References
- Bremner, M., Madariaga, S. (2014). Jordan quadruple systems. J. Algebra 412:51–86.
- Elgendy, H. (2017). The Peirce decomposition for Jordan quadruple systems. Commun. Algebra (DOI: 10.1080/00927872.2017.135707.).
- Kantor, I., Sirota, A., Solodovnikov, A. (1967). A class of symmetric spaces with extendible group of motions and a generalization of the Poincare model. Dokl. Akad. Naun SSSR 173(3), Soviet Math. Dokl. 8:423–426 .
- Koeher, K. (1968). Embedding of Jordan algebras into Lie algebras II. Amer. J. Math. 90:476–510.
- Loos, O. (1971) Lectures on Jordan Triples. Vancouver: The Unviversity of British Columbia.
- Loos, O. (1977) Bounded Symmetric Domains and Jordan Pairs. Lecture Notes, Irvine: University of California.
- McCrimmon, K. (1982). Compatible Peirce decompositions of Jordan triple systems. Pacific J. Math. 103:57–102.
- Meyberg, K. (1972). Lectures on Algebras and Triple Systems. Charlottesville: Lecture Notes, Universiiy of Virginia.
- Neher, E. (1987). Jordan triple systems by the grid approach. In Lecture Notes in Mathematics. Vol. 1280. Berlin/Heidelberg/New York: Springer-Verlag.
- Schafer, R. (1966). An Introduction to Non-associative Algebras. New York: Academic Press.