Polynomial hulls of sets in \(\mathbb{C}^ 3\) fibered over the unit circle (Q5961600)

The author constructs a compact set \(X\subset \mathbb{C}^3\) such that:NEWLINENEWLINENEWLINE(1) \(\pi (X)= \{z\in\mathbb{C}: |z|=1\}\), where \(\pi(z,w_1,w_2): =z\),NEWLINENEWLINENEWLINE(2) every fiber \(X_z: =\{w\in \mathbb{C}^2: (z,w)\in X\}\) is polynomially convex and contractible to a point in \(\mathbb{C}^2\),NEWLINENEWLINENEWLINE(3) \(\pi (\widehat X)= \{|z|\leq 1\}\), where \(\widehat X\) is the polynomial hull of \(X\),NEWLINENEWLINENEWLINE(4) the set \(\{(z,w)\in \widehat X: |z|<1\}\) contains no analytic variety of positive dimension.