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For some classes $X \subset 2^{ₙ}$ of closed subsets of the disc ₙ ⊂ ℝⁿ we prove that every Hausdorff-continuous mapping f: X → X has a fixed point A ∈ X in the sense that the intersection A ∩ f(A) is nonempty.

The Brouwer-Jordan theorem

H. Kulpa (1992)

Acta Universitatis Carolinae. Mathematica et Physica

The Brown-Peterson homology and nilpotence of the infinite special orthogonal group.

Dung Yung Yan (1995)

Mathematische Zeitschrift

The cancellation problem for homotopy equivalent representations of finite groups: a survey

Paweł Traczyk (1986)

Banach Center Publications

The category of long exact sequences and the homotopy exact sequence of modules.

Su, C.Joanna (2003)

International Journal of Mathematics and Mathematical Sciences

The center of a graded connected Lie algebra is a nice ideal

Yves Félix (1996)

Annales de l'institut Fourier

Let $(𝕃 (V), d)$ be a free graded connected differential Lie algebra over the field $ℚ$ of rational numbers. An ideal $I$ in the Lie algebra $H (𝕃 (V), d)$ is called nice if, for every cycle $α \in 𝕃 (V)$ such that $[α]$ belongs to $I$ , the kernel of the map $H (𝕃 (V), d) \to H (𝕃 (V \oplus ℚ x), d)$ , $d (x) = α$ , is contained in $I$ . We show that the center of $H (𝕃 (V), d)$ is a nice ideal and we give in that case some informations on the structure of the Lie algebra $H (𝕃 (V \oplus ℚ x), d)$ . We apply this computation for the determination of the rational homotopy Lie algebra $L_{X} = π_{*} (Ω X) \otimes ℚ$ of a simply connected space $X$ . We deduce that the...

The chromatic $E_{1}$ -term $H^{0} M_{1}^{2}$ for $p > 3$ .

Nakai, Hirofumi (2000)

The New York Journal of Mathematics [electronic only]

The Classification of Simply Connected H-Spaces with Three Cells II.

A. Zabrodsky (1972)

Mathematica Scandinavica

The Classification of Simply Connected H-Spaces with Three Cells I.

A. Zabrodsky (1972)

Mathematica Scandinavica

The classification of weighted projective spaces

Anthony Bahri, Matthias Franz, Dietrich Notbohm, Nigel Ray (2013)

Fundamenta Mathematicae

We obtain two classifications of weighted projective spaces: up to hoeomorphism and up to homotopy equivalence. We show that the former coincides with Al Amrani's classification up to isomorphism of algebraic varieties, and deduce the latter by proving that the Mislin genus of any weighted projective space is rigid.

We calculate completely the Real cobordism groups, introduced by Landweber and Fujii, in terms of homotopy groups of known spectra.

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The Boolean algebra of spectra.

The Borsuk homotopy extension theorem without the binormality condition

The boundary-Wecken classification of surfaces.

The braid groups of the projective plane.

The branching nerve of HDA and the Kan condition.

The Bredon-Löffler conjecture.

The Brouwer Fixed Point Theorem for Some Set Mappings