Equivariant Stable Stems
نویسندگان
چکیده
Let S(r) denote the w-sphere with a linear involution having a fixed point set of codimension r, where O ^ r ^ w . We pick some fixed point as a base point and consider the set [S(r); S(t)] of base point preserving equivariant homotopy classes of maps from S(r) to S(t). This has a natural group structure for n—r^l and is abelian if n—r^2. There is a suspension functor S without action and one 2 with action (that is, the reduced join with 5^0) and 5(1) respectively). These induce homomorphisms
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