In this section we will state the aim of rational homotopy theory. Moreover we will recall classical theorems from algebraic topology and deduce rational versions of them.
In order to define the tensor product $\pi_1(X)\tensor\Q$ we need that the fundamental group is abelian, the higher homotopy groups are always abelian. There is a more general approach using \Def{nilpotent groups}, which admit $\Q$-completions \cite{bousfield}. Since this is rather technical we will often restrict ourselves to such spaces or even simply connected spaces.
Note that a weak equivalence (and hence also a homotopy equivalence) is always a rational homotopy theory. Furthermore if $f: X \to Y$ is a map between rational spaces, then $f$ is a rational homotopy equivalence if and only if $f$ is a weak equivalence.
The theory of rational homotopy is the study of spaces with rational equivalences. Quillen defines a model structure on simply connected simplicial sets with rational equivalences as weak equivalences \cite{quillen}. This means that there is a homotopy category $\Ho^\Q(\sSet_1)$. However we will later prove that every simply connected space has a rationalization, so that $\Ho^\Q(\sSet_1)=\Ho(\sSet^\Q_1)$ are equivalent categories. This means that we do not need the model structure defined by Quillen, but we can simply restrict ourselves to rational spaces (with ordinary weak equivalences).
We will now recall known results from algebraic topology, without proof. One can find many of these results in basic text books, such as \cite{may, dold}.
(Whitehead) For any map $f: X \to Y$ between $1$-connected spaces, $\pi_i(f)$ is an isomorphism $\forall0 < i < r$ if and only if $H_i(f)$ is an isomorphism $\forall0 < i < r$.
The following two theorems can be found in textbooks about homological algebra such as \cite{weibel, rotman}. Note that when the degrees are left out, $H(X; A)$ denotes the graded homology module with coefficients in $A$.
0 \ar[r]& H(X; A) \tensor H(Y; A) \ar[r]& H(X \times Y; A) \ar[r]&\Tor_{\ast-1}(H(X; A), H(Y; A)) \ar[r]& 0
},\]
where $H(X; A)$ and $H(X; A)$ are considered as graded modules and their tensor product and torsion groups are graded. \todo{Geef algebraische versie voor ketencomplexen? en cohomology?}
The latter two theorems have a direct consequence for rational homotopy theory. By taking $A =\Q$ we see that the torsion groups vanish. We have the immediate corollary.
Let $f: X \to Y$ be a Serre fibration with fiber $F$, all $0$-connected with abelian fundamental group, then there is a natural long exact sequence of rational homotopy groups: