TOPICS
Search

H-Space


An H-space, named after Heinz Hopf, and sometimes also called a Hopf space, is a topological space together with a continuous binary operation mu:X×X->X, such that there exists a point e in X with the property that the two maps x|->mu(x,e) and x|->mu(e,x) are both homotopic to the identity map id_X on X, through homotopies preserving the point e. The element e is called a homotopy identity.

One should note that authors do not always agree on the definition of an H-space. In some texts, the maps given by mu(e,x) and mu(x,e) are required to be equal to the identity on X. In others, the two maps are required to be homotopic to the identity as above, but the homotopies need not fix the element e. Fortunately, we have the comforting fact that for any CW-complex, the three definitions above are equivalent.

For any H-space X with homotopy identity e, the fundamental group with base-point e is an Abelian group. Taking another base-point b in a path-component of X not containing e may, however, result in a non-Abelian fundamental group.

A deep theorem in homotopy theory known as the Hopf invariant one theorem (sometimes also known as Adams' theorem) states that the only n-spheres that are H-spaces are S^0, S^1, S^3, and S^7.


See also

Co-H-Space, Fundamental Group, Hopf Invariant One Theorem

Portions of this entry contributed by Rasmus Hedegaard

Explore with Wolfram|Alpha

Cite this as:

Hedegaard, Rasmus and Weisstein, Eric W. "H-Space." From MathWorld--A Wolfram Web Resource. https://mathworld.wolfram.com/H-Space.html

Subject classifications