[25] Phase transitions in frustrated vector spin systems: numerical studies (Review) | |
[26] Canonical local algorithms for spin systems: Heat Bath and Hasting's methods |
[28] Microcanonical Simulation on the First Order Phase Transition of the XY Antiferromagnet on the Stacked Triangular Lattice
K. Kanki, D. Loison, and K.D. Schotte,
JSPS 75 (2006) 015001
[27] Efficiency of the microcanonical over-relaxation algorithm for vector spins analyzing first and second order transitions
K. Kanki, D. Loison, and K.D. Schotte,
Euro. Phys. J. B 44 (2005) 309
[26] Canonical local algorithms for spin systems: Heat Bath and Hasting's methods
D. Loison, C. Qin, K.D. Schotte, X.F. Jin,
Euro. Phys. J. B 41 (2004) 395
[25] Phase transitions in frustrated vector spin systems: numerical studies (Review)
D. Loison,
in Frustrated Spin Systems, Ed. by H.T. Diep, World Scientific, second edition, 2005
[24] Fast Linear Algorithm for generating random SU(2) variables
D. Loison,
Not yet published
[23] Magnetic structure of Co1-xMnx alloys
Wu D, Liu GL, Jing C, Wu YZ, Loison D, Dong GS, Jin XF, Wang DS,
Phys. Rev. B 63 (2001): 214403
[22] Growth and structure of Cr thin film on GaAs(001)
D. Quian, G.L. Liu, D. Loison, G.S. Dong, and X.F. Jin,
J Cryst. growth 218 (2000) 197
[21] Monte Carlo Simulation of a Ising Model on a Sierpinski Carpet
G. Prussner, D. Loison and K.D. Schotte,
Phys. Rev. B 64 (2001) 134414
[20] "Quasi Universality classes" in 2D frustrated XY spin systems
D. Loison,
submitted to Phys. Rev. B
[19] Frustration in two dimensions: phase transition for a Potts-XY model
D. Loison,
submitted to Euro. J. Phys. B
[18] A Monte Carlo analysis of the 2D, J_1-J_2 XY model
D. Loison and P. Simon,
Phys. Rev. B 61 (2000) 6114
[17] A new approach to critical exponent in phase-transitions of spin-systems
G. Prussner, D. Loison and K.D. Schotte,
Physica A 289 (2001) 557
[16] Binder's cumulant for the Kosterlitz-Thouless transition
D. Loison ,
J. of Phys. C: Cond. Matter, 11 (1999) L401
[15] Critical behavior of frustrated systems:
Monte Carlo simulations versus Renormalization Group
D. Loison, A.I. Sokolov, B. Delamotte, S.A. Antonenko,
K.D. Schotte and H.T. Diep,
JETP Letters 76 (2000) 337.
[14] Phase transitions in generalized chiral or Stiefel's
models
D. Loison ,
Euro. J. Phys. B. 15 (2000) 517
[13] Phase transition in non-collinear ordering without frustration
D. Loison ,
Phys. Lett. A 264 (1999) 208
[12] Monte-Carlo cluster algorithm for ferromagnetic Hamiltonians
H=J\sum_{(ij)}(S_{i}.S_{j})^3
D. Loison ,
Phys. Lett. A 257 (1999) 83
[11] First order transition in helimagnetic systems with
Heisenberg spins
D. Loison ,
Physica A 275, 207 (1999).
[10] First and second order transition in frustrated Heisenberg
systems
D. Loison and K.D. Schotte,
Euro. J. Phys. B. 14 (2000) 125
[9] First and second order transition in frustrated XY systems
D. Loison and K.D. Schotte,
Euro. Phys. J. B 5 (1998) 735.
[8] A Monte-Carlo study for the critical exponents of the
three-dimensional O(6) model
D. Loison,
Physica A 271 (1999)157
[7] Phase diagram in antiferromagnetic stacked triangular lattices
with XY spins.
E.H. Boubcheur, D. Loison and H. T. Diep,
Phys. Rev. B 54 (1996) 4165
[6] Anisotropic Antiferromagnetic XY-model of classical
Heisenberg spins on triangular lattice
T. Horiguchi, D. Loison, H. T. Diep, and O. Nagai,
Physica A 206 (1994)508-520.
[5] Phase transition in systems of interacting triads
H. T. Diep and D. Loison,
J. Appl. Phys. 76 (1994) 6350-6352
[4] Antiferromagnetic stacked triangular lattices with
Heisenberg spins : phase transition and effect of nearest-neighbor
interaction
D. Loison and H. T. Diep,
Phys. Rev. B 50 (1994) 16453-16458
[3] First order transition in antiferromagnetic stacked
triangular lattices with vector spins
D. Loison and H. T. Diep,
J. Appl. Phys. 73 (1993) 5642-5644
[2] Elementary excitations and magnetic properties of Heisenberg
stacked antiferromagnetic triangular thin film
D. Loison and H. T. Diep,
J. Mag. Mag. Mater. 104-107 (1992)1689-1690.
[1] Low temperature quantum behavior of antiferromagnetic simple
cubic thin films
D. Loison and H. T. Diep,
Phys. Lett. A 162 (1992) 405-408.