Topological quantum phase transition in a mixed-spin Heisenberg tetramer chain with alternating spin-1/2 and spin-5/2 dimers

“…It has been evidenced that the correlation length follows close to the quantum critical points of a power-law dependence with the critical exponent ν = 2/3 when assuming the appropriate logarithmic correction. This critical behavior is the same as a gap-closing topological phase transition found in the antiferromagnetic spin-1/2 Heisenberg bond alternating chain [13], the 2D Ashkin-Teller model at its bifurcation point [15], as well as, other mixed spin-(1/2, 1/2, S, S) Heisenberg tetramer chains with a single topological phase transition [25,26], whereby all aforementioned topological phase transitions belong to the SU(2) Wess-Zumino-Witten universality class. This feature signals a possible universality of zero-field gap-closing phase transitions of the quantum Heisenberg spin chains, irrespective of spin sizes and topology of the involved quantum phases.…”

“…For S 1 = 1/2 the model presents a single zerofield transition between a topologically trivial state without unpaired edge spins and a topologically non-trivial state with unpaired edge spins at a special value of the interaction ratio [13]. This transition belongs to the SU(2) Wess-Zumino-Witten universality class also governing the critical behavior of the 2D Ashkin-Teller model at the bifurcation point [24][25][26]. In the Heisenberg tetramer chains with S 2 > S 1 > 1/2 multiple topological phase transitions have been reported [27][28][29].…”

Ground-state phase diagram and universality of sequential topological valence-bond-solid quantum transitions in a mixed tetramer chain

“…It has been evidenced that the correlation length follows close to the quantum critical points of a power-law dependence with the critical exponent ν = 2/3 when assuming the appropriate logarithmic correction. This critical behavior is the same as a gap-closing topological phase transition found in the antiferromagnetic spin-1/2 Heisenberg bond alternating chain [13], the 2D Ashkin-Teller model at its bifurcation point [15], as well as, other mixed spin-(1/2, 1/2, S, S) Heisenberg tetramer chains with a single topological phase transition [25,26], whereby all aforementioned topological phase transitions belong to the SU(2) Wess-Zumino-Witten universality class. This feature signals a possible universality of zero-field gap-closing phase transitions of the quantum Heisenberg spin chains, irrespective of spin sizes and topology of the involved quantum phases.…”

“…For S 1 = 1/2 the model presents a single zerofield transition between a topologically trivial state without unpaired edge spins and a topologically non-trivial state with unpaired edge spins at a special value of the interaction ratio [13]. This transition belongs to the SU(2) Wess-Zumino-Witten universality class also governing the critical behavior of the 2D Ashkin-Teller model at the bifurcation point [24][25][26]. In the Heisenberg tetramer chains with S 2 > S 1 > 1/2 multiple topological phase transitions have been reported [27][28][29].…”

Ground-state phase diagram and universality of sequential topological valence-bond-solid quantum transitions in a mixed tetramer chain

“…On a lattice, a dimer joins two neighbouring sites satisfying a hard imposed constraint that every site belongs to only one dimer [54]. Quantum dimer models allowed the study of a variety of physical phenomena [55][56][57][58], and it was found that they could be potentially simulated using cold atoms [59]. Quantum dimers have also potential applications in quantum computation, where it was found that they can be used to implement topologically stable qubits using quantum Josephson junction arrays [60].…”

Quantum correlations and coherence in a mixed spin- (12,1) Heisenberg dimer under intrinsic decoherence

Existence of two distinct valence bond solid states in the dimerized frustrated ferromagnetic J1−J1′−J2 chain