Prados, AntonioBonilla, Luis L.Carpio Rodríguez, Ana María2023-06-202023-06-202010Prados, A., Bonilla, L. L. y Carpio Rodríguez, A. M. «Phase transitions in a mechanical system coupled to Glauber spins». Journal of Statistical Mechanics: Theory and Experiment, vol. 2010, n.o 06, junio de 2010, p. P06016. DOI.org (Crossref), https://doi.org/10.1088/1742-5468/2010/06/P06016.1742-546810.1088/1742-5468/2010/06/P06016https://hdl.handle.net/20.500.14352/42114A harmonic oscillator linearly coupled with a linear chain of Ising spins is investigated. The N spins in the chain interact with their nearest neighbours with a coupling constant proportional to the oscillator position and to N(-1/2), are in contact with a thermal bath at temperature T, and evolve under Glauber dynamics. The oscillator position is a stochastic process due to the oscillator-spin interaction which produces drastic changes in the equilibrium behaviour and the dynamics of the oscillator. Firstly, there is a second order phase transition at a critical temperature T(c) whose order parameter is the oscillator stable rest position: this position is zero above T(c) and different from zero below T(c). This transition appears because the oscillator moves in an effective potential equal to the harmonic term plus the free energy of the spin system at fixed oscillator position. Secondly, assuming fast spin relaxation (compared to the oscillator natural period), the oscillator dynamical behaviour is described by an effective equation containing a nonlinear friction term that drives the oscillator towards the stable equilibrium state of the effective potential. The analytical results are compared with numerical simulation throughout the paper.engPhase transitions in a mechanical system coupled to Glauber spinsjournal articlehttps://doi.org/10.1088/1742-5468/2010/06/P06016http://iopscience.iop.org/1742-5468/2010/06/P06016/pdf/1742-5468_2010_06_P06016.pdfrestricted access530.1Dimensional ising-modelDNA DenaturationDynamics classical phase transitions (theory)stochastic particle dynamics (theory)stochastic processes (theory)Física matemática