A complete effective field theory for dark matter
Metadatos
Afficher la notice complèteAuteur
Criado Álamo, Juan Carlos; Djouadi, Abdelhak; Pérez-Victoria Moreno De Barreda, Manuel María; Santiago Pérez, JoséEditorial
SpringerLink
Materia
Beyond Standard Model Cosmology of Theories beyond the SM Effective Field Theories
Date
2021-06-22Referencia bibliográfica
Criado Álamo, J.C. et. al. J. High Energ. Phys. 2021, 81 (2021). [https://doi.org/10.1007/JHEP07(2021)081]
Patrocinador
Ministerio de Ciencia e Innovación project PID2019-106087GB-C22 and by Junta de Andalucia projects FQM-101, A-FQM-211-UGR18, P18- FR-4314 and SOMM17/6104/UGR (including ERDF)Résumé
We present an effective field theory describing the relevant interactions of
the Standard Model with an electrically neutral particle that can account for the dark
matter in the Universe. The possible mediators of these interactions are assumed to be
heavy. The dark matter candidates that we consider have spin 0, 1/2 or 1, belong to
an electroweak multiplet with arbitrary isospin and hypercharge and their stability at
cosmological scales is guaranteed by imposing a Z2 symmetry. We present the most general
framework for describing the interaction of the dark matter with standard particles, and
construct a general non-redundant basis of the gauge-invariant operators up to dimension
six. The basis includes multiplets with non-vanishing hypercharge, which can also be
viable DM candidates. We give two examples illustrating the phenomenological use of
such a general effective framework. First, we consider the case of a scalar singlet, provide
convenient semi-analytical expressions for the relevant dark matter observables, use present
experimental data to set constraints on the Wilson coefficients of the operators, and show
how the interplay of different operators can open new allowed windows in the parameter
space of the model. Then we study the case of a lepton isodoublet, which involves coannihilation
processes, and we discuss the impact of the operators on the particle mass
splitting and direct detection cross sections. These examples highlight the importance of
the contribution of the various non-renormalizable operators, which can even dominate
over the gauge interactions in certain cases.