Half Moufang implies Moufang for finite generalized quadrangles
- Author
- Joseph Thas (UGent) , S Payne and Hendrik Van Maldeghem (UGent)
- Organization
- Abstract
- A finite generalized quadrangle has two types of panels. If each panel of one type is Moufang, then every panel is Moufang. Hence by a theorem of Fong and Seitz [1] the quadrangle is classical or dual classical.
Citation
Please use this url to cite or link to this publication: http://hdl.handle.net/1854/LU-220910
- MLA
- Thas, Joseph, et al. “Half Moufang Implies Moufang for Finite Generalized Quadrangles.” INVENTIONES MATHEMATICAE, vol. 105, no. 1, 1991, pp. 153–56.
- APA
- Thas, J., Payne, S., & Van Maldeghem, H. (1991). Half Moufang implies Moufang for finite generalized quadrangles. INVENTIONES MATHEMATICAE, 105(1), 153–156.
- Chicago author-date
- Thas, Joseph, S Payne, and Hendrik Van Maldeghem. 1991. “Half Moufang Implies Moufang for Finite Generalized Quadrangles.” INVENTIONES MATHEMATICAE 105 (1): 153–56.
- Chicago author-date (all authors)
- Thas, Joseph, S Payne, and Hendrik Van Maldeghem. 1991. “Half Moufang Implies Moufang for Finite Generalized Quadrangles.” INVENTIONES MATHEMATICAE 105 (1): 153–156.
- Vancouver
- 1.Thas J, Payne S, Van Maldeghem H. Half Moufang implies Moufang for finite generalized quadrangles. INVENTIONES MATHEMATICAE. 1991;105(1):153–6.
- IEEE
- [1]J. Thas, S. Payne, and H. Van Maldeghem, “Half Moufang implies Moufang for finite generalized quadrangles,” INVENTIONES MATHEMATICAE, vol. 105, no. 1, pp. 153–156, 1991.
@article{220910, abstract = {{A finite generalized quadrangle has two types of panels. If each panel of one type is Moufang, then every panel is Moufang. Hence by a theorem of Fong and Seitz [1] the quadrangle is classical or dual classical.}}, author = {{Thas, Joseph and Payne, S and Van Maldeghem, Hendrik}}, issn = {{0020-9910}}, journal = {{INVENTIONES MATHEMATICAE}}, language = {{eng}}, number = {{1}}, pages = {{153--156}}, title = {{Half Moufang implies Moufang for finite generalized quadrangles}}, volume = {{105}}, year = {{1991}}, }