___

• Andary, P. (1997). Finely homogeneous computations in free Lie algebras. Discrete Math. Theor. Comput. Sci, 1(1), 101–114.
• Aydın, E. (1997). Subalgbras of Lie Algebras of Finite Codimension, PhD Thesis, Çukurova University. Berry, J. (1997). Improving discrete mathematics and algorithms curricula with LINK. ITICSE’ 97 2nd Conference on Integrating Technology into Computer Science Education, 14-20. ACM: New York.
• Bourbaki N. (1975). Lie groups and lie algebras, Part II., Addison-Wesley. Cohen, A. M., & de Graaf, W. A. (1996). Lie algebraic computation. Comput. Phys. Comm. 97(1-2), 53–62.
• Gerdt, V. P., & Kornyak, V. V. (1996). Construction of finitely presented Lie algebras and superalgebras. J. Symbolic Comput, 21(3), 337–349. de Graaf, W. A. (2000).
• Lie Algebras: Theory and Algorithms, North Holland. Goldhaber, D., & Anthony, E. (2003). Indicators of Teacher Quality. Retrieved from ERIC database. (ED478408).
• Hill C., H., Rowon, B., & Ball D., L. (2005). The effects of teachers mathematical knowledge for teaching on student achievement. American Educational Research Journal, 42(2), 371-406.
• Kryazhovskikh, G. V. (1983). Generating and defining relations of subalgebras of Lie algebras. Sibirsk. Mat. Zh. 24(6), 80–86.
• Reutenauer, C. (1983). Free lie algebras, Oxford University Press. Shirshov, A. I. (1953).
• Subalgebras of free Lie algebras. Mat. Sbornik N. S., 33(75), 441–452.
• Shirshov, A. I. (1958). On free lie rings. Mat. Sbornik N. S., 45(87), 113–122.
• Shulman, L., S. (1986). Those who understand knowledge growth in teaching. Educational Researcher, 15(2), 4-14.