Phase transitions in the two-dimensional anisotropic biquadratic Heisenberg model
| Autor(a) principal: | |
|---|---|
| Data de Publicação: | 2014 |
| Outros Autores: | , |
| Tipo de documento: | Artigo |
| Idioma: | eng |
| Título da fonte: | LOCUS Repositório Institucional da UFV |
| Texto Completo: | https://doi.org/10.1016/j.jmmm.2014.01.006 http://www.locus.ufv.br/handle/123456789/23187 |
Resumo: | In this paper we study the influence of the single-ion anisotropy in the two-dimensional biquadratic Heisenberg model (ABHM) on the square lattice at zero and finite low temperatures. It is common to represent the bilinear and biquadratic terms by J 1 1⁄4 J cos θ and J 2 1⁄4 J sin θ , respectively, and the many phases present in the model as a function of θ are well documented. However we have adopted a constant value for the bilinear constant (J 1 1⁄4 1) and small values of the biquadratic term (jJ 2 j o J 1 ). Specially, we have analyzed the quantum phase transition due to the single-ion anisotropic constant D. For values below a critical anisotropic constant D c the energy spectrum is gapless and at low finite temperatures the order parameter correlation has an algebraic decay (quasi-long-range order). Moreover, in D o D c phase there is a transition temperature where the quasi-long-range order (algebraic decay) is lost and the decay becomes exponential, similar to the Berezinski–Kosterlitz–Thouless (BKT) transition. For D 4 D c , the excited states are gapped and there is no spin long-range order (LRO) even at zero temperature. Using Schwinger bosonic representation and Self-Consistent Harmonic Approximation (SCHA), we have studied the quantum and thermal phase transitions as a function of the bilinear and biquadratic constants. |
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Pereira, A. R.Pires, A. S. T.Moura, A. R.2019-01-25T12:17:59Z2019-01-25T12:17:59Z2014-050304-8853https://doi.org/10.1016/j.jmmm.2014.01.006http://www.locus.ufv.br/handle/123456789/23187In this paper we study the influence of the single-ion anisotropy in the two-dimensional biquadratic Heisenberg model (ABHM) on the square lattice at zero and finite low temperatures. It is common to represent the bilinear and biquadratic terms by J 1 1⁄4 J cos θ and J 2 1⁄4 J sin θ , respectively, and the many phases present in the model as a function of θ are well documented. However we have adopted a constant value for the bilinear constant (J 1 1⁄4 1) and small values of the biquadratic term (jJ 2 j o J 1 ). Specially, we have analyzed the quantum phase transition due to the single-ion anisotropic constant D. For values below a critical anisotropic constant D c the energy spectrum is gapless and at low finite temperatures the order parameter correlation has an algebraic decay (quasi-long-range order). Moreover, in D o D c phase there is a transition temperature where the quasi-long-range order (algebraic decay) is lost and the decay becomes exponential, similar to the Berezinski–Kosterlitz–Thouless (BKT) transition. For D 4 D c , the excited states are gapped and there is no spin long-range order (LRO) even at zero temperature. Using Schwinger bosonic representation and Self-Consistent Harmonic Approximation (SCHA), we have studied the quantum and thermal phase transitions as a function of the bilinear and biquadratic constants.engJournal of Magnetism and Magnetic MaterialsVolume 357, Pages 45- 52, May 20142014 Elsevier B.V. All rights reserved.info:eu-repo/semantics/openAccessAnisotropic Biquadratic Heisenberg ModelPhase transitionSchwinger bosonSCHAPhase transitions in the two-dimensional anisotropic biquadratic Heisenberg modelinfo:eu-repo/semantics/publishedVersioninfo:eu-repo/semantics/articleapplication/pdfreponame:LOCUS