Homotopy properties of regular mappings into real retract rational varieties
Abstract
We study homotopy properties of regular mappings from spheres into a real retract rational variety Y. We show that the homotopy classes which are represented by such mappings form subgroups of the homotopy groups of Y, and that the groups are independent of the choice of the basepoint on Y as long as Y is connected. We also construct regular representatives of all the Whitehead products in all the homotopy groups of Y.
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