Combining Maxim's suggestion to define the 0^{th} coefficient of the Trilogarithm series to be zero and ysharifi's given proof here on AoPS it is rather simple to obtain the given expansion. ...

\operatorname{Supp}M/xM=V(\operatorname{Ann}M/xM); \operatorname{Supp}M/xM=\operatorname{Supp}(R/xR\otimes_R M)=V(x)\cap\operatorname{Supp}M=V(xR+\operatorname{Ann}M); V(\operatorname{Ann}M/xM)=V(xR+\operatorname{Ann}M) ...

I confirm the part corresponding to Silverman's book: in there \operatorname{Ker}(f) for f: X\to Y an isogeny of elliptic curves means the set of \bar K-points of X that go to 0\in Y. This ...

Suppose we are given only \boldsymbol Z = (Z_1, \ldots, Z_n), and we wish to find the MLE for the parameter \theta. Then each Z_i \sim {\rm Bernoulli}(p_i), where p_i = \Pr[Z_i = 1] = \Pr[X_i > 1] = e^{-1/\theta}. ...

Mathematica gives f''(0)=\frac{\pi \left(\pi \Gamma \left(\frac{2}{3}\right)^2-4 \sqrt[6]{3} \zeta (3)\right)}{\Gamma \left(\frac{1}{3}\right)} \approx -0.0162334, and continuity implies that ...

If \beta is an integer then from \Gamma(z+1) = z\Gamma(z) we have \frac{\Gamma(x+\beta)}{\Gamma(x)} = \prod_{k=0}^{\beta-1} (x+k). Otherwise we can use the monotonicity of \Gamma can ...