Precise bounds on the Higgs boson mass

Abstract

We study the renormalization group evolution of the Higgs quartic coupling λH and the Higgs mass mH in the Standard Model. The one loop equation for λH is non linear and it is of the Riccati type which we numerically and analytically solve in the energy range [mt,EGU] where mt is the mass of the top quark and EGU=1014 GeV. We find that depending on the value of λH(mt) the solution for λH(E) may have singularities or zeros and become negative in the former energy range so the ultra violet cut off of the standard model should be below the energy where the zero or singularity of λH occurs. We find that for 0.369≤λH(mt)≤0.613 the Standard Model is valid in the whole range [mt,EGU]. We consider two cases of the Higgs mass relation to the parameters of the standard model: (a) the effective potential method and (b) the tree level mass relations. The limits for λH(mt) correspond to the following Higgs mass relation 150≤ mH 193 GeV. We also plot the dependence of the ultra violet cut off on the value of the Higgs mass. We analyze the evolution of the vacuum expectation value of the Higgs field and show that it depends on the value of the Higgs mass. The pattern of the energy behavior of the VEV is different for the cases (a) and (b). The behavior of λH(E), mH(E) and v(E) indicates the existence of a phase transition in the standard model. For the effective potential this phase transition occurs at the mass range mH≈ 180 GeV and for the tree level mass relations at mH≈ 168 GeV.

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