Introduction to Axiomatic Quantum Field Theory

analytic anticommute arbitrary asymptotic ation axioms Bogolubov bounded called Chapter commutation relations conjugate continuous functions convergence convolution corresponding countably normed spaces defined definition derivatives differentiable distributions domain elements equation equivalence classes example Exercise exists finite follows formulation Fourier transform free field func functional F fundamental sequences given Green functions H₁ H₂ Haag Hermitian integral invariant irreducible representations Lemma linear functional Lorentz group Lorentz transformation matrix neighborhood normed space nuclear space orthogonal particles Phys physical Poincaré group polynomial properties proved quantum field theory quantum theory respect rigged Hilbert space S-matrix satisfies scalar field scalar product self-adjoint operator Show solution space H spacelike spectral condition spin spinor fields subspace symmetry tensor test functions tion topology unitary operator vacuum expectation value variables vector space Wightman functions zero