What is Path integral: Definition and 180 Discussions

The path integral formulation is a description in quantum mechanics that generalizes the action principle of classical mechanics. It replaces the classical notion of a single, unique classical trajectory for a system with a sum, or functional integral, over an infinity of quantum-mechanically possible trajectories to compute a quantum amplitude.
This formulation has proven crucial to the subsequent development of theoretical physics, because manifest Lorentz covariance (time and space components of quantities enter equations in the same way) is easier to achieve than in the operator formalism of canonical quantization. Unlike previous methods, the path integral allows one to easily change coordinates between very different canonical descriptions of the same quantum system. Another advantage is that it is in practice easier to guess the correct form of the Lagrangian of a theory, which naturally enters the path integrals (for interactions of a certain type, these are coordinate space or Feynman path integrals), than the Hamiltonian. Possible downsides of the approach include that unitarity (this is related to conservation of probability; the probabilities of all physically possible outcomes must add up to one) of the S-matrix is obscure in the formulation. The path-integral approach has been proved to be equivalent to the other formalisms of quantum mechanics and quantum field theory. Thus, by deriving either approach from the other, problems associated with one or the other approach (as exemplified by Lorentz covariance or unitarity) go away.The path integral also relates quantum and stochastic processes, and this provided the basis for the grand synthesis of the 1970s, which unified quantum field theory with the statistical field theory of a fluctuating field near a second-order phase transition. The Schrödinger equation is a diffusion equation with an imaginary diffusion constant, and the path integral is an analytic continuation of a method for summing up all possible random walks.The basic idea of the path integral formulation can be traced back to Norbert Wiener, who introduced the Wiener integral for solving problems in diffusion and Brownian motion. This idea was extended to the use of the Lagrangian in quantum mechanics by Paul Dirac in his 1933 article. The complete method was developed in 1948 by Richard Feynman. Some preliminaries were worked out earlier in his doctoral work under the supervision of John Archibald Wheeler. The original motivation stemmed from the desire to obtain a quantum-mechanical formulation for the Wheeler–Feynman absorber theory using a Lagrangian (rather than a Hamiltonian) as a starting point.

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  1. G

    Path Integral Derivation Question

    Hello, this will be my first post on the physics forum, so i wanted to make it decent :P I've been trying recently to derive for myself a path integral formulation (not quantum mechanical or anything feynman like but for finding the length of a curve on a given interval). Heres my attempt at...
  2. N

    Why is it path integral formalism being a ''quantization'' procedure?

    Please teach me this: I do not understand why we call functional integral procedure in QFT being ''quantization'' procedure.Because the integration is the ''summing up'' procedure,but not ''dividing'' into ''quantum'' procedure.Or does this term(quantization) has a origin of being able to...
  3. B

    Computing Path Integral for f(x,y,z) = x^2 on Sphere-Plane Intersection

    Compute the path integral where f(x,y,z) = x^2 and the path C is the intersection of the sphere x^2+y^2+z^2=1 and the plane x+y+z=0. I found the intersection to be x+y-(1/sqrt(2))=0 (not sure if that's right) but I am not sure how to parametrize it in terms of t. Any help would be appreciated.
  4. I

    Path integral for a particle coupled to a magnetic field

    Hi all, I am currently having trouble with an exercise: writing the propagator of a particle coupled to a magnetic field. So the lagrangian is L_A (\vec{x},\dot{\vec{x}}^2) = \frac{m}{2}\dot{\vec{x}} + e\vec{A}.\dot{\vec{x}} And it says that I should solve it in two different ways: -by writing...
  5. F

    Does the Path Integral contain EVERY possibility?

    I'm understanding that the Path Integral formulation of quantum mechanics includes every possibility - every possible trajectory of a particle in QM, and every possible field configuration in QFT. So I'm wondering, if we consider the Path Integrals in both QM and QFT, either separately or in...
  6. F

    Path Integral in first and second quantization

    Is it true that in first quantization the PI includes the possible trajectories a particle can take, but it does not include how particles can change into other kinds of particles (electrons to photons, etc). And QFT (second quantization) calculates how particles can branch off into other...
  7. S

    Virtual particle in path integral and perturbative approaches

    "Virtual particle" in path integral and perturbative approaches The term "virtual particle" is used in path integral and perturbative approaches. How do these "virtual particles" differ and how are they related? [For example, static, bound states such as the hydrogen atom are solvable by...
  8. G

    Path Integral QM: Intro and Forward/Backward Scattering

    hello I started to read ‘QFT in a Nutshell’ by A. Zee. In the introduction to the path integral formulation of quantum mechanics there is the story about a particle going through a series of screens with holes drilled through them. Then the number of holes in each screen is increased. This...
  9. A

    Path integral formulation

    Hey guys, can anyone suggest good learning materials (books, lectures, pdfs...) for the path integral formulation of QM? I don't need anything too advanced, just a thorough intro. Are Feynman's books any good? EDIT: Oh yeah, some quantum thermodynamics too in the mix would be cool.
  10. S

    Path Integral - Cartesian to Polar Coordinates

    Homework Statement Transform to polar coordinates and evaluate... \int^{a/\sqrt{2}}_{0} dx\int^{\sqrt{a^2-x^2}}_{x}\sqrt{x^2 + y^2}dy Homework Equations x^2 + y^2 = r^2 x = r cos \theta y = r sin \theta I've been struggling to make sense of this problem, it should be easy, I'm...
  11. N

    I don't get this Path Integral stuff

    I always have a feeling of apprehension posting on the Quantum Physics subforum, because I haven't done any of the math for it However, a friend recently told men (I think he read it in the Elegant Universe) that if you shine a flashlight on a wall or something, photon takes every possible...
  12. G

    Path integral formulation of non-relativistic quantum mechanics

    I am looking for a textbook that introduces and discusses the path integral formulation of non-relativistic quantum mechanics? Would you have some suggestions for me? Thanks.
  13. P

    Conductivity from path integral and Kubo formlism

    Hi, In calculating the conductivity from the Kubo method j_{\mu}=\int dx' K_{\mu \nu} (x,x') A^{\nu}(x') in literature ( e.g. in Condensed Matter Field Theory by Altland and Simons) you find that K_{\mu \nu}(x,x')= Z^{-1} \frac{\delta^2}{\delta A_{\mu}(x) \delta A_{nu}(x')}...
  14. R

    Reviewing Yang-Mills Gauge Field: Symmetries & Path Integral Methods

    Just to review a little bit: In general, for a gauge field with Yang-Mills Lagrangian \mathcal L=-\frac{1}{4}F^{c}_{\mu \nu}F^{c \mu \nu} for each c it is impossible to find the resulting free Green's function G(k) in momentum space: (g^{\mu \nu}k^2-k^{\mu}k^{\nu})G_{\nu...
  15. P

    Integration in path integral formalism?

    Hi, Does anyone know how this integral is calculated \int[dx] x_i x_j \exp \{ - (\frac{1}{2} \sum_{rs} A_{rs}x_r x_s+\sum_r L_r x_r ) \} Thanks
  16. B

    Path integral and line integrals

    Homework Statement what is the difference between path integral and line integral? Homework Equations n/a The Attempt at a Solution is path integral over a scalar function and line integral is over vector function? I'm confused about this pls help me understand thanks...
  17. K

    Feynman Path Integral: Explaining e^{\frac{iS(x)}{\hbar}}

    In a Feynman Path integral, Z(\phi) = \int \cal D \phi e^{\frac{iS(x)}{\hbar}}, what does the object e^{\frac{iS(x)}{\hbar}} mean?
  18. A

    Is the Path Integral Formulation of Quantum Mechanics Violating the Speed Limit?

    As i understand as a solution to the double slit experiment is the path integral formulation. Since a particle fired at one slit will interfere with its all other trajectories and will formulate that pattern we all know, doesn't this imply that information is exchanged between it and all...
  19. K

    How does non-commutativity emerge from path integral?

    It is not obvious to see the non-commutative nature of QM in path integral formulation. I've read something on Wiki: http://en.wikipedia.org/wiki/Path_integral_formulation#Canonical_commutation_relations But I can't work out the math fully, can someone guide me a bit?
  20. K

    Non-differentiable path in path integral?

    It seems obvious in path integral, the paths include some non-differentiable path (some even discontinuous, I think), wouldn't it cause any serious problem? For example, the classical lagrangian as the phase factor, is defined on differentiable paths, isn't it?
  21. L

    Majorana Path Integral: Deriving VEVs of Barred/Unbarred Fields

    Hi, By analogy with scalar field case, Srednicki leads us to Z_0 (\eta)=\int \mathcal{D}\Psi \exp{\left[i\int\,\mathrm{d}^4x (\mathcal{L}_0+\eta^{T}\psi)\right]} for a Majorana field. I was expecting something different, like maybe: Z_0 (\eta)=\int...
  22. N

    Computing harmonic oscillator propagator via path integral

    Homework Statement Show that G(q_2,q_1;t)=\mathcal{N}\frac{e^{iS_{lc}}}{\sqrt{\det A}} where \mathcal{N} is a normalization factor independent of q1, q2, t, and w. Using the known case of w=0, write a formula for G such that there is no unknown normalization factor. Homework Equations I...
  23. jinksys

