References
- Brawer R, Pirovino M. The linear algebra of the Pascal matrix. Linear Algebra Appl. 1992;174:13–23.
- Call GS, Velleman DJ. Pascal's matrices. Amer Math Monthly. 1993;100(4): 372–376.
- Kim IP. LDU decomposition of an extension matrix of the Pascal matrix. Linear Algebra Appl. 2011;434(10):2187–2196.
- Stanimirović S. A generalization of the Pascal matrix and its properties. Facta Uni Ser Math Inform. 2011;26:17–27.
- Wang X. Some determinants of Pascal-like matrices. Quaest Math. 2012;35(2):171–180.
- Zhang Z, Liu M. An extension of the generalized Pascal matrix and its algebraic properties. Lin Algebra Appl. 1998;271(1-3):169–177.
- Zheng D-Y. Matrix methods for determinants of Pascal-like matrices. Lin Algebra Appl. 2019;577:94–113.
- Zheng D-Y, Akkus I, Kizilaslan G. The linear algebra of a Pascal-like matrix. Lin Mult Algebra. 2022;70(14):2629–2641.
- Roman S. Coding and information theory. New York: Springer-verlag; 1992.
- Tomlinson M, Tjhai CJ, A.Ambroze M, et al. Error-correction coding and decoding. Cham: Springer Open; 2017.
- Massey JL, Serconek S. Linear complexity of periodic sequences: a general theory, In N. Koblitz editor, Advances in Cryptology – Crypto '96. LNCS; Vol. 1109, 1996. p. 358–371.
- Cherchem A, Jamous A, Liu H, et al. Some new results on dimension and bose distance for various classes of BCH codes. Finite Fields Appl. 2020;65:101673.
- Li X, Yue Q. The hamming distances of repeated-root cyclic codes of length 5ps. Disc Appl Math. 2020;284:29–41.
- Mogilnykh IY, Solov'eva FI. On components of the Kerdock codes and the dual of the BCH code C1,3. Disc Math. 2020;343(2):111–668.
- Mazrooei M, Rahimi L, Sahami N. Two-dimensional generalized discrete Fourier transform and related quasi-cyclic Reed-Solomon codes. Turk J Math. 2018;42:349–359.
- Kwak JH, Hong S. Linear algebra. 2nd ed. Boston: Springer Science+Business Media; 2004.
- Granville A. Arithmetic properties of binomial coefficients. I. Binomial coefficients modulo prime powers. In Organic Mathematics, CMS Conf Proc Vol. 20, Burnaby (BC) 1995. p. 253–276, Amer Math Soc. 1997.
- Goldschmidt DM. Algebraic functions and projective curves. New York: Springer-Verlag; 2003.