- Title: On a problem of J. E. Fornaess - Speaker: Seungro Joo (POSTECH Graduate student) - Abstract:The squeezing function, which has various applications, is one of invariants under biholomorphic coordinate changes. For this function, Professor J. E. Fornaess proposes the following question. Q. Let $Omega$ be a bounded pseudoconvex domain with a smooth boundary. If the squeezing function S(z) -> 1 as z -> p for some boundary point p of $Omega$, then is p a strongly pseudoconvex point? In this talk, we answer the question, using a scaling method, for bounded pseudoconvex domains in C^2 with a smooth finite type boundary. - Place: GAIA Seminar Room (# 106, Math Science bldg.) |

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