Repositório Institucional da UFVinstname:Universidade Federal de Viçosa (UFV)instacron:UFVORIGINALartigo.pdfartigo.pdfTexto completoapplication/pdf592200https://locus.ufv.br//bitstream/123456789/23187/1/artigo.pdf8abeef38fa8674d00c13702108989359MD51LICENSElicense.txtlicense.txttext/plain; charset=utf-81748https://locus.ufv.br//bitstream/123456789/23187/2/license.txt8a4605be74aa9ea9d79846c1fba20a33MD52123456789/231872019-01-25 09:43:56.462oai:locus.ufv.br:123456789/23187Tk9URTogUExBQ0UgWU9VUiBPV04gTElDRU5TRSBIRVJFClRoaXMgc2FtcGxlIGxpY2Vuc2UgaXMgcHJvdmlkZWQgZm9yIGluZm9ybWF0aW9uYWwgcHVycG9zZXMgb25seS4KCk5PTi1FWENMVVNJVkUgRElTVFJJQlVUSU9OIExJQ0VOU0UKCkJ5IHNpZ25pbmcgYW5kIHN1Ym1pdHRpbmcgdGhpcyBsaWNlbnNlLCB5b3UgKHRoZSBhdXRob3Iocykgb3IgY29weXJpZ2h0Cm93bmVyKSBncmFudHMgdG8gRFNwYWNlIFVuaXZlcnNpdHkgKERTVSkgdGhlIG5vbi1leGNsdXNpdmUgcmlnaHQgdG8gcmVwcm9kdWNlLAp0cmFuc2xhdGUgKGFzIGRlZmluZWQgYmVsb3cpLCBhbmQvb3IgZGlzdHJpYnV0ZSB5b3VyIHN1Ym1pc3Npb24gKGluY2x1ZGluZwp0aGUgYWJzdHJhY3QpIHdvcmxkd2lkZSBpbiBwcmludCBhbmQgZWxlY3Ryb25pYyBmb3JtYXQgYW5kIGluIGFueSBtZWRpdW0sCmluY2x1ZGluZyBidXQgbm90IGxpbWl0ZWQgdG8gYXVkaW8gb3IgdmlkZW8uCgpZb3UgYWdyZWUgdGhhdCBEU1UgbWF5LCB3aXRob3V0IGNoYW5naW5nIHRoZSBjb250ZW50LCB0cmFuc2xhdGUgdGhlCnN1Ym1pc3Npb24gdG8gYW55IG1lZGl1bSBvciBmb3JtYXQgZm9yIHRoZSBwdXJwb3NlIG9mIHByZXNlcnZhdGlvbi4KCllvdSBhbHNvIGFncmVlIHRoYXQgRFNVIG1heSBrZWVwIG1vcmUgdGhhbiBvbmUgY29weSBvZiB0aGlzIHN1Ym1pc3Npb24gZm9yCnB1cnBvc2VzIG9mIHNlY3VyaXR5LCBiYWNrLXVwIGFuZCBwcmVzZXJ2YXRpb24uCgpZb3UgcmVwcmVzZW50IHRoYXQgdGhlIHN1Ym1pc3Npb24gaXMgeW91ciBvcmlnaW5hbCB3b3JrLCBhbmQgdGhhdCB5b3UgaGF2ZQp0aGUgcmlnaHQgdG8gZ3JhbnQgdGhlIHJpZ2h0cyBjb250YWluZWQgaW4gdGhpcyBsaWNlbnNlLiBZb3UgYWxzbyByZXByZXNlbnQKdGhhdCB5b3VyIHN1Ym1pc3Npb24gZG9lcyBub3QsIHRvIHRoZSBiZXN0IG9mIHlvdXIga25vd2xlZGdlLCBpbmZyaW5nZSB1cG9uCmFueW9uZSdzIGNvcHlyaWdodC4KCklmIHRoZSBzdWJtaXNzaW9uIGNvbnRhaW5zIG1hdGVyaWFsIGZvciB3aGljaCB5b3UgZG8gbm90IGhvbGQgY29weXJpZ2h0LAp5b3UgcmVwcmVzZW50IHRoYXQgeW91IGhhdmUgb2J0YWluZWQgdGhlIHVucmVzdHJpY3RlZCBwZXJtaXNzaW9uIG9mIHRoZQpjb3B5cmlnaHQgb3duZXIgdG8gZ3JhbnQgRFNVIHRoZSByaWdodHMgcmVxdWlyZWQgYnkgdGhpcyBsaWNlbnNlLCBhbmQgdGhhdApzdWNoIHRoaXJkLXBhcnR5IG93bmVkIG1hdGVyaWFsIGlzIGNsZWFybHkgaWRlbnRpZmllZCBhbmQgYWNrbm93bGVkZ2VkCndpdGhpbiB0aGUgdGV4dCBvciBjb250ZW50IG9mIHRoZSBzdWJtaXNzaW9uLgoKSUYgVEhFIFNVQk1JU1NJT04gSVMgQkFTRUQgVVBPTiBXT1JLIFRIQVQgSEFTIEJFRU4gU1BPTlNPUkVEIE9SIFNVUFBPUlRFRApCWSBBTiBBR0VOQ1kgT1IgT1JHQU5JWkFUSU9OIE9USEVSIFRIQU4gRFNVLCBZT1UgUkVQUkVTRU5UIFRIQVQgWU9VIEhBVkUKRlVMRklMTEVEIEFOWSBSSUdIVCBPRiBSRVZJRVcgT1IgT1RIRVIgT0JMSUdBVElPTlMgUkVRVUlSRUQgQlkgU1VDSApDT05UUkFDVCBPUiBBR1JFRU1FTlQuCgpEU1Ugd2lsbCBjbGVhcmx5IGlkZW50aWZ5IHlvdXIgbmFtZShzKSBhcyB0aGUgYXV0aG9yKHMpIG9yIG93bmVyKHMpIG9mIHRoZQpzdWJtaXNzaW9uLCBhbmQgd2lsbCBub3QgbWFrZSBhbnkgYWx0ZXJhdGlvbiwgb3RoZXIgdGhhbiBhcyBhbGxvd2VkIGJ5IHRoaXMKbGljZW5zZSwgdG8geW91ciBzdWJtaXNzaW9uLgo=Repositório InstitucionalPUBhttps://www.locus.ufv.br/oai/requestfabiojreis@ufv.bropendoar:21452019-01-25T12:43:56LOCUS Repositório Institucional da UFV - Universidade Federal de Viçosa (UFV)false |
| dc.title.en.fl_str_mv |
Phase transitions in the two-dimensional anisotropic biquadratic Heisenberg model |
| title |
Phase transitions in the two-dimensional anisotropic biquadratic Heisenberg model |
| spellingShingle |
Phase transitions in the two-dimensional anisotropic biquadratic Heisenberg model Pereira, A. R. Anisotropic Biquadratic Heisenberg Model Phase transition Schwinger boson SCHA |
| title_short |
Phase transitions in the two-dimensional anisotropic biquadratic Heisenberg model |
| title_full |
Phase transitions in the two-dimensional anisotropic biquadratic Heisenberg model |
| title_fullStr |
Phase transitions in the two-dimensional anisotropic biquadratic Heisenberg model |
