open cover

Then for all this is also an open cover of .

Open cover - the most flexible if you move goods regularly.

Thus we have a partition of unity subordinate to the original open cover.

A space is compact if every open cover has a finite subcover.

The diploma is handed over full size in an open cover (not rolled-up).

That is, every point finite open cover is interior preserving.

X is fully normal if every open cover has an open star refinement.

Annual policies - less flexible than open cover.

An open cover is a cover consisting of open sets.

Every open cover of X has a finite subcover.

Any open cover of a paracompact space is numerable.

It lives in warm limestone-based areas with fairly open covers of shrubs and trees.

It fell with opened cover near Weston's feet.

The Leray condition on an open cover ensures that the cover in question is already "fine enough."

The opening cover end contains the following information:

One array inside the open cover and another on top of a stack of four others are exposed to solar winds at all times.

Thus one chooses either to have the supports indexed by the open cover, or compact supports.

Since is compact and is an open cover of it, we can extract a finite cover.

Grothendieck topologies axiomatize the notion of an open cover.

Every finite topological space is compact since any open cover must already be finite.

A topological space X is coherent with every open cover of X.

Paracompact, if every open cover admits a locally finite open refinement.

A forwarder's open policy - similar to open cover, but is linked to a specific freight forwarder.

Formally, a topological space X is called compact if each of its open covers has a finite subcover.

If in addition the open cover can be chosen to be finite, then f is called of finite type.