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This thesis is concerned with the problem of determining a measure of algebraic independence for a particular m-tuple θ₁,...,${\theta }_m$ of complex numbers. Specifically, let K be a number field and let f₁(z),...,$f_m\left(z\right)$ be elements of K[[z]] algebraically independent over K(z) satisfying equations of the form(*) $f_j\left(z^b\right)={\sum }_{i=1}^m{f}_i\left(z\right)a_{ij}\left(z\right)+b_j\left(z\right)$ (j = i,...,m)for b ≥ 2, $a_{ij}\left(z\right)$, $b_j\left(z\right)$ in K(z). Suppose finally that α ∈ K is such that 0 < |α| < 1, the $f_j(z$) converge at z = α and the $a_{ij}\left(z\right)$, $b_j\left(z\right)$ are analytic at $z=\alpha ,{\alpha }^b,{\alpha }^{b²},...$ Then the ${\theta }_i=f_i\left(\alpha \right)$ are algebraically independent numbers....