比利时vs摩洛哥足彩
,
university of california san diego
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analysis colloquium
xiaojun huang
rutgers university
a codimension two cr singular real submanifold in a complex space with a symmetric model
abstract:
this a joint work with wanke yin. let $m\subset \mathbb{c}^{n+1}$ ($n\ge 2$) be a real analytic submanifold defined by an equation of the form: $w=|z|^2+o(|z|^3)$, where we use $(z,w)\in {cc}^{n}\times cc$ for the coordinates of ${c}^{n+1}$. we first derive a pseudo-normal form for $m$ near $0$. we then use it to prove that $(m,0)$ is holomorphically equivalent to the quadric $(m_\infty: w=|z|^2,\ 0)$ if and only if it can be formally transformed to $(m_\infty,0)$, using the rapid convergence method. we also use it to give a necessary and sufficient condition when $(m,0)$ can be formally flattened. our main theorem generalizes a classical result of moser for the case of $n=1$.
host: salah baouendi
march 17, 2009
10:30 am
ap&m 7321
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