000048133 001__ 48133 000048133 005__ 20210121114529.0 000048133 0247_ $$2doi$$a10.1103/PhysRevE.92.012316 000048133 0248_ $$2sideral$$a91232 000048133 037__ $$aART-2015-91232 000048133 041__ $$aeng 000048133 100__ $$aCharbonneau, P. 000048133 245__ $$aNumerical detection of the Gardner transition in a mean-field glass former 000048133 260__ $$c2015 000048133 5060_ $$aAccess copy available to the general public$$fUnrestricted 000048133 5203_ $$aRecent theoretical advances predict the existence, deep into the glass phase, of a novel phase transition, the so-called Gardner transition. This transition is associated with the emergence of a complex free energy landscape composed of many marginally stable sub-basins within a glass metabasin. In this study, we explore several methods to detect numerically the Gardner transition in a simple structural glass former, the infinite-range Mari-Kurchan model. The transition point is robustly located from three independent approaches: (i) the divergence of the characteristic relaxation time, (ii) the divergence of the caging susceptibility, and (iii) the abnormal tail in the probability distribution function of cage order parameters. We show that the numerical results are fully consistent with the theoretical expectation. The methods we propose may also be generalized to more realistic numerical models as well as to experimental systems 000048133 536__ $$9info:eu-repo/grantAgreement/ES/MINECO/FIS2012-35719-C02$$9info:eu-repo/grantAgreement/EC/FP7/247328/EU/Critical Phenomena in Random Systems/CRIPHERASY 000048133 540__ $$9info:eu-repo/semantics/openAccess$$aby-nc-nd$$uhttp://creativecommons.org/licenses/by-nc-nd/3.0/es/ 000048133 590__ $$a2.252$$b2015 000048133 591__ $$aPHYSICS, MATHEMATICAL$$b6 / 53 = 0.113$$c2015$$dQ1$$eT1 000048133 591__ $$aPHYSICS, FLUIDS & PLASMAS$$b10 / 30 = 0.333$$c2015$$dQ2$$eT2 000048133 592__ $$a1.183$$b2015 000048133 593__ $$aCondensed Matter Physics$$c2015$$dQ1 000048133 593__ $$aStatistical and Nonlinear Physics$$c2015$$dQ1 000048133 593__ $$aStatistics and Probability$$c2015$$dQ2 000048133 655_4 $$ainfo:eu-repo/semantics/article$$vinfo:eu-repo/semantics/publishedVersion 000048133 700__ $$aJin, Y. 000048133 700__ $$aParisi, G. 000048133 700__ $$aRainone, C. 000048133 700__ $$0(orcid)0000-0002-5967-2827$$aSeoane, B. 000048133 700__ $$aZamponi, F. 000048133 773__ $$g92, 1 (2015), 012821 [15 pp]$$pPhys. rev., E$$tPhysical Review E$$x2470-0045 000048133 8564_ $$s966412$$uhttps://zaguan.unizar.es/record/48133/files/texto_completo.pdf$$yVersión publicada 000048133 8564_ $$s135740$$uhttps://zaguan.unizar.es/record/48133/files/texto_completo.jpg?subformat=icon$$xicon$$yVersión publicada 000048133 909CO $$ooai:zaguan.unizar.es:48133$$particulos$$pdriver 000048133 951__ $$a2021-01-21-11:09:22 000048133 980__ $$aARTICLE