Pétréolle, M., Sokal, A. D., & Zhu, B. (2023). Lattice paths and branched continued fractions: An infinite sequence of generalizations of the Stieltjes-Rogers and Thron-Rogers polynomials, with coefficientwise Hankel-Total positivity. American Mathematical Society.
Chicago Style (17th ed.) CitationPétréolle, Mathias, Alan D. Sokal, and Bao-Xuan Zhu. Lattice Paths and Branched Continued Fractions: An Infinite Sequence of Generalizations of the Stieltjes-Rogers and Thron-Rogers Polynomials, with Coefficientwise Hankel-Total Positivity. Providence, RI: American Mathematical Society, 2023.
MLA (9th ed.) CitationPétréolle, Mathias, et al. Lattice Paths and Branched Continued Fractions: An Infinite Sequence of Generalizations of the Stieltjes-Rogers and Thron-Rogers Polynomials, with Coefficientwise Hankel-Total Positivity. American Mathematical Society, 2023.