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Grassmannians of arbitrary rank

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Abstract
We introduce a generalization of Grassmannians of projective spaces that allows us to consider subspaces of any (possibly infinite) rank as points of the Grassmannian. We show that the spaces that we obtain, carry in a natural way the structure of a twin building.

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Citation

Please use this url to cite or link to this publication:

MLA
Huggenberger, Simon. “Grassmannians of Arbitrary Rank.” BULLETIN OF THE BELGIAN MATHEMATICAL SOCIETY-SIMON STEVIN, vol. 23, no. 3, 2016, pp. 321–43.
APA
Huggenberger, S. (2016). Grassmannians of arbitrary rank. BULLETIN OF THE BELGIAN MATHEMATICAL SOCIETY-SIMON STEVIN, 23(3), 321–343.
Chicago author-date
Huggenberger, Simon. 2016. “Grassmannians of Arbitrary Rank.” BULLETIN OF THE BELGIAN MATHEMATICAL SOCIETY-SIMON STEVIN 23 (3): 321–43.
Chicago author-date (all authors)
Huggenberger, Simon. 2016. “Grassmannians of Arbitrary Rank.” BULLETIN OF THE BELGIAN MATHEMATICAL SOCIETY-SIMON STEVIN 23 (3): 321–343.
Vancouver
1.
Huggenberger S. Grassmannians of arbitrary rank. BULLETIN OF THE BELGIAN MATHEMATICAL SOCIETY-SIMON STEVIN. 2016;23(3):321–43.
IEEE
[1]
S. Huggenberger, “Grassmannians of arbitrary rank,” BULLETIN OF THE BELGIAN MATHEMATICAL SOCIETY-SIMON STEVIN, vol. 23, no. 3, pp. 321–343, 2016.
@article{1256019,
  abstract     = {{We introduce a generalization of Grassmannians of projective spaces that allows us to consider subspaces of any (possibly infinite) rank as points of the Grassmannian. We show that the spaces that we obtain, carry in a natural way the structure of a twin building.}},
  author       = {{Huggenberger, Simon}},
  issn         = {{1370-1444}},
  journal      = {{BULLETIN OF THE BELGIAN MATHEMATICAL SOCIETY-SIMON STEVIN}},
  language     = {{eng}},
  number       = {{3}},
  pages        = {{321--343}},
  title        = {{Grassmannians of arbitrary rank}},
  volume       = {{23}},
  year         = {{2016}},
}

Web of Science
Times cited: