Search Results

For prime $p$ let $E_p[\dots]$ and $P_p[\dots]$ be the external and polynomial $\mathbb{Z}_p$--algebras. It is known that for $n\geqslant 1$ and odd $p$ where is an isomorphism of primitively generate …

Is the next statement true? Let $M$ be a non-compact linearly connected oriented topological manifold of dimension $n$, and let $M^+$ be the one-point compactification of $M$. Then there is a canonica …

How do Segal's theorems from (Configuration-spaces and iterated loop-spaces. Invent. Math.21:213--221) imply that there is an isomorphism $H_*(B_\infty,\mathbb{Z})\cong H_*(\Omega^2S^3,\mathbb{Z})$, …

The next two claims completely describe $H_*(\Omega^2S^3;\mathbb{Z})$. This follows from several sources. For example, from already mentioned in the answer of Nicholas Kuhn book of Joe Neisendorfer. T …