Hypergeometric functions in model of General equilibrium of multisector economy with monopolistic competition

Goncharenko V.M., Shapoval A.B.
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List of references:

  1. Д. А. Изотов. Эмпирические модели общего экономического равновесия // Пространственная Экономика. — 2014. — № 3. — С. 138–167.
    • D. A. Izotov. Empirical models of the general economical equilibrium // Spatial economics. — 2014. — V. 3. — P. 138–167. — in Russian. — DOI: 10.14530/se.2014.3.138-167.
  2. В. Л. Макаров, А. Р. Бахтизин, С. С. Сулакшин. Применение вычислимых моделей в государственном управлении. — Научный эксперт, 2007. — С. 1— 304.
    • V. L. Makarov, A. R. Bakhtizin, S. S. Sulakshin. The application of computable models in public administration // Scientific expert. — 2007. — P. 1–304. — in Russian.
  3. M. K. Abadir. An Introduction to Hypergeometric Functions for Economists // Econometric Reviews. — 1999. — V. 18. — P. 287–330. — DOI: 10.1080/07474939908800447. — MathSciNet: MR1705922. — zbMATH: Zbl 1073.91526.
  4. C. Albanese, G. Campolieti, P. Carr, A. Lipton. Black-Scholes Goes Hypergeometric // Risk. — 2001. — V. 14. — P. 99–103.
  5. K. Behrens, Y. Murata. Trade, competition, and efficiency // Journal of International Economics. — 2012. — V. 87. — P. 1–17. — DOI: 10.1016/j.jinteco.2011.11.005.
  6. P. Bertoletti, F. Etro. Monopolistic Competition: A Dual Approach with an Application to Trade. — 2013. — https://ideas.repec.org/p/ven/wpaper/201309.html.
  7. J. G. Brida, E. J. L. Maldonado. Closed form solutions to a generalization of the Solow growth model / GE, Growth, Math methods 0510003, EconWPA. — 2005. — http://ideas.repec.org/p/wpa/wuwpge/0510003.html.
  8. R. Boucekkine, J. R. Ruiz-Tamarit. Special functions for the study of economic dynamics: The case of the Lucas-Uzawa model // Journal of Mathematical Economics. — 2008. — V. 44. — P. 33–54. — DOI: 10.1016/j.jmateco.2007.05.001. — MathSciNet: MR2376435. — zbMATH: Zbl 1141.91604.
  9. K. Dixit, E. Stiglitz. Monopolistic Competition and Optimum Product Diversity // The American Economic Review. — 1977. — V. 67. — P. 297–308.
  10. M. Mrazova, J. P. Neary, M. Parenti. Sales and Markup dispersion: theory and empirics. — 2017. — http://users.ox.ac.uk/~econ0211/papers/pdf/MNP_SizeDist.pdf.
  11. G. I. Ottaviano, T. Tabuchi, J.-F. Thisse. Agglomeration and Trade Revisited // International Economic Review. — 2002. — V. 43. — P. 409–436. — DOI: 10.1111/1468-2354.t01-1-00021. — MathSciNet: MR1907939.
  12. T. Pham-Gia, D. N. Thanh. Hypergeometric Functions: From One Scalar Variable to Several Matrix Arguments, in Statistics and Beyond // Open Journal of Statistics. — 2016. — V. 6. — P. 951–994. — DOI: 10.4236/ojs.2016.65078.
  13. A. B. Shapoval, V. M. Goncharenko. A Response of the Economy to Changes in Employment Structure / Working paper EERC No. E 16/09. — 2016. — http://eercnetwork.com/paperinfo/371.
  14. L. A. Stole, J. Zwiebel. Organizational design and technology choice under intrafirm bargaining / The American Economic Review. — 1996. — P. 195–222.
  15. E. T. Whittaker, G. N. Watson. A Course in Modern Analysis / Cambridge University Press. — 1990. — MathSciNet: MR1424469.
  16. E. Zhelobodko, S. Kokovin, M. Parenti, J.-F. Thisse. Monopolistic Competition: Beyond the Constant Elasticity of Substitution // Econometrica. — 2012. — V. 80. — P. 2765–2784. — DOI: 10.3982/ECTA9986. — MathSciNet: MR3001140. — zbMATH: Zbl 1274.91301.

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