On \(q\)-analog of Wolstenholme type congruences for multiple harmonic sums (Q2855601)

In this interesting paper, the author studies generating functions and \(q\)-congruences for \(q\)-analogs of multiple harmonic sums of arbitrary depth in the homogeneous case using properties of the cyclotomic polynomials, degenerate Bernoulli numbers and shuffle relations. The author obtains several \(q\)-congruences that extend previous results on \(q\)-analogs of these sums in depth one by \textit{L.-L. Shi} and \textit{H. Pan} [Am. Math. Mon. 114, No. 6, 529--531 (2007; Zbl 1193.11018)] and by \textit{K. Dilcher} [Electron. J. Comb. 15, No. 1, Research Paper R63, 18 p. (2008; Zbl 1206.11024)]. Further development on the subject can be found in the reviewer's paper (jointly with \textit{Kh. Hessami Pilehrood} and \textit{R. Tauraso} [``Some \(q\)-congruences for homogeneous and quasi-homogeneous multiple \(q\)-harmonic sums'', \url{arXiv:1406.4022v3} [math.CO]]).