$$ \int^\pi_{-\pi} \left(1-a\cos\theta\right)^{-b-2} \log\left(1-a\cos\theta\right)d\theta$$ Under the condition $0<a<1$ and $b>0$.
Mathematica found the following form.
$$ 2\pi\left(a+1\right)^{-b-2} \bigg({}_2F_1\left(\frac{1}{2},b+2;1;\frac{2a}{a+1}\right) \left(\log\left(a+1\right)+\Psi\left(b+2\right)\right) +\Gamma\left(b+2\right){}_3\tilde{F}_2^{\left(\{0,0,0\}, \{0,1\},0\right)} \left(\frac{1}{2},b+2,b+2;1,b+2;\frac{2a}{a+1}\right)\bigg)$$
I need to use this in an algorithm, but calculation of $\displaystyle {}_3\tilde{F}_2^{\left(\{0,0,0\}, \{0,1\},0\right)}$ takes time. So I am looking for some simpler expression.
Consider $\int_{-\pi}^\pi(1-a\cos\theta)^{-b-2}~d\theta$ ,
$\int_{-\pi}^\pi(1-a\cos\theta)^{-b-2}~d\theta$
$=\int_{-\pi}^0(1-a\cos\theta)^{-b-2}~d\theta+\int_0^\pi(1-a\cos\theta)^{-b-2}~d\theta$
$=\int_\pi^0(1-a\cos(-\theta))^{-b-2}~d(-\theta)+\int_0^\pi(1-a\cos\theta)^{-b-2}~d\theta$
$=\int_0^\pi(1-a\cos\theta)^{-b-2}~d\theta+\int_0^\pi(1-a\cos\theta)^{-b-2}~d\theta$
$=2\int_0^\pi(1-a\cos\theta)^{-b-2}~d\theta$
$=2\int_1^{-1}(1-ax)^{-b-2}~d(\cos^{-1}x)$
$=2\int_{-1}^1\dfrac{(1-ax)^{-b-2}}{\sqrt{1-x^2}}dx$
$=2\int_0^2\dfrac{(1-a(x-1))^{-b-2}}{\sqrt{1-(x-1)^2}}d(x-1)$
$=2\int_0^2x^{-\frac{1}{2}}(2-x)^{-\frac{1}{2}}(a+1-ax)^{-b-2}~dx$
$=2\int_0^1(2x)^{-\frac{1}{2}}(2-2x)^{-\frac{1}{2}}(a+1-2ax)^{-b-2}~d(2x)$
$=\dfrac{2}{(a+1)^{b+2}}\int_0^1x^{-\frac{1}{2}}(1-x)^{-\frac{1}{2}}\left(1-\dfrac{2ax}{a+1}\right)^{-b-2}~dx$
$=\dfrac{2\pi}{(a+1)^{b+2}}~_2F_1\left(b+2,\dfrac{1}{2};1;\dfrac{2a}{a+1}\right)$
$\therefore$ $\int_{-\pi}^\pi(1-a\cos\theta)^{-b-2}\log(1-a\cos\theta)d\theta$
$=\int^\pi_{-\pi}\left(-\dfrac{d}{db}\left(1-a\cos\theta\right)^{-b-2}\right)d\theta$
$=-2\pi\dfrac{d}{db}\left(\dfrac{1}{(a+1)^{b+2}}~_2F_1\left(b+2,\dfrac{1}{2};1;\dfrac{2a}{a+1}\right)\right)$