We denote $\mathcal { D }$ the open unit disk of $\mathbb { C } : \mathcal { D } = \{ z \in \mathbb { C } ; | z | < 1 \}$. For $z \in \mathcal { D }$, we denote $\Phi _ { p } ( z ) = \sum _ { n = 0 } ^ { + \infty } ( n + p ) ( n + p - 1 ) \cdots ( n + 1 ) a _ { n + p } z ^ { n }$. We admit that the function $\Phi _ { p }$ is bounded on $\mathcal { D }$. Let $r$ be a real number in the interval $] 0,1 [$. Demonstrate for all integers $n \geqslant 1$ and $p \geqslant 1$, that $$( n + p ) ( n + p - 1 ) \cdots ( n + 1 ) a _ { n + p } r ^ { n } = \frac { 1 } { 2 \pi } \int _ { 0 } ^ { 2 \pi } \Phi _ { p } \left( r \mathrm { e } ^ { \mathrm { i } \theta } \right) \mathrm { e } ^ { - n \mathrm { i } \theta } \mathrm {~d} \theta$$
We denote $\mathcal { D }$ the open unit disk of $\mathbb { C } : \mathcal { D } = \{ z \in \mathbb { C } ; | z | < 1 \}$. For $z \in \mathcal { D }$, we denote $\Phi _ { p } ( z ) = \sum _ { n = 0 } ^ { + \infty } ( n + p ) ( n + p - 1 ) \cdots ( n + 1 ) a _ { n + p } z ^ { n }$. We admit that the function $\Phi _ { p }$ is bounded on $\mathcal { D }$.
Let $r$ be a real number in the interval $] 0,1 [$. Demonstrate for all integers $n \geqslant 1$ and $p \geqslant 1$, that
$$( n + p ) ( n + p - 1 ) \cdots ( n + 1 ) a _ { n + p } r ^ { n } = \frac { 1 } { 2 \pi } \int _ { 0 } ^ { 2 \pi } \Phi _ { p } \left( r \mathrm { e } ^ { \mathrm { i } \theta } \right) \mathrm { e } ^ { - n \mathrm { i } \theta } \mathrm {~d} \theta$$