1. Algaba A., Freire E., Gamero E., "Hypernormal Forms for Equilibria of Vector Fields, Codimension One Linear Degeneracies", Rocky Mountain J. Math, 29(1999) 13-45. 2. Baider A., Churchill R. C., "Unique normal forms for planar vector fields", Math. Z. 199(1988) 303-310. 3. Chow S. N., Li C., Wang D.," Normal Forms and Bifurcation of Planar Vector Fields, Cambridge University Press, Cambridge. UK (1994). 4. Gazor M., Mokhtari F., "Volume-Preaserving normal forms of Hopf-Zero singularity", Nonlinearity, 26(2013) 2809-2832. 5. Gazor M., Yu P., "Spectral Sequences and Parametric normal forms", J. Differential Equations, 252(2012) 1003-1031. 6. Gazor M., Yu P., "Formal decomposition method and parametric normal forms", Internat. J. Bifur, Chaos, 20(2010) 3487-3515. 7. Gazor M., Yu P., "Infinite order parametric normal form of Hopf Singularity", Int. J.Bifurcation chaos, 11(2008) 18-45. 8. Gazor M., Sadri N., "Bifurcation control and universal unfolding for Hopf-zero singularities with leading solenoidal terms," SIAM J. Applied Dynamical Systems 15 (2016) 870-903. 9. Golubistsky M., Langford W. F., "Classification and unfolings of degenerate Hopf bifurcation", J. Differential Equations, 41(1981) 375-415. 10. Golubitsky M., Stewart I., Schaeffer D. G., "Singularities and Groups in Bifurcation Theory", Vol I and II, Springer, New York (1985 and 1988). 11. Govaerts W., KhoshsiarGhaziani R., Kuznetsov Y., Meijer H., "Numerical methods for two-parameter local bifurcation analysis of maps", SIAM Journal on Scientific Computing, 29(2007) 2644-2667. 12. Hamzi B., KangW., Barbot J. P., "Analysis and control of Hopf bifurcations", SIAM J. Control and Optimization, 42(2004) 2200-2220. 13. Murdock J., "Hypernormal form theory: foundations and algorithms", J. Differential Equations, 205(2004) 424-465. 14. Murdock J., "Normal Forms and Unfoldings for Local Dynamical Systems", Springer-Verlag, New York (2003). 15. Nafeh A. H., "The method of normal forms", John-Wiley (2011). 16. Sadri N., "Computation of the Normal form and its Applications in Dynamics Analysis of an HIV model", Master Thesis, Isfahan University of Technology, September (2014). 17. Yu P., "Closed-Form Condition Of Bifurcation Points For General Differential Equation", International Journal of Bifurcation and Chaos, 4(2005) 1467-1483. 18. YuP., Guanrong C., "The simplest parametrized normal forms ofHopf and generalized Hopf bifurcations", Int. J.Bifurcation chaos, 50(2007) 297-313. 19. Yu P., Leung A. Y. T., "The simplest normal form of Hopf bifurcation", Nonlinearity, 16(2003) 277-300. longitudinal data. Oxford University Press.