Khovanov-Rozansky homology is a triply graded homology theory that has been the subject of much study in recent years. In a remarkable paper, Hogancamp and Mellit computed the KR-homology of (m,n)-torus knots and proved that the Poincare polynomials specialized to the so-called rational (q,t)-Catalan polynomials. These polynomials generalize the famous Catalan numbers and had been independently studied by combinatorialists for many years. A big open question is computing this homology theory for all algebraic links. In this talk, I will discuss joint work with Caprau, Hogancamp, and Mazin where we provide a purely combinatorial method of computing the KR-homology for the so-called Coxeter knots. This family includes all toric knots, but is strictly larger. In particular, we define the new triangular Schroder polynomials, which specialize to the triangular (q,t)-Catalan polynomials of Blasiak-Haiman-Morse-Pun-Seelinger, and coincide with the Poincare polynomials of the Coxeter knots. As a consequence, we obtain a proof of a conjecture of Oblomkov-Rasmussen-Shende for certain cabled toris knots and a triangular generalization of Haglund’s (q,t)-Schroder Theorem.