Matches in DBpedia 2015-10 for { ?s ?p "In algebraic geometry, given a reductive algebraic group G and a Borel subgroup B, a spherical variety is a G-variety with an open dense B-orbit. It is sometimes also assumed to be normal. Examples are flag varieties, symmetric space and (affine or projective) toric varieties.A projective spherical variety is a Mori dream space.Losev (2006) has shown that every "smooth" affine spherical variety is uniquely determined by its weight monoid. (see Brion for the definition of weight monoid.)"@en }
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- Spherical_variety abstract "In algebraic geometry, given a reductive algebraic group G and a Borel subgroup B, a spherical variety is a G-variety with an open dense B-orbit. It is sometimes also assumed to be normal. Examples are flag varieties, symmetric space and (affine or projective) toric varieties.A projective spherical variety is a Mori dream space.Losev (2006) has shown that every "smooth" affine spherical variety is uniquely determined by its weight monoid. (see Brion for the definition of weight monoid.)".
- Spherical_variety comment "In algebraic geometry, given a reductive algebraic group G and a Borel subgroup B, a spherical variety is a G-variety with an open dense B-orbit. It is sometimes also assumed to be normal. Examples are flag varieties, symmetric space and (affine or projective) toric varieties.A projective spherical variety is a Mori dream space.Losev (2006) has shown that every "smooth" affine spherical variety is uniquely determined by its weight monoid. (see Brion for the definition of weight monoid.)".