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References
M.F. Atiyah, Immersions and embeddings of manifolds, Topology 1 (1962), 125–132.
G.E. Bredon, Equivariant Cohomology Theories. Lecture Notes in Math. 34, Springer (1966).
G.E. Bredon, Introduction to compact transformation groups. Academic Press, New York (1972).
T. tom Dieck, Homotopy equivalent group representations and Picard groups of the Burnside ring and the character ring. Manuscripta math. 26(1978), 179–200.
T. tom Dieck, Transformation groups and representation theory, Lecture Notes in Math. 766, Springer (1979).
T. tom Dieck, Homotopiedarstellungen endlicher Gruppen: Dimensionsfunktionen. Invent.math.67(1978), 231–252.
T. tom Dieck, T. Petrie, Geometric modules over the Burnside ring. Invent.math.47(1978), 273–287.
T. tom Dieck, T. Petrie, Homotopy representations of finite groups. Publ.math. IHES 56(1982), 337–377.
A. Dress, Induction and structure theorems for orthogonal representations of finite groups, Ann. of Math. 102 (1975), 291–325.
K.H. Dovermann, T. Petrie, G-surgery II. Memoirs AMS 260 (1982).
K.H. Dovermann, M. Rothenberg, An equivariant surgery sequence and equivariant diffeomorphism and homeomorphism classification. Preprint (1982).
K. Fujii, M. Sugawara, The order of the canonical element of J(L), Hiroschima Math. J. 10(1980) 369–37.
M. Kervaire, J. Milnor, Groups of homotopy spheres I, Ann. of Math. 77(1963), 504–537.
T. Kambe Real and complex K-theory of Lens spaces, J. Math. Soc. J. 18 (1966), 135.
P. Löffler, Über die G-Rahmbarkeit von G-Homotopiesphären. Arch. Math. 29(1977), 628–634.
R. Lashof, M. Rothenberg, G-smoothing theory. Proc. Pure Math. AMS 32(1978), 211–266.
I. Madsen, M. Rothenberg, Periodic maps of spheres of odd order,I: Equivariant transversality (1984), II: The equivariant PL automorphism groups, Preprint, Aarhus University (1983).
I. Madsen, J.A. Svensson, Induction in unstable equivariant homotopy theory and non-invariance of Whitehead torsion, Preprint, Aarhus University (1984).
G. Segal, The representation ring of a compact Lie group, IHES, Publ. Mathematique 34(1968), 113–128.
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© 1985 Springer-Verlag
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Madsen, I., Raussen, M. (1985). Smooth and locally linear g homotopy representations. In: Smith, L. (eds) Algebraic Topology Göttingen 1984. Lecture Notes in Mathematics, vol 1172. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0074428
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DOI: https://doi.org/10.1007/BFb0074428
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