Topological applications of graded Frobenius \(n\)-homomorphisms. II (Q2837774)

In the main result of the paper, the authors prove that if \(X\) is a connected Hausdorff space homotopy equivalent to a CW-complex such that \(\mathrm{dim}H^q (X;\mathbb{Q}) < \infty\) for all \(q> 0\) then the algebra \(H^\ast (X;\mathbb{Q})\) has a structure of graded \(n\)-Hopf prealgebras provided that \(X\) has a structure of \(nH\)-space, respectively \(H^\ast (X;\mathbb{Q})\) has a structure of a graded \(n\)-bialgebra if \(X\) has a structure of a \(nH\)-monoid (Theorem 1). Moreover, if \(X\) admits a structure of a \(2H\)-space, then its fundamental group \(\pi_1(X)\) does not belong to the class \(\mathcal{C}\) (Theorem 2).