Gluing lemma for open subsets: Difference between revisions

Statement

Let ${\displaystyle \{U_i{\}}_{i\in I}}$ be an open cover of a topological space ${\displaystyle X}$, and ${\displaystyle f_i:U_i\to Y}$ be continuous maps, such that for ${\displaystyle x\in U_i\cap U_j}$ we have ${\displaystyle f_i(x)=f_j(x)}$.

Then there exists a unique map ${\displaystyle f:X\to Y}$ such that ${\displaystyle f{|}_{U_i}=f_i}$.

This is the proof that the presheaf of continuous functions to ${\displaystyle Y}$, is actually a sheaf.

Related results

• Gluing lemma for closed subsets

Proof

The key facts used in the proof are:

• A map of topological spaces is continuous iff the inverse image of any open set is open
• An open subset of an open subset is open in the whole space
• An arbitrary union of open subsets is open