Low-field susceptibility of classical Heisenberg chains with arbitrary and different nearest-neighbour exchange
2008 (English)In: Journal of Physics: Condensed Matter, ISSN 0953-8984, E-ISSN 1361-648X, Vol. 20, no 20, 2041204119- p.Article in journal (Refereed) Published
Interest in molecular magnets continues to grow, offering a link between the atomic and nanoscale properties. The classical Heisenberg model has been effective in modelling exchange interactions in such systems. In this, the magnetization and susceptibility are calculated through the partition function, where the Hamiltonian contains both Zeeman and exchange energy. For an ensemble of N spins, this requires integrals in 2N dimensions. For two, three and four spin nearest-neighbour chains these integrals reduce to sums of known functions. For the case of the three and four spin chains, the sums are equivalent to results of Joyce. Expanding these sums, the effect of the exchange on the linear susceptibility appears as Langevin functions with exchange term arguments. These expressions are generalized here to describe an N spin nearest-neighbour chain, where the exchange between each pair of nearest neighbours is different and arbitrary. For a common exchange constant, this reduces to the result of Fisher. The high-temperature expansion of the Langevin functions for the different exchange constants leads to agreement with the appropriate high-temperature quantum formula of Schmidt et al, when the spin number is large. Simulations are presented for open linear chains of three, four and five spins with up to four different exchange constants, illustrating how the exchange constants can be retrieved successfully.
Place, publisher, year, edition, pages
2008. Vol. 20, no 20, 2041204119- p.
Engineering and Technology
IdentifiersURN: urn:nbn:se:uu:diva-125222DOI: 10.1088/0953-8984/20/20/204119ISI: 000255661500021OAI: oai:DiVA.org:uu-125222DiVA: diva2:318891
Conference Information: 11th International Conference on Magnetic Fluids Kosice, SLOVAKIA, JUL 23-27, 20072010-05-112010-05-112016-04-12Bibliographically approved