Abstract
We provide counterexamples to the stable equivalence problem in every dimension $d\geq2$. That means that we construct hypersurfaces $H_1, H_2\subset\C^{d+1}$ whose cylinders $H_1\times\C$ and $H_2\times\C$ are equivalent hypersurfaces in $\C^{d+2}$, although $H_1$ and $H_2$ themselves are not equivalent by an automorphism of $\C^{d+1}$. We also give, for every $d\geq2$, examples of two non-isomorphic algebraic varieties of dimension $d$ which are biholomorphic.
Citation
Pierre-Marie POLONI. "A note on the stable equivalence problem." J. Math. Soc. Japan 67 (2) 753 - 761, April, 2015. https://doi.org/10.2969/jmsj/06720753
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