Good

Good may refer to:

Common meanings

Companies

Arts and entertainment

Other uses

See also

Good (play)

Good is an award-winning play in two acts written by British playwright Cecil Philip Taylor. First published for Methuen Drama in 1982, it was originally commissioned by the Royal Shakespeare Company in 1981 and was subsequently seen all over the world.Good has been described as the definitive piece written about the Holocaust in the English-speaking theatre. Set in pre-war Germany, it shows how John Halder, a liberal-minded professor whose best friend is the Jewish Maurice, could not only be seduced into joining the Nazism, but step-by-rationalised-step end up embracing the final solution justifying to his conscience the terrible actions.

Plot overview

Good (Morphine album)

Good is the first album recorded by the Boston based alternative rock trio Morphine. It was originally released in 1992 on the Accurate label, and then re-released by Rykodisc in 1993.

Track listing

All songs written by Mark Sandman (except as noted).

Personnel

References

End

End or Ending may refer to:

End

END

Ending

See also

Conclusion (music)

In music, the conclusion is the ending of a composition and may take the form of a coda or outro.

Pieces using sonata form typically use the recapitulation to conclude a piece, providing closure through the repetition of thematic material from the exposition in the tonic key. In all musical forms other techniques include "altogether unexpected digressions just as a work is drawing to its close, followed by a return...to a consequently more emphatic confirmation of the structural relations implied in the body of the work."

For example:

End (graph theory)

In the mathematics of infinite graphs, an end of a graph represents, intuitively, a direction in which the graph extends to infinity. Ends may be formalized mathematically as equivalence classes of infinite paths, as havens describing strategies for pursuit-evasion games on the graph, or (in the case of locally finite graphs) as topological ends of topological spaces associated with the graph.

Ends of graphs may be used (via Cayley graphs) to define ends of finitely generated groups. Finitely generated infinite groups have one, two, or infinitely many ends, and the Stallings theorem about ends of groups provides a decomposition for groups with more than one end.

Definition and characterization

Ends of graphs were defined by Rudolf Halin (1964) in terms of equivalence classes of infinite paths. A ray in an infinite graph is a semi-infinite simple path; that is, it is an infinite sequence of vertices v₀, v₁, v₂, ... in which each vertex appears at most once in the sequence and each two consecutive vertices in the sequence are the two endpoints of an edge in the graph. According to Halin's definition, two rays r₀ and r₁ are equivalent if there is another ray r₂ (not necessarily different from either of the first two rays) that contains infinitely many of the vertices in each of r₀ and r₁. This is an equivalence relation: each ray is equivalent to itself, the definition is symmetric with regard to the ordering of the two rays, and it can be shown to be transitive. Therefore, it partitions the set of all rays into equivalence classes, and Halin defined an end as one of these equivalence classes.