Exact(8)
Let (G_{x}) be the component of G consisting of all the edges and vertices which are contained in some path in G beginning at x.
For a graph G such that E ( G ) is symmetric and x is a vertex in G, the subgraph G x consisting of all edges and vertices which are contained in some path beginning at x is called the component of G containing x.
For a graph G such that E ( G ) is symmetric and x is a vertex in G, the subgraph G x consisting of all edges and vertices which are contained in some path beginning at x is called component of G containing x.
If G is such that (E(G)) is symmetric and x is a vertex in G, then the subgraph (G_{x}) consisting of all edges and vertices which are contained in some path beginning at x is called the component of G containing x.
Assume that G is such that E ( G ) is symmetric, and x is a vertex in G, then the subgraph G x consisting of all edges and vertices, which are contained in some path in G beginning at x, is called the component of G containing x.
By a subgraph of G, we mean a graph H satisfying V ( H ) ⊆ V ( G ) and E ( H ) ⊆ E ( G ) such that V ( H ) contains the vertices of all edges of E ( H ). If x ∈ V ( G ) and E ( G ) is symmetric, then the subgraph G x consisting of all edges and vertices that are contained in some path in G that starts at x is called the component of G containing x.
Similar(52)
These may appear in the direct path or in some feedback path.
It is not a straight path forward, to pursue a calling and yet we are all on that path in some way.
In the meantime, those honest people and voters who fought against dark times in Italy must find some path back toward the daylight.
Will they in some sort of sane upgrade path?
Since (e in S_{(u,langle i rangle )}) if and only if e is in some shortest path from s to ((u,langle i rangle )), we can prove this lemma.
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Since I tried Ludwig back in 2017, I have been constantly using it in both editing and translation. Ever since, I suggest it to my translators at ProSciEditing.

Justyna Jupowicz-Kozak
CEO of Professional Science Editing for Scientists @ prosciediting.com