Hint/Answer - W.L.O.G assume that f maps the upper half-plane to itself. Take a circle of radius r about 0, say C_r, on which f has no zeroes. The winding number of f(C_r) about 0 is at ...

HINT: Compare a_n with n^2 for the first few values of n. Added: \begin{array}{rcc} n:&1&2&3&4&5&6&7\\ n^k:&1&4&9&16&25&36&49\\ a_n:&1&3&7&13&21&31&43 \end{array} What’s the difference ...

Let \alpha=\frac{5+\sqrt{13}}{4},\beta=\frac{5-\sqrt{13}}{4} be the roots of equation 4r^2-10r+3=0, and \gamma=\frac{3+\sqrt{13}}{4},\delta=\frac{3-\sqrt{13}}{4} be the roots of ...

Another standard way is to calculate a difference scheme and then to work backwards: \begin{matrix} 0 & & 1 & & 2 & & 3 & & 4 \\ & & 1 && 7 && 19 && 37 \\ && &6& & 12 && 18 & \\ &&&& 6 && 6 && \\ \end{matrix} \Rightarrow \begin{matrix} & 0 & & 1 & & 2 & & 3 & & 4 \\ \color{blue}{c}= &\color{blue}{1} & & 1 && 7 && 19 && 37 \\ \color{blue}{a+b}= & &\color{blue}{0}&&6& & 12 && 18 & \\ \color{blue}{2a}= &&& \color{blue}{6}&& 6 && 6 && \\ \end{matrix} ...

We have a_n - a_{n-1} - 2n +2 = 0 \ (\star). Suppose the GF of \langle a_n \rangle_{n\ge 1} is f(x). Then, \begin{align*} f(x) &= a_1 + &a_2 x& + a_3 x^2 + \cdots + a_n x^n + \cdots \\ -xf(x) &= &-a_1 x& - a_2 x^2 - \cdots - a_{n-1}x^n - \cdots\\ \frac{-2x}{(1-x)^2} &= &-2 x& - 4 x^2 \ \ - \cdots - 2n x^n + \cdots \\ \frac{2}{1-x} &= 2 + &2x& + 2x^2 \ \ + \cdots +2x^n + \cdots \end{align*} ...

You got in trouble when you set up p_n. Since the forcing term is linear, we expect p_n to be quadratic in n; p_n=d_0n^2+d_1n+d_2. Now we have \begin{align*} 2n+3&=p_{n+1}-p_n\\ &=d_0(n+1)^2+d_1(n+1)+d_2-d_0n^2-d_1n-d_2\\ &=d_0(2n+1)+d_1\\ &=2d_0n+(d_0+d_1)\;. \end{align*} ...