Effective action approach to quantum and thermal effects: from one particle to Bose-Einstein condensates (2511.18020v1)

Abstract: We present a detailed derivation of the quantum and quantum-thermal effective action for non-relativistic systems, starting from the single particle case and extending to the Gross-Pitaevskii (GP) field theory for weakly interacting bosons. In the single-particle framework, we introduce the one-particle irreducible 1PI effective action formalism taking explicitly into account the choice of the initial quantum state, its saddle-point plus Gaussian fluctuation approximation, and its finite temperature extension via Matsubara summation. This yields a clear physical interpretation in terms of zero-point and thermal contributions to the Helmholtz free energy. The formalism is then applied to the GP action producing the 1PI effective potential at zero and finite temperature including beyond-mean-field Lee-Huang-Yang and thermal corrections. We discuss the gapless and gapped Bogoliubov spectra, their relevance to equilibrium and nonequilibrium regimes, and the role of regularization. Applications include the inclusion of an external potential within the local density approximation, the derivation of finite-temperature Josephson equations, and the extension to D dimensional systems. This unified approach provides a transparent connection between microscopic quantum fluctuations and effective macroscopic equations of motion for Bose-Einstein condensates.