Multiple frustration-induced plateaus in a magnetization process of the mixed spin-1/2 and spin-3/2 Ising-Heisenberg diamond chain

@inproceedings{Streka2009MultipleFP,
  title={Multiple frustration-induced plateaus in a magnetization process of the mixed spin-1/2 and spin-3/2 Ising-Heisenberg diamond chain},
  author={Jozef Stre{\vc}ka and Lucia {\vC}anov{\'a} and Tom{\'a}{\vs} Lu{\vc}ivjansk{\'y} and Michal Ja{\vs}{\vc}ur},
  year={2009}
}
Magnetization process of the mixed spin-1/2 and spin-3/2 Ising-Heisenberg diamond chain is examined by combining three exact analytical techniques: Kambe projection method, decoration-iteration transformation and transfer-matrix method. Multiple frustration-induced plateaus in a magnetization process of this geometrically frustrated system are found provided that a relative ratio between the antiferromagnetic Heisenberg- and Ising-type interactions exceeds some particular value. By contrast… 

Figures from this paper

Reentrant phenomenon in the exactly solvable mixed spin‐1/2 and spin‐1 Ising–Heisenberg model on diamond‐like decorated planar lattices
Ground‐state and finite‐temperature behaviour of the mixed spin‐1/2 and spin‐1 Ising–Heisenberg model on decorated planar lattices consisting of inter‐connected diamonds is investigated by means of
Phase diagrams of the Ising-Heisenberg chain with S = 1/2 triangular XXZ clusters
The one-dimensional spin system consisted of triangular S = 1/2 XXZ Heisenberg clusters alternating with single Ising spins is considered. Partition function of the system is calculated exactly
Exactly solvable Ising-Heisenberg chain with triangular XXZ -Heisenberg plaquettes
A mixed Ising-Heisenberg spin system consisting of triangular XXZ-Heisenberg spin clusters assembled into a chain by alternating with Ising spins interacting to all three spins in the triangle is
Optimal dense coding and quantum phase transition in Ising-XXZ diamond chain
Direct algebraic mapping transformation for decorated spin models
In this article we propose a general transformation for decorated spin models. The advantage of this transformation is to perform a direct mapping of a decorated spin model onto another effective

References

SHOWING 1-10 OF 16 REFERENCES
Geometric frustration in the class of exactly solvable Ising–Heisenberg diamond chains
Ground-state and finite-temperature properties of the mixed spin- and spin-S Ising–Heisenberg diamond chains are examined within an exact analytical approach based on the generalized
Experimental observation of the 1/3 magnetization plateau in the diamond-chain compound Cu3(CO3)2(OH)2.
The magnetic susceptibility, high field magnetization, and specific heat measurements of Cu3(CO3)2(OH)2, which is a model substance for the frustrating diamond spin chain model, have been performed
Ground states with cluster structures in a frustrated Heisenberg chain
We examine the ground state of a Heisenberg model with arbitrary spin S on a one-dimensional lattice composed of diamond-shaped units. A unit includes two types of antiferromagnetic exchange
Antiferromagnetic Order in Bi4Cu3V2O14 with Novel Spin Chain
The magnetic susceptibility, the magnetization process, the specific heat and the 51 V NMR have been investigated on the powder sample of Bi 4 Cu 3 V 2 O 14 , which has a characteristic chain
Magnetic Properties of Cu3(TeO3)2Br2 with Spin 1/2 Diamond Lattice
Magnetic studies have been carried out on Cu 3 (TeO 3 ) 2 Br 2 with diamond lattice of spin 1/2 Cu 2+ ions. By using the high temperature expansion of the magnetic susceptibility, the exchange coup...
Magnetization Plateaus in Spin Chains: “Haldane Gap” for Half-Integer Spins
We discuss zero-temperature quantum spin chains in a uniform magnetic field, with axial symmetry. For integer or half-integer spin, $S$, the magnetization curve can have plateaus and we argue that
Exactly solved models in statistical mechanics
exactly solved models in statistical mechanics exactly solved models in statistical mechanics rodney j baxter exactly solved models in statistical mechanics exactly solved models in statistical
J. Phys. Soc. Jpn. J. Phys.: Condens. Matter
  • J. Phys. Soc. Jpn. J. Phys.: Condens. Matter
  • 2006
Phys. Rev. Lett
  • Phys. Rev. Lett
  • 2005
J. Phys. Soc. Jpn
  • J. Phys. Soc. Jpn
  • 2002
...
1
2
...