Malgrange–Zerner theorem

Template:Short description Template:Use American English In mathematics, Malgrange–Zerner theorem (named for Bernard Malgrange and Martin Zerner) shows that a function on ${\displaystyle {ℝ}^n}$ allowing holomorphic extension in each variable separately can be extended, under certain conditions, to a function holomorphic in all variables jointly. This theorem can be seen as a generalization of Bochner's tube theorem to functions defined on tube-like domains whose base is not an open set.

Theorem^[1][2] Let

${\displaystyle X={\displaystyle \bigcup _{k=1}^n}{ℝ}^{k-1}\times P\times {ℝ}^{n-k},\text{ where }P=ℝ+i[0,1),}$

and let ${\displaystyle W=}$ convex hull of ${\displaystyle X}$. Let ${\displaystyle f:X\to ℂ}$ be a locally bounded function such that ${\displaystyle f\in C^{\mathrm{\infty }}(X)}$ and that for any fixed point ${\displaystyle (x_1,\dots ,x_{k-1},x_{k+1},\dots ,x_n)\in {ℝ}^{n-1}}$ the function ${\displaystyle f(x_1,\dots ,x_{k-1},z,x_{k+1},\dots ,x_n)}$ is holomorphic in ${\displaystyle z}$ in the interior of ${\displaystyle P}$ for each ${\displaystyle k=1,\dots ,n}$. Then the function ${\displaystyle f}$ can be uniquely extended to a function holomorphic in the interior of ${\displaystyle W}$.

According to Henry Epstein,^[1][3] this theorem was proved first by Malgrange in 1961 (unpublished), then by Zerner ^[4] (as cited in ^[1]), and communicated to him privately. Epstein's lectures ^[1] contain the first published proof (attributed there to Broz, Epstein and Glaser). The assumption ${\displaystyle f\in C^{\mathrm{\infty }}(X)}$ was later relaxed to ${\displaystyle f{|}_{{ℝ}^n}\in C^3}$ (see Ref.[1] in ^[2]) and finally to ${\displaystyle f{|}_{{ℝ}^n}\in C}$.^[2]

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