Proof

Observe that isomorphisms $f \,\colon\, P \xrightarrow{\;} P'$ between principal bundles over $X$ are equivalently global sections of the fiber bundle $(P \times_X P')/G$:

Here, from left to right, the dashed section follows by the universal property of the quotient space $X = P/G$. From right to left, the top morphism follows by pullback along the dashed section, using that

1. the bundle projections are effective epimorphisms by local triviality,

2. their kernel pairs are as shown, by principality,

3. compactly generated topological spaces form a regular category (by this Prop.),

4. in a regular category pullback preserves effective epimorphisms (this Prop.) and, of course, their kernel pairs.

In particular, for every $P$ the identity morphism on it corresponds to the canonical section of $(P \times_X P)/G$.

In the given situation, this means that we have a canonical local section $\sigma_0$ making the following solid diagram commute, exhibiting that the restriction of the bundle $P_0 \times [0,1]$ to $\{0\} \subset [0,1]$ is isomorphic to $P_0$, by construction:

Now

• assuming the first condition:

  1. the right vertical map is a Serre fibration, as all locally trivial fiber bundles are Serre fibrations (by this Prop.);

  2. the left vertical map is a Serre-Quillen-acyclic cofibration – since (see this Prop.) it is the product $id_X \times (D^0 \hookrightarrow D^0 \times [0,1] )$ of the cofibrant object $X$ with a generating acyclic cofibration (see this Def.) –, hence is a Serre-Quillen-acyclic cofibration and as such has the left lifting property against the right map;

or

• assuming the second condition:

  1. the right vertical map is a Hurewicz fibration, by this Prop.,

  2. hence it has the right lifting property against the left map, by definition of Hurewicz fibrations.

In either case, this implies that a lift exists, as shown by the dashed arrow above.

The resulting commutativity of the bottom right triangle says that this lift is a global section which hence exhibits an isomorphism of principal bundles (over $X \times [0,1]$) of this form:

The restriction of this isomorphism to $\{1\} \subset [0,1]$ is hence an isomorphism of the form $P_1 \,\simeq_X\, P_0$, as required.