Chapter II Klein Gordan Field Lecture 1 Books Recommended: Lectures on Quantum Field Theory by Ashok Das Quantum Field Theory by Michio Kaku
Review of Simple Harmonic Oscillator Hamitonian for Harmonic oscillator ------(1) Introducing annihilation and creation operators -------(2)
We can write ----(3) Hamiltonian will be ----(4)
Commutation of Hamiltonian with creation And annihilation operators ----(5) Considering -----(6) We can write -----(7)
Ground state energy -----(8) For excited states -----(9)
Klein Gordon Field Lagrangian density for real scalar field ------(1) Momentum field density -----(2)
Hamiltonian density ----(3)
Total Hamiltonian ----------(4) Dimensions : (write (1) using and c)
Canonical quantization for scalar fields -------(5)
Field Decomposition We use plane wave solutions as complete set of basis and expand field operator as -------(6)
Satisfy Klein Gordon Eq -----(7) Using (6) in (7) -----(8)
Fourier transform has non-vanishing component only on the mass shell -----(9) We can write ---------(10)
Using (10) in (6), -------(11) Argument of Dirac delta vanished when ----(12)
We write Dirac delta function as -------(13)
Using (13) in (11) -------(14)
In 2nd term of Eq (14) use We have ---(15)
Real field will be hermitian ---------(16)
We have ---(17) And we write ------(18)
Note that ---(19) And using ----(20) Using above in (18), -----(21)
Positive and negative energy part ----(21) And thus --------(22)