Proof

For the first property: Given $A_\bullet$ a tower of abelian groups, write

for the homomorphism from def. regarded as the single non-trivial differential in a cochain complex of abelian groups. Then by remark and def. we have $H^0(L(A_\bullet)) \simeq \underset{\longleftarrow}{\lim} A_\bullet$ and $H^1(L(A_\bullet)) \simeq \underset{\longleftarrow}{\lim}^1 A_\bullet$.

With this, then for a short exact sequence of towers $0 \to A_\bullet \to B_\bullet \to C_\bullet \to 0$ the long exact sequence in question is the long exact sequence in homology of the corresponding short exact sequence of complexes

For the second statement: If all the $f_k$ are surjective, then inspection shows that the homomorphism $\partial$ in def. is surjective. Hence its cokernel vanishes.

Proof

The functor $(-)_n \colon Ab^{(\mathbb{N}, \geq)} \to Ab$ that picks the $n$-th component of the tower has a right adjoint $r_n$, which sends an abelian group $A$ to the tower

Since $(-)_n$ itself is evidently an exact functor, its right adjoint preserves injective objects (prop.).

So with $A_\bullet \in Ab^{(\mathbb{N}, \geq)}$, let $A_n \hookrightarrow \tilde A_n$ be an injective resolution of the abelian group $A_n$, for each $n \in \mathbb{N}$. Then

is an injective resolution for $A_\bullet$.

Proof

By lemma there are enough injectives in $Ab^{(\mathbb{N}, \geq)}$. So for $A_\bullet \in Ab^{(\mathbb{N}, \geq)}$ the given tower of abelian groups, let

be an injective resolution. We need to show that

Since limits preserve kernels, this is equivalently

Now observe that each injective $J^q_\bullet$ is a tower of epimorphism. This follows by the defining right lifting property applied against the monomorphisms of towers of the following form

Therefore by the second item of prop. the long exact sequence from the first item of prop. applied to the short exact sequence

becomes

Exactness of this sequence gives the desired identification $\underset{\longleftarrow}{\lim}^1 A_\bullet \simeq (\underset{\longleftarrow}{\lim}(ker(j^2)_\bullet))/im(\underset{\longleftarrow}{\lim}(j^1)) \,.$

Proof

The proof of prop. only used the conditions from prop. , hence any functor satisfying these conditions is the first right derived functor of $\underset{\longleftarrow}{\lim}$, up to natural isomorphism.

Proof idea

One needs to show that with the Mittag-Leffler condition, then the cokernel of $\partial$ in def. vanishes, hence that $\partial$ is an epimorphism in this case, hence that every $(a_n)_{n \in \mathbb{N}} \in \underset{n}{\prod} A_n$ has a preimage under $\partial$. So use the Mittag-Leffler condition to find pre-images of $a_n$ by induction over $n$.

Proof

Consider the homomorphism

which sends $a_n \in A_n$ to $a_n - f_n(a_n)$. Its cokernel is the colimit over the cotower, but its kernel is trivial (in contrast to the otherwise formally dual situation in remark ). Hence (as opposed to the long exact sequence in def. ) there is a short exact sequence of the form

Every short exact sequence gives rise to a long exact sequence of derived functors (prop.) which in the present case starts out as

where we used that direct sum is the coproduct in abelian groups, so that homs out of it yield a product, and where the morphism $\partial$ is the one from def. corresponding to the tower

Hence truncating this long sequence by forming kernel and cokernel of $\partial$, respectively, it becomes the short exact sequence in question.

Proof

With respect to the classical model structure on simplicial sets or the classical model structure on topological spaces, a tower of fibrations as stated is a fibrant object in the injective model structure on functors $[(\mathbb{N},\geq), sSet]_{inj}$ ($[(\mathbb{N},\geq), Top]_{inj}$) (prop). Hence the plain limit over this diagram represents the homotopy limit. By the discussion there, up to weak equivalence that homotopy limit is also the pullback in

where on the right we have the product over all the canonical fibrations out of the path space objects. Hence also the left vertical morphism is a fibration, and so by taking its fiber over a basepoint, the pasting law gives a homotopy fiber sequence

The long exact sequence of homotopy groups of this fiber sequence goes

Chopping that off by forming kernel and cokernel yields the claim for positive $q$. For $q = 0$ it follows by inspection.

Proof

For

the sequence of stages of the (pointed) CW-complex $X = \underset{\longleftarrow}{\lim}_n X_n$, write

for the disjoint unions of the cylinders over all the stages in even and all those in odd degree, respectively.

These come with canonical inclusion maps into the mapping telescope $Tel(X_\bullet)$ (def.), which we denote by

Observe that

1. $A_X \cup B_X \simeq Tel(X_\bullet)$;

2. $A_X \cap B_X \simeq \underset{n \in \mathbb{N}}{\sqcup} X_n$;

and that there are homotopy equivalences

1. $A_X \simeq \underset{n \in \mathbb{N}}{\sqcup} X_{2n+1}$

2. $B_X \simeq \underset{n \in \mathbb{N}}{\sqcup} X_{2n}$

3. $Tel(X_\bullet) \simeq X$.

The first two are obvious, the third is this proposition.

This implies that the Mayer-Vietoris sequence (prop.) for $\tilde E^\bullet$ on the cover $A \sqcup B \to X$ is isomorphic to the bottom horizontal sequence in the following diagram:

hence that the bottom sequence is also a long exact sequence.

To identify the morphism $\partial$, notice that it comes from pulling back $E$-cohomology classes along the inclusions $A \cap B \to A$ and $A\cap B \to B$. Comonentwise these are the inclusions of each $X_n$ into the left and the right end of its cylinder inside the mapping telescope, respectively. By the construction of the mapping telescope, one of these ends is embedded via $i_n \colon X_n \hookrightarrow X_{n+1}$ into the cylinder over $X_{n+1}$. In conclusion, $\partial$ acts by

(The relative sign is the one in $(\iota_{A_x})^\ast - (\iota_{B_x})^\ast$ originating in the definition of the Mayer-Vietoris sequence and properly propagated to the bottom sequence while ensuring that $\tilde E^\bullet(X)\to \prod_n \tilde E^\bullet(X_n)$ is really $(i_n^\ast)_n$ and not $(-1)^n(i_n^\ast)_n$, as needed for the statement to be proven.)

This is the morphism from def. for the sequence

Hence truncating the above long exact sequence by forming kernel and cokernel of $\partial$, the result follows via remark and definition .

Proof

By prop. the assumption implies that the $lim^1$-term in prop. vanishes, hence by exactness it follows that in this case there is an isomorphism