Tychonoff's Theorem for Hausdorff Spaces

Theorem
Let $\left \langle {X_i}\right \rangle_{i \in I}$ be a family of non-empty Hausdorff spaces, where $I$ is an arbitrary index set.

Let $\displaystyle X = \prod_{i \mathop \in I} X_i$ be the corresponding product space.

Then $X$ is compact iff each $X_i$ is compact.

Proof
First assume that $X$ is compact.

From Projection from Product Topology is Continuous, the projections $\operatorname{pr}_i : X \to X_i$ are continuous.

From Continuous Image of Compact Space is Compact, it follows that the $X_i$ are compact.

Assume now that each $X_i$ is compact.

By Equivalent Definitions of Compactness it is enough to show that every ultrafilter on $X$ converges.

Thus let $\mathcal F$ be an ultrafilter on $X$.

From Image of Ultrafilter is Ultrafilter, for each $i \in I$, the image filter $\operatorname{pr}_i \left({\mathcal F}\right)$ is an ultrafilter on $X_i$.

Each $X_i$ is compact by assumption.

So by Equivalent Definitions of Compactness, each $\operatorname{pr}_i \left({\mathcal F}\right)$ converges.

By Filter on Product of Hausdorff Spaces Converges iff Projections Converge, $\mathcal F$ converges.

Also see

 * Tychonoff's Theorem