ad liewise x x = e πi/ y y 6 where the latter follows from x x = / e πi/ e πi/ y. Thus ad therefore SE discr y ] = 4 si π β + ω β y, 7 Zβ, ω, = / J πβ = J d y e Sdiscr E y 4 si π + ω β / 8 where J is the Jacobia of the discrete Fourier trasform 3. To evaluate this Jacobia, we perform the Fourier trasform twice: y = m / e πim/ z m, x = / e πi/ y = z, 9 4
5 which immediately tells us that det x ] = det x = ±. y z m Cosequetly, J = det x / y = ad Zβ, ω, = 4 si π + ω β /. 0 At this poit, let me use without proof a somewhat obscure mathematical formula = si π which allows me to re-write the discretized partitio fuctio as Zβ, ω, = ωβ = 4 si π = ωβ + = =, + ω β ω β 4 si π / / To evaluate the large limit of this partitio fuctio physically, the cotiuous time limit, we approximate 4 si π/ π for, ad liewise 4 si π/ π for, while for the remaiig es si π/ = O ad hece Cosequetly, Zβ, ω, ωβ ωβ = + + ω β + ω β ω β 4 si π π π /.. It remais to evaluate the ifiite product i the last formula. + ω β / π 3 Cosider Zωβ as a aalytic fuctio of a complex argumet. Wheever ay factor of o the right had side has 5
6 a zero i the complex ωβ plae, Zωβ has a zero ad ditto for the poles. Also, the product coverges, so these are the oly poles ad zeroes of the Zωβ The idividual factors at had are /ωβ ad = + ω β π π ωβ + πi ωβ πi for =,, 3,.... Thus, the Zωβ fuctio has o zeroes ad it has poles at ωβ = πi for all itegers positive, egative ad zero. I other words, it has the same poles ad zeroes as the / sihωβ/ fuctio ad ideed, there is a well ow formula sihz = z + = + z π. Thus, at the ed of the log path-itegral calculatio, we arrive at a rather simple formula Z E β = sihωβ/ 4 i Euclidea time, ad by aalytic cotiuatio to iowsi time Z T = i siωt/. 5 Expadig the latter partitio fuctio ito a sum of e iet phases, we have i siωt/ = e iωt/ e iωt = =0 exp it + ω, 6 which immediately tells us that the harmoic oscillator has o-degeerate eergy spectrum with eigevalues E = + ω. Of course, we ew that log before this calculatio, but it cofirms that properly applied path-itegral formalism does yield the correct spectrum. 6
PATH INTEGRAL for HARMONIC OSCILLATOR
PATH ITEGRAL for HAROIC OSCILLATOR I class, I have showed how to use path itegral formalism to calculate the partitio fuctio of a quatum system. Formally, ] ZT = Tr e it Ĥ = ÛT, 0 = dx 0 Ux 0, T ; x 0,
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