Carmichaelia torulosa
Carmichaelia torulosa is a species of legume in the family Fabaceae. It is found only in New Zealand.
| Carmichaelia torulosa | |
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| Species: | C. torulosum |
| Binomial name | |
| Carmichaelia torulosum | |
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Notospartium torulosum Kirk | |
Conservation status
The IUCN redlist lists it as "near threatened", with the major threat being habitat loss.[4] The New Zealand Threat Classification System (NZTCS) listed it as "Threatened - Nationally Endangered" in 2013, and in 2017 as "Threatened - Nationally Critical".[1]
gollark: I mean, what do you expect to happen if you do something unsupported and which creates increasingly large problems each time you do it?
gollark: <@151391317740486657> Do you know what "unsupported" means? PotatOS is not designed to be used this way.
gollark: Specifically, 22 bytes for the private key and 21 for the public key on ccecc.py and 25 and 32 on the actual ingame one.
gollark: <@!206233133228490752> Sorry to bother you, but keypairs generated by `ccecc.py` and the ECC library in use in potatOS appear to have different-length private and public keys, which is a problem.EDIT: okay, apparently it's because I've been accidentally using a *different* ECC thing from SMT or something, and it has these parameters instead:```---- Elliptic Curve Arithmetic---- About the Curve Itself-- Field Size: 192 bits-- Field Modulus (p): 65533 * 2^176 + 3-- Equation: x^2 + y^2 = 1 + 108 * x^2 * y^2-- Parameters: Edwards Curve with c = 1, and d = 108-- Curve Order (n): 4 * 1569203598118192102418711808268118358122924911136798015831-- Cofactor (h): 4-- Generator Order (q): 1569203598118192102418711808268118358122924911136798015831---- About the Curve's Security-- Current best attack security: 94.822 bits (Pollard's Rho)-- Rho Security: log2(0.884 * sqrt(q)) = 94.822-- Transfer Security? Yes: p ~= q; k > 20-- Field Discriminant Security? Yes: t = 67602300638727286331433024168; s = 2^2; |D| = 5134296629560551493299993292204775496868940529592107064435 > 2^100-- Rigidity? A little, the parameters are somewhat small.-- XZ/YZ Ladder Security? No: Single coordinate ladders are insecure, so they can't be used.-- Small Subgroup Security? Yes: Secret keys are calculated modulo 4q.-- Invalid Curve Security? Yes: Any point to be multiplied is checked beforehand.-- Invalid Curve Twist Security? No: The curve is not protected against single coordinate ladder attacks, so don't use them.-- Completeness? Yes: The curve is an Edwards Curve with non-square d and square a, so the curve is complete.-- Indistinguishability? No: The curve does not support indistinguishability maps.```so I might just have to ship *two* versions to keep compatibility with old signatures.
gollark: > 2. precompilation to lua bytecode and compressionThis was considered, but the furthest I went was having some programs compressed on disk.
References
- de Lange, P.J. et al. (2017) "Conservation status of New Zealand indigenous vascular plants, 2017" (PDF). p. 9.
- Heenan PB. (1998). "An emended circumscription of Carmichaelia, with new combinations, a key, and notes on hybrids". New Zealand Journal of Botany. 36 (1): 53–63. doi:10.1080/0028825X.1998.9512546. ISSN 0028-825X.
- "Carmichaelia torulosa (Kirk) Heenan | Plants of the World Online | Kew Science". Plants of the World Online. Retrieved 15 November 2019.
- de Lange PJ. 1998. Notospartium torulosum. 2006 IUCN Red List of Threatened Species Archived June 27, 2014, at the Wayback Machine. Downloaded on 19 July 2007.
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