(2/23)(3/23)(4/23)(5/23)(6/23)(7/23)(8/23)(9/23... -

: Specifically in Symmetric Presentations of Finite Groups , where researchers often deal with products of generators and fractional relations [25].

∏n=2kn23=k!23k−1product from n equals 2 to k of n over 23 end-fraction equals the fraction with numerator k exclamation mark and denominator 23 raised to the k minus 1 power end-fraction For the specific terms you listed (up to : (2/23)(3/23)(4/23)(5/23)(6/23)(7/23)(8/23)(9/23...

While this specific sequence does not appear to be the subject of a singular famous article, this type of notation is common in several fields: : Specifically in Symmetric Presentations of Finite Groups

: Often used in Bayesian inference or distribution models where each step reduces the remaining probability space [13]. (2/23)(3/23)(4/23)(5/23)(6/23)(7/23)(8/23)(9/23...