The definition of length for an element in a Coxeter group was generalized by Perkins and Rowley [7] to assign a length to subsets of a Coxeter group. Here the lengths of irreducible parabolic subgroups of finite Coxeter groups are determined.
Hart, S. B., & Rowley, P. J. (2011). LENGTHS OF PARABOLIC SUBGROUPS IN FINITE COXETER GROUPS. International Electronic Journal of Algebra, 9(9), 10-37.
AMA
Hart SB, Rowley PJ. LENGTHS OF PARABOLIC SUBGROUPS IN FINITE COXETER GROUPS. IEJA. June 2011;9(9):10-37.
Chicago
Hart, Sarah B., and Peter J. Rowley. “LENGTHS OF PARABOLIC SUBGROUPS IN FINITE COXETER GROUPS”. International Electronic Journal of Algebra 9, no. 9 (June 2011): 10-37.
EndNote
Hart SB, Rowley PJ (June 1, 2011) LENGTHS OF PARABOLIC SUBGROUPS IN FINITE COXETER GROUPS. International Electronic Journal of Algebra 9 9 10–37.
IEEE
S. B. Hart and P. J. Rowley, “LENGTHS OF PARABOLIC SUBGROUPS IN FINITE COXETER GROUPS”, IEJA, vol. 9, no. 9, pp. 10–37, 2011.
ISNAD
Hart, Sarah B. - Rowley, Peter J. “LENGTHS OF PARABOLIC SUBGROUPS IN FINITE COXETER GROUPS”. International Electronic Journal of Algebra 9/9 (June 2011), 10-37.
JAMA
Hart SB, Rowley PJ. LENGTHS OF PARABOLIC SUBGROUPS IN FINITE COXETER GROUPS. IEJA. 2011;9:10–37.
MLA
Hart, Sarah B. and Peter J. Rowley. “LENGTHS OF PARABOLIC SUBGROUPS IN FINITE COXETER GROUPS”. International Electronic Journal of Algebra, vol. 9, no. 9, 2011, pp. 10-37.
Vancouver
Hart SB, Rowley PJ. LENGTHS OF PARABOLIC SUBGROUPS IN FINITE COXETER GROUPS. IEJA. 2011;9(9):10-37.