- Ragsdale conjecture
The Ragsdale conjecture is a mathematical
conjecture that concerns the possible arrangements of realalgebraic curves embedded in theprojective plane . It was proposed byVirginia Ragsdale several years after 1900 and was disproved in 1979 [O. Ya. Viro, Curves of degree , curves of degree , and the Ragsdale conjecture, Dokl. Akad. Nauk 254 (1980), 1305-1310 (Russian), English transl., Soviet Math. Dokl. 22 (1980), 566-570.] .Background
Her dissertation dealt with
Hilbert's sixteenth problem , which was proposed in the year 1900, along with 21 other unsolved problems of the 19th century. Ragsdale conjectured a particular upper bound on the number of topological circles of a certain type, along with the basis of evidence. The conjecture was held of high importance in the field of real algebraic geometry for nearly a century. LaterOleg Viro andIlya Itenberg producedcounterexamples to the Ragsdale conjecture, although the problem of finding a sharp upper bound remains unsolved.Conjecture
Ragsdale's main conjecture is as follows.
Assume that an
algebraic curve of degree 2"k" contains "p" even and "n" odd ovals. Ragsdale conjectured that:
She also posed the inequality
:
and showed that the inequality could not be further improved. This inequality was later proved by Petrovsky.
Notes
References
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