On manifold-like polyfolds as differential geometrical objects with applications in complex geometry

Abstract

We argue for more widespread use of manifold-like polyfolds (M-polyfolds) as differential geometric objects. M-polyfolds possess a distinct advantage over differentiable manifolds, enabling a smooth and local change of dimension. To establish their utility, we introduce tensors and prove the existence of Riemannian metrics, symplectic structures, and almost complex structures within the M-polyfold framework. Drawing inspiration from a series of highly acclaimed articles by L\'aszl\'o Lempert, we lay the foundation for advancing geometry and function theory in complex M-polyfolds.