| title_full_unstemmed |
Phase transitions in the two-dimensional anisotropic biquadratic Heisenberg model |
| title_sort |
Phase transitions in the two-dimensional anisotropic biquadratic Heisenberg model |
| author |
Pereira, A. R. |
| author_facet |
Pereira, A. R. Pires, A. S. T. Moura, A. R. |
| author_role |
author |
| author2 |
Pires, A. S. T. Moura, A. R. |
| author2_role |
author author |
| dc.contributor.author.fl_str_mv |
Pereira, A. R. Pires, A. S. T. Moura, A. R. |
| dc.subject.pt-BR.fl_str_mv |
Anisotropic Biquadratic Heisenberg Model Phase transition Schwinger boson SCHA |
| topic |
Anisotropic Biquadratic Heisenberg Model Phase transition Schwinger boson SCHA |
| description |
In this paper we study the influence of the single-ion anisotropy in the two-dimensional biquadratic Heisenberg model (ABHM) on the square lattice at zero and finite low temperatures. It is common to represent the bilinear and biquadratic terms by J 1 1⁄4 J cos θ and J 2 1⁄4 J sin θ , respectively, and the many phases present in the model as a function of θ are well documented. However we have adopted a constant value for the bilinear constant (J 1 1⁄4 1) and small values of the biquadratic term (jJ 2 j o J 1 ). Specially, we have analyzed the quantum phase transition due to the single-ion anisotropic constant D. For values below a critical anisotropic constant D c the energy spectrum is gapless and at low finite temperatures the order parameter correlation has an algebraic decay (quasi-long-range order). Moreover, in D o D c phase there is a transition temperature where the quasi-long-range order (algebraic decay) is lost and the decay becomes exponential, similar to the Berezinski–Kosterlitz–Thouless (BKT) transition. For D 4 D c , the excited states are gapped and there is no spin long-range order (LRO) even at zero temperature. Using Schwinger bosonic representation and Self-Consistent Harmonic Approximation (SCHA), we have studied the quantum and thermal phase transitions as a function of the bilinear and biquadratic constants. |
| publishDate |
2014 |
| dc.date.issued.fl_str_mv |
2014-05 |
| dc.date.accessioned.fl_str_mv |
2019-01-25T12:17:59Z |
| dc.date.available.fl_str_mv |
2019-01-25T12:17:59Z |
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info:eu-repo/semantics/publishedVersion |
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info:eu-repo/semantics/article |
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article |
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https://doi.org/10.1016/j.jmmm.2014.01.006 http://www.locus.ufv.br/handle/123456789/23187 |
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0304-8853 |
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0304-8853 |
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https://doi.org/10.1016/j.jmmm.2014.01.006 http://www.locus.ufv.br/handle/123456789/23187 |
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eng |
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eng |
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Volume 357, Pages 45- 52, May 2014 |
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2014 Elsevier B.V. All rights reserved. info:eu-repo/semantics/openAccess |
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2014 Elsevier B.V. All rights reserved. |
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openAccess |
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application/pdf |
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Journal of Magnetism and Magnetic Materials |
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Journal of Magnetism and Magnetic Materials |
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