    Evaluating a Path Integral: x^2+y^2+z^2

    Homework Statement Evaluate the path integral \int (x^2+y^2+z^2)dr from a =(0,0,0) to b= (3,4,5). Homework Equations The Attempt at a Solution I'm lost. Had the dr been a ds I could do it, but my calculus book only deals with situations where \int F.dr.Edit: I figured it out, it's been a...
  24. marcus

    Timeless Path Integral: Dah-Wei Chiou's Latest Paper

    ==quote from Dah-Wei Chiou's latest paper== In the research of loop quantum gravity (LQG), the sum-over-histories formulation is an active research area that goes under the name “spin foam models” (SFMs) (see [9] and references therein for LQG and SFMs). In particular, over the past years, SFMs...
  25. T

    Path integral in coherent states

    Hey, there is something I don't really understand about the path integral (functional integral) formalism in QFT: Why do you need to introduce a coherent-state representation of the Dirac fields in order to evaluate their path integral? Where is the crucial point why it doesn't work like...
  26. W

    What is the derivation for the path integral formulation of quantum mechanics?

    I'm not quite satisfied by the derivation I've found in Sakurai (Modern Quantum Mechanics) and was trying to 'derive' it myself. I'd like some help to seal the deal. I've described below what I've done. Please tell me where to go from there. I know the solution to the Schrodinger equation can...
  27. S

    State Kets in QM and F. Path Integral

    Greetings, I know that position state ket is a continuous state ket satisfying X|x> = x|x>. There is however one notation I don't understand. What does it mean when we label the position ket with a discrete index and then use these to expand operators as <x_i|H|x_j>? What does it generally...
  28. P

    Understanding the Path Integral for Photons - Vince's Q&A

    I'm a bit confused about how the path integral for, say, a spin-0 photon is calculated. My understanding of quantum mechanics is somewhere above Feynman's book QED, but somewhere below actually figuring out what every part of the technical definition means. Right now the main sticking point for...
  29. E

    Canonical vs. path integral quantization

    Hey folks, i have a question concerning canonical and path integral quantization. From what I have understood so far, these two techniques are different and independent but equivalent. My problem is that I don't really see where the quantum character enters in the path intregral formulation...
  30. G

    Integrating by parts in path integral (Zee)

    Hi all, I have an exceptionally basic question, taken from P21 of Zee. Eq. 14 is Z=\int D\psi e^{i\int d^4x(\frac{1}{2}[(\partial\psi )^2-m^2\psi^2] + J\psi)} The statement is then made that 'Integrating by parts under the \int d^4x' leads to Eq. 15: Z=\int D\psi e^{i\int...
  31. S

    Path integral applied to circular path

    Homework Statement Consider path given by equation ( x - 1 )^2 + ( y - 1 ) ^2 = 1 that connect the points A = ( 0 , 1 ) and B = ( 1 , 0 ) in xy plane ( shown in image attached ). A bead falling under influence of gravity from a point A to point B along a curve is given by...
  32. F

    Measure on Path Integral not defined

    Where can I find an On-line exposition of the undefined nature of the measure in the Feynman path integral? Thanks.
  33. R

    Path integral formulation - uses/related topics

    Hi, I'm writing a paper on the PI formulation and i wondered if anyone has any other ideas as to what its uses are and what other topics it is used in. I came across the CDT (causal dynamical triangulation) theory and this uses a non perturbativ PI approach so i will talk about that in the...
  34. R

    Good Resources for Feynman's Path Integral

    Hello I am looking for websites/online lectures about Feynman's Path Integral formalism. I have Feynman and Hibbs but otherwise my library doesn't have any suitable books. Does anyone know of any good websites on the general theory, history and background, path integrals in general or anything...
  35. maverick280857

    Correlation Functions in Path Integral Formulation of QFT

    Hi, I was going through section 9.2 of Peskin and Schroeder, and came across equation 9.16 which reads \int\mathcal{D}\phi(x) = \int \mathcal{D}\phi_{1}({{\bf{x}}}) = \int \mathcal{D}\phi_{2}({{\bf{x}}}\)int_{\phi(x_{1}^{0},{\bf{x}})\\\phi(x_{1}^{0},{\bf{x}})}\mathcal{D}\phi(x) What does the...
  36. maverick280857

    Problem with Path Integral Expressions in Peskin And Schroeder Section 9.1

    Hi again everyone, I have some doubts about the path integral expressions given in Section 9.1 of Peskin and Schroeder (pg 281 and 282). For a Weyl ordered Hamiltonian H, the propagator has the form given by equation 9.11, which reads U(q_{0},q_{N};T) = \left(\prod_{i,k}\int dq_{k}^{i}\int...
  37. maverick280857

    What is the Weyl symbol and its relation to the propagator in QFT?

