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Classification of (1, s)-geometries fully embedded in PG(n, s), for s not equivalent to 2

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MLA
Cauchie, Sara. “Classification of (1, S)-geometries Fully Embedded in PG(n, S), for s Not Equivalent to 2.” JOURNAL OF COMBINATORIAL THEORY SERIES A 102.2 (2003): 383–400. Print.
APA
Cauchie, S. (2003). Classification of (1, s)-geometries fully embedded in PG(n, s), for s not equivalent to 2. JOURNAL OF COMBINATORIAL THEORY SERIES A, 102(2), 383–400.
Chicago author-date
Cauchie, Sara. 2003. “Classification of (1, S)-geometries Fully Embedded in PG(n, S), for s Not Equivalent to 2.” Journal of Combinatorial Theory Series A 102 (2): 383–400.
Chicago author-date (all authors)
Cauchie, Sara. 2003. “Classification of (1, S)-geometries Fully Embedded in PG(n, S), for s Not Equivalent to 2.” Journal of Combinatorial Theory Series A 102 (2): 383–400.
Vancouver
1.
Cauchie S. Classification of (1, s)-geometries fully embedded in PG(n, s), for s not equivalent to 2. JOURNAL OF COMBINATORIAL THEORY SERIES A. 2003;102(2):383–400.
IEEE
[1]
S. Cauchie, “Classification of (1, s)-geometries fully embedded in PG(n, s), for s not equivalent to 2,” JOURNAL OF COMBINATORIAL THEORY SERIES A, vol. 102, no. 2, pp. 383–400, 2003.
@article{415497,
  author       = {Cauchie, Sara},
  issn         = {0097-3165},
  journal      = {JOURNAL OF COMBINATORIAL THEORY SERIES A},
  language     = {eng},
  number       = {2},
  pages        = {383--400},
  title        = {Classification of (1, s)-geometries fully embedded in PG(n, s), for s not equivalent to 2},
  volume       = {102},
  year         = {2003},
}

Web of Science
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