Maehara, Hiroshi On differentiable involutions on homotopy spheres. (English) Zbl 0354.57012 Bull. Sci. Eng. Div., Univ. Ryukyus, Math. Nat. Sci. 13, 1-4 (1970). MSC: 57S30 57R60 57S25 PDFBibTeX XMLCite \textit{H. Maehara}, Bull. Sci. Eng. Div., Univ. Ryukyus, Math. Nat. Sci. 13, 1--4 (1970; Zbl 0354.57012)
Hsiang, Wu-yi On some fundamental theorems in cohomology theory of topological transformation groups. (English) Zbl 0243.57015 Taita J. Math. 2, 61-87 (1970). MSC: 57S25 55N25 57S10 PDFBibTeX XML
Kopell, Nancy Commuting diffeomorphisms. (English) Zbl 0225.57020 Global Analysis, Proc. Sympos. Pure Math. 14, 165-184 (1970). MSC: 57S20 57S25 PDFBibTeX XML
Munkholm, Hans J. On the Borsuk-Ulam theorem for \(Z_{p^ a}\) actions on \(S^{2 n-1}\) and maps \(S^{2 n-1} \to R^ m\). (English) Zbl 0224.57021 Proc. adv. Study Inst. algebraic Topol. 1970, various Publ. Ser. 13, 412-416 (1970). MSC: 57S25 PDFBibTeX XML
Frank, David Exotic spheres bounding homeomorphic manifolds. (English) Zbl 0223.57018 Proc. adv. Study Inst. algebraic Topol. 1970, various Publ. Ser. 13, 98-103 (1970). MSC: 57R55 57S15 57S25 57R10 55R50 PDFBibTeX XML
Munkholm, H. J. On the Borsuk-Ulam theorem for \(Z_{p^ a}\) actions on \(S^{2n-1}\) and maps \(S^{2n-1} \to R^ m\). (English) Zbl 0211.55701 Osaka J. Math. 7, 451-456 (1970). MSC: 55S25 57S25 57N50 PDFBibTeX XMLCite \textit{H. J. Munkholm}, Osaka J. Math. 7, 451--456 (1970; Zbl 0211.55701) Backlinks: MO
Calabi, E. On the group of automorphisms of a symplectic manifold. (English) Zbl 0209.25801 Probl. Analysis. Sympos. in Honor of Salomon Bochner, Princeton Univ. 1969, 1-26 (1970). MSC: 53C15 37J99 57S25 PDFBibTeX XML
Onishchik, A. L. Lie groups operating transitively on Grassmann and Stiefel manifolds. (Liegruppen, die auf Graßmannschen und Stiefelschen Mannigfaltigkeiten transitiv operieren.) (Russian) Zbl 0206.31702 Mat. Sb., N. Ser. 83(125), 407-428 (1970). MSC: 22E15 57S25 57S15 PDFBibTeX XMLCite \textit{A. L. Onishchik}, Mat. Sb., Nov. Ser. 83(125), 407--428 (1970; Zbl 0206.31702) Full Text: EuDML
Palais, Richard S. \(C^1\) actions of compact Lie groups on compact manifolds are \(C^1\)-equivalent to \(C^\infty\) actions. (English) Zbl 0203.26203 Am. J. Math. 92, 748-760 (1970). Reviewer: Richard S. Palais MSC: 57S25 PDFBibTeX XMLCite \textit{R. S. Palais}, Am. J. Math. 92, 748--760 (1970; Zbl 0203.26203) Full Text: DOI