A method of summing nonalternating asymptotic series

1. G. Parisi, “The perturbation expansion and the infinite coupling limit,” Phys. Lett. B,69, 329 (1977).

   Google Scholar 

2. J. C. Le Guillou and J. Zinn-Justin, “Critical exponents for the n-vector model in three dimensions from field theory,” Phys. Rev. Lett.,39, 95 (1977).

   Google Scholar 

3. D. V. Shirkov, “Nonanalyticity in coupling constant and troubles of ultraviolet analysis,” Lett. Nuovo Cimento,18, 452 (1977); V. S. Popov, V. L. Eletskii, and A. V. Turbiner, “Higher perturbation orders and summation of series in quantum mechanics and field theory”, Zh. Eksp. Teor. Fiz.,74, 445 (1978).

   Google Scholar 

4. D. I. Kazakov, O. V. Tarasov, and D. V. Shirkov, “Analytic continuation of the results of perturbation theory for the model gϕ⁴ to region g ⪞ 1,” Teor. Mat. Fiz.,38, 15 (1979).

   Google Scholar 

5. V. L. Eletskii and V. S. Popov, “Summation of perturbation theory series by the Padé and Padé-Borel methods,” Yad. Fiz.,28, 1109 (1978).

   Google Scholar 

6. A. A. Vladimirov, D. I. Kazakov, and O. V. Tarasov, “Calculation of the critical indices by the methods of quantum field theory,” Zh. Eksp. Teor. Fiz.,77, 1035 (1979).

   Google Scholar 

7. J. C. Le Guillou and J. Zinn-Justin, “Critical exponents from field theory,” Phys. Rev. B.,21, 3976 (1980).

   Google Scholar 

8. D. I. Kazakov and D. V. Shirkov, “Summation of asymptotic series of quantum perturbation theory,” in: Problems of Quantum Field Theory. Proc. Fifth International Symposium on Nonlocal Field Theories, Alushta-79, R2-12462 [in Russian], JINR, Dubna (1979).

   Google Scholar 

9. G. H. Hardy, Divergent Series, Clarendon Press, Oxford (1949).

   Google Scholar 

10. I. S. Gradshteyn and I. M. Ryzhik, Table of Integrals, Series, and Products, Academic Press, New York (1965), (Russian original published by Fizmatgiz, Moscow (1962).

    Google Scholar 

11. J. S. Langer, “Theory of the condensation point,” Ann. Phys.,41, 108 (1967); G. Parisi, “Physical meaning of large order estimates in perturbation theory,” Preprint LPTENS 77/13 (lectures at the 1977 CARGESE Summer Institute); E. B. Bogomolny, “Calculation of the Green's functions by the coupling constant dispersion relations,” Phys., Lett. B,67, 193 (1977); B. D. Dörfel, D. I. Kazakov, and D. V. Shirkov, “The universality of coupling constant singularity in QFT,” Preprint E2-10720 [in English], JINR, Dubna (1977).

    Google Scholar 

12. W. Y. Crutchfield, “II. A method for Borel summing instanton singularities,” Phys. Rev. D.,19, 2370 (1979).

    Google Scholar 

13. C. A. Truesdell, “On a function which occurs in the theory of the structure of polymers,” Ann. Math.,46, 114 (1945).

    Google Scholar 

14. L. N. Lipatov, “Divergence of the perturbation theory series and the quasiclassical method,” Zh. Eksp. Teor. Fiz.,22, 411 (1977).

    Google Scholar 

15. S. Coleman, “The uses of instantons,” Lectures Given at the Ettore Majorana International School of Subnuclear Physics, Erice (1977).

16. S. Sciuto, “Topics on instantons,” Lectures Given at CERN, April–May (1977).

17. E. Brezin, G. Parisi, and J. Zinn-Justin, “Perturbation theory at large orders for a potential with degenerate minima,” Phys. Rev. D.,16, 408 (1977).

    Google Scholar 

18. F. T. Hioe, D. MacMillen, and F. W. Montroll, “Quantum theory of anharmonic oscillators,” Phys. Rep.,43C, 305 (1978).

    Google Scholar 

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