The Resolvent of the Nelson Hamiltonian Improves Positivity

Bach, V., Fröhlich, J., Sigal, I.M.: Renormalization group analysis of spectral problems in quantum field theory. Adv. Math. 137(2), 205–298 (1998) Cannon, J.T.: Quantum field theoretic properties of a model of Nelson: Domain and eigenvector stability for perturbed linear operators. J. Funct. Anal. 8(1), 101–152 (1971) Dam, T.N., Hinrichs, B.: Absence of ground states in the renormalized massless translation-invariant Nelson model. arXiv:1909.07661 (2019) Faris, W.G.: Invariant cones and uniqueness of the ground state for fermion systems. J. Math Invariant Phys. 13(8), 1285–1290 (1972) Fröhlich, J.: On the infrared problem in a model of scalar electrons and massless, scalar bosons. Ann. Inst. H. Poincaré, (A) 19(1), 1–103 (1973) Fröhlich, J.: Existence of dressed one electron states in a class of persistent models. Fortschr. Phys. 22(3), 159–198 (1974) Glimm, J., Jaffe, A.: The λ(φ4)2 quantum field theory without cutoffs: II. the field operators and the approximate vacuum. Ann.Math.(2) 91(2), 362–401 (1970) Gross, L.: Existence and uniqueness of physical ground states. J. Funct Anal. 10(1), 52–109 (1972) Griesemer, M., Wünsch, A.: On the domain of the Nelson Hamiltonian. J. Math. Phys. 59(4), 042111 (2018) Lampart, J.: A nonrelativistic quantum field theory with point interactions in three dimensions. Ann. H. Poincaré, 20(11), 3509–3541 (2019) Lampart, J.: The renormalised Bogoliubov-Fröhlich Hamiltonian. J. Math. Phys. 61(10), 101902 (2020) Lampart, J., Schmidt, J.: On Nelson-type Hamiltonians and abstract boundary conditions. Commun. Math. Phys. 367(2), 629–663 (2019) Miyao, T.: On renormalized H,amiltonian nets. arXiv:1810.12716 (2018) Miyao, T.: On the semigroup generated by the renormalized Nelson Hamiltonian. J. Funct. Anal. 276(6), 1948–1977 (2019) Matte, O., Møller, J.S.: Feynman-Kac formulas for the ultra-violet renormalized Nelson model. Astérisque, 404 (2018) Møller, J.S.: The translation invariant massive Nelson model: I. the bottom of the spectrum. Ann. H. Poincaré 6(6), 1091–1135 (2005) Nelson, E.: Interaction of nonrelativistic particles with a quantized scalar field. J. Math. Phys. 5(9), 1190–1197 (1964) Posilicano, A.: On the self-adjointness of H + A∗ + A. Math. Phys. Anal. Geom., 23(37) (2020) Schmidt, J.: On a direct description of pseudorelativistic Nelson Hamiltonians. J. Math. Phys. 60(10), 102303 (2019) Schmidt, J.: The massless Nelson Hamiltonian and its domain. In: Dell’Antonio, G., Michelangeli, A. (eds.) Mathematical Challenges of Zero-Range Physics (in press) (2020) Teufel, S., Tumulka, R.: Avoiding ultraviolet divergence by means of interior–boundary conditions. In: Finster, F., Kleiner, J., Röken, C., Tolksdorf, J. (eds.) Quantum Mathematical Physics. Birkhäuser (2016) Teufel, S., Tumulka, R.: Hamiltonians without ultraviolet divergence for quantum field theories. Quantum Stud. Math. Found. (2020)