CONICET | Buscador de Institutos y Recursos Humanos

Let k be a field and let H be a rigid braided Hopf k-algebra. In this paper we continue the study of the theory of braided Hopf crossed products began in [``Theory of braided Hopf crossed products'', Journal of Algebra 261 (2003) 54-101]. First we show that to have an H-braided comodule algebra is the same that to have an H^{\dag}-braided module algebra, where H^{\dag} is a variant of H^*, and then we study the maps [\ ,\ ] and (\ ,\ ), that appear in the Morita context introduced in the above cited paper.