We introduce a concept of connectedness of antipodal sets of compact Riemannian symmetric spaces and construct a method to make a bigger antipodal set from a given antipodal set. Moreover, using the connectedness we give a sufficient condition that a given maximal antipodal set is homogeneous.
[1] B.Y. Chen and T. Nagano: A Riemannian geometric invariant and its applications to a problem of Borel and Serre, Trans. Amer. Math. Soc. 308 (1988), 273–297.
[2] B.Y. Chen and T. Nagano: Totally geodesic submanifolds of symmetric spaces II, Duke Math. J. 45 (1978), 405–425.
[3] H. Tasaki: Antipodal sets in oriented real Grassmann manifolds, Internat. J. Math. 24 (2013), no.8, 135006, 28pp.
[4] H. Tasaki: Sequences of Maximal Antipodal Sets of Oriented Real Grassmann Manifolds; in Real and Complex Submanifolds, Springer Proceedings in Mathematics and Statistics 106, Springer, Tokyo, 2014, 515–524.
[5] H. Tasaki: Estimates of antipodal sets in oriented real Grassmann manifolds, “Global Analysis and Differ- ential Geometry on Manifolds”, Internat. J. Math. 26 (2015), no.5, 1541008, 12pp.
[6] H. Tasaki: Sequences of maximal antipodal sets of oriented real Grassmann manifolds II; in Hermitian- Grassmannian Submanifolds, Springer Proc. Math. Stat. 203, Springer, Singapore, 2017, 17–26.
[7] M.S. Tanaka and H.Tasaki: Antipodal sets of symmetric R-spaces, Osaka J. Math. 50 (2013), 161–169.
[8] M. Takeuchi: Basic transformations of symmetric R-spaces, Osaka J. Math. 25 (1988), 259–297.
[9] P. Frankl and N. Tokushige: Uniform eventown problems, Euro. J. Combi., 51 (2016), 280–286.
[10] S. Helgason: Differential geometry, Lie groups and symmetric spaces, Academic Press, New York, 1978.
[11] T. Nagano: The involutions of compact symmetric spaces, Tokyo J. Math. 11 (1988), 57–79.
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