    Hi everyone, In chapter 5 of Lewis Ryder's book on QFT, the expression for the propagator as a path integral is derived. Equation 5.7, which is the expression for the propagator over a small path (q_{j+1} t_{j+1};q_{j}t_{j}), reads \langle q_{j+1} t_{j+1} |q_{j}t_{j}\rangle =...
  38. maverick280857

    Path Integral Propagator Normalization in Lewis Ryder's QFT book

    Hi, In Lewis Ryder's QFT book on page 160, the propagator for the case when the Lagrangian can be written as L = \frac{p^2}{2m} + V(q) is given as \langle q_f t_f|q_i t_i \rangle = \lim_{n\rightarrow\infty}\left(\frac{m}{i\hbar\tau}\right)^{(n+1)/2}\int...
  39. C

    Does Multi Path Integral Formulation Violate Special Relativity?

    does the multi Path integral formulation violate special relativity ! do we get speeds faster than c.
  40. H

    Pre-requisites for path integral formulation?

    Pre-requisites for path integral formulation? Does anybody have any idea of the pre-requisites to learn Feynmann's path integral formulation? (properly) Right about now, I'm still learning about Lagrangian and Hamiltonian mechanics which focuses on the principle of least action. Right now, the...
  41. pellman

    Is the path integral well defined

    From a QM (not QFT) context, one particle, we start with a hamiltonian H(q,p) and develop something like \langle q'',T|q',0\rangle \approx \int e^{-i\sum_{l=0}^{N}[H(q_l,p_l)-p_l\dot{q}_l]\delta t}\prod_{j=1}^N{dq_j}\prod_{j=0}^N{\frac{dp_k}{2\pi}} where \delta t = T/(N+1) and \dot{q}_j...
  42. C

    Feynman's Path integral formulation

    Does Feynman's path integral formulation violate relativity , we get path's that are faster than c.
  43. MTd2

    Path Integral Quantization in Finsler Geometry

    http://arxiv.org/abs/0904.2464 Finsler Geometrical Path Integral Authors: Takayoshi Ootsuka, Erico Tanaka (Submitted on 16 Apr 2009) Abstract: A new definition for the path integral is proposed in terms of Finsler geometry. The conventional Feynman's scheme for quantisation by...
  44. marcus

    Path Integral formulation of Loop Cosmology (a first)

    Today (17 March) we got our first news of a Path Integral formulation of LQC. Adam Henderson is a PhD student in Ashtekar's group at Penn State. He gave an internationally distributed seminar talk on his research. http://relativity.phys.lsu.edu/ilqgs/henderson031709.pdf...
  45. E

    Classical limit of the path integral

    In feynman's quantum mechanics and path integrals, he makes the following claim: "Now if we move the path by a small amount dx, small on the classical scale, the change in S (the action), is likewise small on the classical scale, but not when measured in the tiny unit of reduced Planck's...
  46. W

    Path Integral Question - Why q_n-1 & q_n' Matter

    Hi, I'm going through the details of the path integral, and have a question about its derivation. When we discretize the time interval and evaluate <p_n|exp(-iH*(t_n-t_n-1)|q_n-1>, a Hamiltonian of the form H(p,q)=T(p)+V(q) becomes a number T(p_n)+V(q_n-1). However, when the Hamiltonian...
  47. P

    Forced Harmonic Oscillator with Path Integral

    Hello, how do I compute the transition amplitude of the forced harmonic oscillator with the method of path integration? Regards, Mr. Fogg
  48. S

    Path Integral Doubt: How Did Shankar Deduce S/h>pi?

    I just read the chapter in Shankar regarding path integrals (the 8th) I didnt quite get how he deduced that destructive interference in the summation sets in after S/h>pi.(This is the first section itself) I couldn't find reference to such a thing elsewhere.
  49. O

    Question on quadratic fluctuations in the path integral formalism

    hi, could someone please explain to me the attached excerpt, more specifically, why one has to multiply with the ratio. any ideas will be welcome! thanks
  50. F

    Path Integral for curved spacetime

    Does anyone know what the Feynman Path Integral would look like in a space that has a curved geometry? I'm NOT talking about expressing the path integral in curvilinear coordinates that merely parameterize the cartesian coordinates of flat space. I'm talking about a space with curvature, like in...
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