Assertion: The fundamental group of space which has an $H$- and a co-$H$ structure is trivial or infinite cyclic.

Why this is true?

(added conditions: one should probably assume that the space is connected and has the homotopy type of a CW complex)

Assertion: The fundamental group of a space which has an $H$- and a co-$H$ structure is trivial or infinite cyclic.

Why this is true?

(added conditions: one should probably assume that the space is connected and has the homotopy type of a CW complex)

The fundamental group of space which has H and co-H group sturucture is 0 or Z(integer)?

Why this is true?

Assertion: The fundamental group of space which has an $H$- and a co-$H$ structure is trivial or infinite cyclic.

Why this is true?

(added conditions: one should probably assume that the space is connected and has the homotopy type of a CW complex)