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- Q7661183 subject Q7451646.
- Q7661183 subject Q8234869.
- Q7661183 abstract "In mathematics, the symbolic method in invariant theory is an algorithm developed by Cayley (1846), Siegfried Heinrich Aronhold (1858), Alfred Clebsch (1861), and Paul Gordan (1887) in the 19th century for computing invariants of algebraic forms. It is based on treating the form as if it were a power of a degree one form, which corresponds to embedding a symmetric power of a vector space into the symmetric elements of a tensor product of copies of it.".
- Q7661183 wikiPageExternalLink purl?PPN600493962_0001.
- Q7661183 wikiPageExternalLink books?isbn=978-0-8284-0328-3.
- Q7661183 wikiPageExternalLink purl?GDZPPN00215028X.
- Q7661183 wikiPageExternalLink purl?PPN243919689_0059.
- Q7661183 wikiPageExternalLink S0273-0979-1984-15188-7.
- Q7661183 wikiPageWikiLink Q1055314.
- Q7661183 wikiPageWikiLink Q1368270.
- Q7661183 wikiPageWikiLink Q1474074.
- Q7661183 wikiPageWikiLink Q1855669.
- Q7661183 wikiPageWikiLink Q188211.
- Q7661183 wikiPageWikiLink Q395.
- Q7661183 wikiPageWikiLink Q7451646.
- Q7661183 wikiPageWikiLink Q8234869.
- Q7661183 wikiPageWikiLink Q8366.
- Q7661183 wikiPageWikiLink Q912887.
- Q7661183 comment "In mathematics, the symbolic method in invariant theory is an algorithm developed by Cayley (1846), Siegfried Heinrich Aronhold (1858), Alfred Clebsch (1861), and Paul Gordan (1887) in the 19th century for computing invariants of algebraic forms. It is based on treating the form as if it were a power of a degree one form, which corresponds to embedding a symmetric power of a vector space into the symmetric elements of a tensor product of copies of it.".
- Q7661183 label "Symbolic method".