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- aggregation classification "A1".
- aggregation creator person.
- aggregation date "2010".
- aggregation format "application/pdf".
- aggregation hasFormat 1105471.bibtex.
- aggregation hasFormat 1105471.csv.
- aggregation hasFormat 1105471.dc.
- aggregation hasFormat 1105471.didl.
- aggregation hasFormat 1105471.doc.
- aggregation hasFormat 1105471.json.
- aggregation hasFormat 1105471.mets.
- aggregation hasFormat 1105471.mods.
- aggregation hasFormat 1105471.rdf.
- aggregation hasFormat 1105471.ris.
- aggregation hasFormat 1105471.txt.
- aggregation hasFormat 1105471.xls.
- aggregation hasFormat 1105471.yaml.
- aggregation isPartOf urn:issn:1081-3810.
- aggregation language "eng".
- aggregation rights "I have transferred the copyright for this publication to the publisher".
- aggregation subject "Mathematics and Statistics".
- aggregation title "Some subspaces of the projective space PG(Lambda(K) V) related to regular spreads of PG(V)".
- aggregation abstract "Let V be a 2m-dimensional vector space over a field F (m >= 2) and let k is an element of {1, ... , 2m - 1}. Let A(2m-1,k) denote the Grassmannian of the (k - 1)-dimensional subspaces of PG(V) and let e(gr) denote the Grassmann embedding of A(2m-1,k) into PG(Lambda(k) V). Let S be a regular spread of PG(V) and let X-S denote the set of all ( k - 1)-dimensional subspaces of PG(V) which contain at least one line of S. Then we show that there exists a subspace Sigma of PG(Lambda(k) V) for which the following holds: (1) the projective dimension of Sigma is equal to ((2m)(k)) - 2 . ((m)(k)) - 1; (2) a (k - 1)-dimensional subspace alpha of PG(V) belongs to X-S if and only if e(gr)(alpha) is an element of Sigma; (3) Sigma is generated by all points e(gr)(p), where p is some point of X-S.".
- aggregation authorList BK691248.
- aggregation endPage "366".
- aggregation startPage "354".
- aggregation volume "20".
- aggregation aggregates 1105482.
- aggregation isDescribedBy 1105471.
- aggregation similarTo LU-1105471.