See, e.g., Weintraub (1978) and Gorodkov (2019) Weintraub, Steven H. (1978), "Group actions on homology quaternionic projective planes", Proceedings of the American Mathematical Society, 70: 75–82, doi:10.2307/2042588 Gorodkov, Denis (2019), "A 15-vertex triangulation of the quaternionic projective plane", Discrete & Computational Geometry, 62 (2): 348–373, arXiv:1603.05541, doi:10.1007/s00454-018-00055-w
See, e.g., Weintraub (1978) and Gorodkov (2019) Weintraub, Steven H. (1978), "Group actions on homology quaternionic projective planes", Proceedings of the American Mathematical Society, 70: 75–82, doi:10.2307/2042588 Gorodkov, Denis (2019), "A 15-vertex triangulation of the quaternionic projective plane", Discrete & Computational Geometry, 62 (2): 348–373, arXiv:1603.05541, doi:10.1007/s00454-018-00055-w
Bruck & Bose (1964), Introduction. "One might say, with some justice, that projective geometry, in so far as present day research is concerned, has split into two quite separate fields. On the one hand, the researcher into the foundations of geometry tends to regard Desarguesian spaces as completely known. Since the only possible non-Desarguesian spaces are planes, his attention is restricted to the theory of projective planes, especially the non-Desarguesian planes. On the other hand stand all those researchers – and especially, the algebraic geometers – who are unwilling to be bound to two-dimensional space and uninterested in permitting non-Desarguesian planes to assume an exceptional role in their theorems. For the latter group of researchers, there are no projective spaces except the Desarguesian spaces." Bruck, R. H.; Bose, R. C. (1964), "The Construction of Translation Planes from Projective Spaces"(PDF), J. Algebra, 1: 85–102, doi:10.1016/0021-8693(64)90010-9
Bruck & Bose (1964), Introduction. "One might say, with some justice, that projective geometry, in so far as present day research is concerned, has split into two quite separate fields. On the one hand, the researcher into the foundations of geometry tends to regard Desarguesian spaces as completely known. Since the only possible non-Desarguesian spaces are planes, his attention is restricted to the theory of projective planes, especially the non-Desarguesian planes. On the other hand stand all those researchers – and especially, the algebraic geometers – who are unwilling to be bound to two-dimensional space and uninterested in permitting non-Desarguesian planes to assume an exceptional role in their theorems. For the latter group of researchers, there are no projective spaces except the Desarguesian spaces." Bruck, R. H.; Bose, R. C. (1964), "The Construction of Translation Planes from Projective Spaces"(PDF), J. Algebra, 1: 85–102, doi:10.1016/0021-8693(64)90010-9