let $0<r<1$,and $$\dfrac{1}{\sqrt{1-2tr+r^2}}=\sum_{n=0}^{\infty}P_{n}(t)r^n$$ show that $$|P_{n}(t)|\le 1,-1\le t\le 1$$
My try: I know this coefficients $P_{n}$ are called Legendre polynomials,
$$P_{n}(t)=\sum_{k=0}^{[n/2]}\dfrac{n!}{2^{2k}(k!)^2(n-2k)!}t^{n-2k}(t^2-1)^k$$maybe prove $|P_{n}(t)|\le 1$ have some methods? Thank you for post you solution,Thank you
For $|t|\le 1$ we can put $t=\cos\theta$ so that we can write $$1-2tr+r^2=1-2r\cos\theta+r^2=\left(1-r\operatorname{e}^{+i\theta}\right)\left(1-r\operatorname{e}^{-i\theta}\right)$$ and using the expansion $(1+y)^m=\sum_{n=0}^{\infty}\binom{m}{n}x^n$ we have $$ \begin{align} \frac{1}{\sqrt{1-2r\cos\theta+r^2}} &=\left(1-r\operatorname{e}^{+i\theta}\right)^{-1/2}\left(1-r\operatorname{e}^{-i\theta}\right)^{-1/2}\\ &=\sum_{m=0}^\infty a_mr^m\operatorname{e}^{+im\theta}\sum_{m=0}^\infty a_mr^m\operatorname{e}^{-im\theta} \end{align} $$ where $a_0=1$ and $a_m=\tfrac{1\cdot3\cdots(2m-1)}{2\cdot 4\cdots(2m)}$ for $m=1,2,\ldots$, so that $$ \begin{align} P_n(\cos\theta)&=\sum_{m=0}^n a_m\operatorname{e}^{+im\theta}a_{n-m}\operatorname{e}^{-i(n-m)\theta}\\ &=\sum_{m=0}^n a_m a_{n-m}\operatorname{e}^{-i(n-2m)\theta}\\ &=\sum_{m=0}^n a_m a_{n-m} \cos(n-2m)\theta\\ &=2a_0a_n\cos n\theta+2a_1a_{n-1}\cos (n-2)\theta+\cdots+ \begin{cases}2 a_{(n-1)/2}a_{(n+1)/2}\cos \theta& \text{for $n$ odd }\\ a^2_n/2 & \text{for $n$ even} \end{cases}\\ &=\tfrac{1\cdot3\cdots(2n-1)}{2\cdot 4\cdots(2n)}\left(2\cos n\theta+\tfrac{1\cdot (2n)}{2\cdot (2n-1)}2\cos(n-2)\theta+\tfrac{1\cdot 3\cdot (2n)\cdot (2n-2)}{2\cdot 4\cdot(2n-1)\cdot(2n-3)}2\cos(n-4)\theta+\cdots\right) \end{align} $$ Consequently $P_n(\cos\theta)$ is a trigonometric cosine polynomial with non-negative coefficients.
If $\theta$ is a real angle $$ |P_n(\cos\theta)|\le \tfrac{1\cdot3\cdots(2n-1)}{2\cdot 4\cdots(2n)}\left(2+\tfrac{1\cdot (2n)}{2\cdot (2n-1)}2+\tfrac{1\cdot 3\cdot (2n)\cdot (2n-2)}{2\cdot 4\cdot(2n-1)\cdot(2n-3)}2+\cdots\right)=P_n(1) $$ so that $|P_n(\cos\theta)|\le 1$.
You would think that there would be some way to use the following to do what you want: $$ \sum_{k=0}^{\infty}P_{k}(\cos\phi)r^{k} = \frac{1}{\sqrt{1-2r\cos\phi +r^{2}}} \le \frac{1}{1-|r|}=\sum_{n=0}^{\infty}|r|^{n},\;\;\; -1 < r < 1. $$ I don't see it, though. And, all the proofs I know involve complex contour integral representations.
