TY - JOUR
T1 - Numerical Investigations of the Thermal, Pressure and Size Effects on 2D Spin Crossover Nanoparticles
AU - Harlé, C.
AU - Allal, S. E.
AU - Sohier, D.
AU - Dufaud, T.
AU - Caballero, R.
AU - De Zela, F.
AU - Dahoo, P. R.
AU - Boukheddaden, K.
AU - Linares, J.
N1 - Publisher Copyright:
© Published under licence by IOP Publishing Ltd.
PY - 2017/12/1
Y1 - 2017/12/1
N2 - In the framework of the Ising-like model, the thermal and pressure effects on the spin crossover systems are evaluated through two-states fictitious spin operators σ with eigenvalues = -1 and = +1 respectively associated with the low-spin (LS) and highspin (HS) states of each spin-crossover (SCO) molecule. Based on each configurational state, the macroscopic SCO system, is described by the following variables: m=Σ σi, s=Σ σi σj and c=Σ σk standing respectively for the total magnetization, the short-range correlations and surface magnetization. To solve this problem, we first determine the density of macrostates d[m][s][c], giving the number of microscopic configurations with the same m, s and c values. In this contribution, two different ways have been performed to calculate this important quantity: (i) the entropic sampling method, based on Monte Carlo simulations and (ii) a new algorithm based on specific dynamic programming. These two methods were tested on the 2D SCO nanoparticles for which, we calculated the average magnetization < σ> taking into account for short-, long-range interactions as well as for the interaction between surface molecules with their surrounding matrix. We monitored the effect of the pressure, temperature and size on the properties of the SCO nanoparticles.
AB - In the framework of the Ising-like model, the thermal and pressure effects on the spin crossover systems are evaluated through two-states fictitious spin operators σ with eigenvalues = -1 and = +1 respectively associated with the low-spin (LS) and highspin (HS) states of each spin-crossover (SCO) molecule. Based on each configurational state, the macroscopic SCO system, is described by the following variables: m=Σ σi, s=Σ σi σj and c=Σ σk standing respectively for the total magnetization, the short-range correlations and surface magnetization. To solve this problem, we first determine the density of macrostates d[m][s][c], giving the number of microscopic configurations with the same m, s and c values. In this contribution, two different ways have been performed to calculate this important quantity: (i) the entropic sampling method, based on Monte Carlo simulations and (ii) a new algorithm based on specific dynamic programming. These two methods were tested on the 2D SCO nanoparticles for which, we calculated the average magnetization < σ> taking into account for short-, long-range interactions as well as for the interaction between surface molecules with their surrounding matrix. We monitored the effect of the pressure, temperature and size on the properties of the SCO nanoparticles.
UR - http://www.scopus.com/inward/record.url?scp=85041178895&partnerID=8YFLogxK
U2 - 10.1088/1742-6596/936/1/012061
DO - 10.1088/1742-6596/936/1/012061
M3 - Conference article
AN - SCOPUS:85041178895
SN - 1742-6588
VL - 936
JO - Journal of Physics: Conference Series
JF - Journal of Physics: Conference Series
IS - 1
M1 - 012061
T2 - 6th International Conference on Mathematical Modelling in Physical Sciences, IC-MSQUARE 2017
Y2 - 28 August 2017 through 31 August 2017
ER -