Extending maps in Hilbert manifolds (Q2903928)

Let \(X\) be a completely metrizable space, \(A\) a closed subset of \(X\), \(M\) a manifold modelled on Hilbert space of weight \(\alpha\), and \(f:X\to M\) a continuous map. The author gives conditions under which \(f\) is approximable by maps \(g\) such that \(f|A=g|A\) and \(g|X\setminus A\) is a \(\sigma Z\)-embedding of \(X\setminus A\) into \(M\). In case \(X\setminus A\) is a manifold of weight \(\alpha\) modelled on the same Hilbert space as \(M\), he gives conditions under which \(f\) can be approximated by maps \(h\) such that \(h|A=f|A\) and \(h|X\setminus A\) is an open embedding.