Ising model with magnetic field and the diophantine moment problem

1. C. N. Yang and T. D. Lee, “Statistical theory of equations of state and phase transitions,” Phys. Rev.,87, 404 (1952).

   Google Scholar 

2. R. Abe, “Note on the critical behavior of Ising ferromagnets,” Prog. Theor. Phys.,38, 72 (1967).

   Google Scholar 

3. M. Suzuki, “A theory of the second order phase transitions in spin systems. II. Complex magnetic field,” Prog. Theor. Phys.,38, 1225 (1967).

   Google Scholar 

4. M. Barnsley, D. Bessis, and P. Moussa, “The Diophantine moment problem and the analytic structure in the activity of the ferromagnetic Ising model,” J. Math. Phys.,20, 535 (1979).

   Google Scholar 

5. V. S. Vladimirov, “The Diophantine moment problem and the Ising model,” Dokl. Akad. Nauk SSSR,264, 1301 (1982).

   Google Scholar 

6. H. Helson, “Note on harmonic functions,” Proc. Am. Math. Soc.,4, 686 (1953).

   Google Scholar 

7. R. H. Nevanlinna, Eidentige analytische Funktusen, Berlin (1936).

8. R. B. Griffiths, “Correlations in Ising ferromagnets,” J. Math. Phys.,8, 478 (1967).

   Google Scholar 

9. K. R. Ito, “Remarks on the relation between the Lee-Yang circle theorem and the correlation inequalities,” Commun. Math. Phys.,47, 143 (1976).

   Google Scholar 

10. C. N. Yang, “The spontaneous magnetization of a two-dimensional Ising model,” Phys. Rev.,85, 808 (1952).

    Google Scholar 

11. N. N. Bogolyubov, “Quasi-averages in problems of statistical mechanics,” in: Selected Works, Vol. 3 [in Russian], Naukova Dumka, Kiev (1970).

    Google Scholar 

12. L. H. Loomis, “The converse of the Fatou theorem for positive harmonic functions,” Trans. Am. Math. Soc.,53, 239 (1943).

    Google Scholar 

13. W. Rudin, Function Theory in Polydiscs, New York (1969).

14. V. S. Vladimirov, Generalized Functions in Mathematical Physics [in Russian], Nauka, Moscow (1979).

    Google Scholar 

15. U. Grenander and G. Szegö, Toeplitz Forms and their Applications, Berkeley (1958).

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