More Like this

1. (2757) Proposal to reject the name Antiarideae ( Moraceae )

   https://doi.org/10.1002/tax.12304  

   Gardner, Elliot M.; Zerega, Nyree J.C.; Monro, Alexandre K. (August 2020, TAXON)
2. Corrigendum to: The global Microcystis interactome

   https://doi.org/10.1002/lno.11767  

   Cook, K.V.; Li, C.; Cai, H.; Krumholz, L.R.; Hambright, K.D.; Paerl, H.W.; Steffen, M.M.; Wilson, A.E.; Burford, M.A.; Grossart, H.‐P.; et al (June 2021, Limnology and Oceanography)
3. (2788) Proposal to reject the name Radermachia rotunda ( Artocarpus rotundus ) ( Moraceae )

   https://doi.org/10.1002/tax.12402  

   Gardner, Elliot M.; Zerega, Nyree J.C. (December 2020, TAXON)
4. (3078) Proposal to conserve the name Sonerila , nom. cons. against Codigi ( Melastomataceae )

   https://doi.org/10.1002/tax.13335  

   Sekarathil, Resmi; Nampy, Santhosh; Cellinese, Nico; Kaliyamurthy, Karthigeyan (April 2025, TAXON)
5. On the extension of the FKG inequality to n functions

   https://doi.org/10.1063/5.0065285  

   Lieb, Elliott H.; Sahi, Siddhartha (April 2022, Journal of Mathematical Physics)

   The 1971 Fortuin–Kasteleyn–Ginibre inequality for two monotone functions on a distributive lattice is well known and has seen many applications in statistical mechanics and other fields of mathematics. In 2008, one of us (Sahi) conjectured an extended version of this inequality for all n > 2 monotone functions on a distributive lattice. Here, we prove the conjecture for two special cases: for monotone functions on the unit square in [Formula: see text] whose upper level sets are k-dimensional rectangles and, more significantly, for arbitrary monotone functions on the unit square in [Formula: see text]. The general case for [Formula: see text], remains open. 

   more » « less