Notes on explicit smooth maps on 7-dimensional manifolds into the 4-dimensional Euclidean space

Abstract: A fold map is a smooth map at each singular point of which it is represented as the product map of a Morse function and the identity map on an open ball. A special generic map is a fold map such that the Morse function can be taken as a natural height function on an unit disk. The class of special generic maps includes a Morse function with exactly two singular points on a closed manifold, characterizing a sphere topologically (except 4-dimensional cases) as the Reeb's theorem shows, and canonical projections of unit spheres. It has been known that so-called exotic spheres do not admit special generic maps into Euclidean spaces whose dimensions are sufficiently high and smaller than the dimensions of the spheres. Exotic 7-dimensional homotopy spheres do not admit special generic maps into the 4-dimensional Euclidean space for example. We can easily obtain special generic maps on fundamental manifolds such as ones represented as connected sums of products of two standard spheres and in considerable cases, smooth manifolds resembling topologically them and different from them do not admit special generic maps. These interesting results are due to studies of Saeki, Sakuma and Wrazidlo since the 1990s. In the present paper, we present new results on explicit smooth maps including fold maps on 7-dimensional manifolds into the 4-dimensional Euclidean space and meanings in algebraic topology and differential topology of manifolds. Moreover, the author obtained related results before motivated by the studies before and they are reviewed in the presentation of the new results. We also present new discussions and results related to the results for 7-dimensional manifolds and maps on them for fold maps between manifolds of general dimensions.