From \dim M_r=\dim M-r we get \dim R/(a_1,\dots,a_r,\operatorname{Ann}M)=\dim R/\operatorname{Ann}M−r. If R is Cohen-Macaulay then \operatorname{ht}(a_1,\dots,a_r,\operatorname{Ann}M) = \operatorname{ht}(\operatorname{Ann}M) + r ...

\def\dto{\xrightarrow{\mathrm{d}}}\def\vec{\boldsymbol}First, because L(a; \vec{x}) = f_{\vec{X}}(\vec{x}; a) = \prod_{k = 1}^n \frac{x_k}{a} \exp\left( -\frac{x_k^2}{2a} \right) = \frac{1}{a^n} \left( \prod_{k = 1}^n x_k \right) \exp\left( -\frac{1}{2a} \sum_{k = 1}^n x_k^2 \right),\\ l(a; \vec{x}) = \ln(L(a; \vec{x})) = -\frac{1}{2a} \sum_{k = 1}^n x_k^2 - n \ln a + \sum_{k = 1}^n \ln x_k, ...

Here's a sketch. The details it leaves to be checked are fairly straightforward, I hope. Let g:\text{im}(f)\to C be the inclusion map. There is a short exact sequence of complexes 0\to\ker(f)[-1]\to\text{cone}(f)\to\text{cone}(g)\to0, ...

Unfortunately, it's not true. The problem lies in your interpretation of the left hand side; it should rather be "everything that's R_i-linear for some i". For a counter example, let R_i=\mathbf Z[x_i, x_{i+1}, \dots] ...

My best guess, given the context, is that the white space should be read as is a variable of . The horizontal line means that the statement below it can be derived from the one above it. Thus, the ...

g(x) + c\operatorname{Id}(x) is exactly the same as g(x) + cx because \operatorname{Id}(x) = x for all x in your domain. However, g+c\operatorname{Id} is not the same as g+c. Technically ...