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Indépendance linéaire de $\exp \left(f_1\right),...,\exp \left(f_p\right)$ où $f_1,...,f_p$ sont des fonctions holomorphes sur ${\mathbf{C}}^n$ avec $f_i-f_j$ non constante pour $i\ne j$.

Given integers $D\>0,n\>1,0\<r\<n$ and a constant $C\>0$, consider the space of $r$-tuples $\overrightarrow{P}=(P_1...P_r)$ of real polynomials in $n$ variables of degree $\le D$, whose coefficients are $\le C$ in absolute value, and satisfying $\det {\left(\frac{\partial P_i}{\partial x_i}\left(0\right)\right)}_{1\le i,j\le r}=1$. We study the family $\left\{f\right|V\}$ of algebraic functions, where $f$ is a polynomial, and $V=\left\{\right|x|\le \delta ,\overrightarrow{P}(x)=0\},\delta \>0$ being a constant depending only on $n,D,C$. The main result is a quantitative extension theorem for these functions which is uniform in $\overrightarrow{P}$. This is used to prove Bernstein-type inequalities which are again uniform with respect to $\overrightarrow{P}$. The proof...