Varieties are sometimes called closed sets and some authors call an open subset of a projective variety a quasiprojective variety. The latter term is in an attempt to unify the concept of affine and projective variety.
No! no—if Charles has done nothing false or mean, I shall compound for his extravagance
Oh, I know he's a good fellow—you needn't frown—an excellent fellow, and I always mean to see more of him; but a hide-bound pedant for all that; an ignorant blatant pedant.
And now, have at the Ministry, Damme!
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