Buradasınız

Anasayfa » Content

Observations on Some Special Matrices and Polynomials

Journal Name:

  • European Journal of Pure and Applied Mathematics

Publication Year:

  • 2015

Key Words:

Author NameUniversity of AuthorFaculty of Author
Abstract (2. Language): 
In the current paper we focus on the study of three special matrices and two symmetric polynomials. As a consequence, a recurrence relation satisfied by the entries of the n x n inverse matrix, Qn of the n x n symmetric Pascal matrix, Pn is obtained. Moreover, a new proof for El-Mikkawy conjecture [14] is investigated. Finally, some identities are discovered.
Bookmark/Search this post with
FULL TEXT (PDF): 
PDF icon arastirmax-observations-some-special-matrices-and-polynomials.pdf
  • 1
135
151
  • English

REFERENCES

References: 

[ 1 ] L. Aceto and D. Trigiante. The matrices of Pascal and other greats. American Mathematical Monthly, 108:232-245, 2001.
[2] M. B. Allen and E. L. Isaacson. Numerical Analysis for Applied Science. John Wiley & Sons, Hoboken, USA, 1997.
[ 3] R. Brawer and M. Pirovino. The linear algebra of the Pascal matrix. Linear Algebra and its Applications, 174:13-23, 1992.
REFERENCES
149
[4] G. S. Call and D. J. Velleman. Pascal's matrices. American Mathematical Monthly,
100(4):372-376, 1993.
[5] G. S. Cheon and M. El-Mikkawy. Extended symmetric Pascal matrices via hypergeometric functions. Applied Mathematics and Computation, 158:159-168, 2004.
[ 6] G. S. Cheon and J. S. Kim. Stirling matrix via Pascal matrix. Linear Algebra and its Applications, 329:49-59, 2001.
[ 7] G. S. Cheon and J. S. Kim. Factorial Stirling matrix and related combinatorial sequences. Linear Algebra and its Applications, 357:247-258, 2002.
[8] J. W. Demmel. Applied Numerical Linear Algebra. SIAM, Philadelphia, 1997.
[ 9] A. Edelman and G. Strangl. Pascal matrices. American Mathematical Monthly, Cambridge,
2003.
[10] M. E. A. El-Mikkawy. An algorithm for solving Vandermonde systems. Journal of Institute ofMathematics and Computer Science, 3(3):293-297, 1990.
[11] M. E. A. El-Mikkawy. Explicit inverse of a generalized Vandermonde matrix. Applied Mathematics and Computation, 146:643-651, 2003.
[12] M. E. A. El-Mikkawy. On a connection between symmetric polynomials, generalized Stirling numbers and the Newton general divided difference interpolation polynomial. Applied Mathematics and Computation, 138(2):375-385, 2003.
[13] M. E. A. El-Mikkawy. On a connection between the Pascal, Vandermonde and Stirling matrices-I. Applied Mathematics and Computation, 145(1):23-32, 2003.
[14] M. E. A. El-Mikkawy. On a connection between the Pascal, Vandermonde and Stirling matrices-II. Applied Mathematics and Computation, 146(2):759-769, 2003.
[15] M. E. A. El-Mikkawy. On solving linear systems of the Pascal type. Applied Mathematics and Computation, 136:195-202, 2003.
[16] M. E. A. El-Mikkawy and F. Atlan. Remarks on two symmetric polynomials and some matrices. Applied Mathematics and Computation, 219:8770-8778, 2013.
[17] M. E. A. El-Mikkawy and T. Sogabe. Notes on particular symmetric polynomials with applications. Applied Mathematics and Computation, 215:3311-3317, 2010.
[18] S. M. Fallat. Bidiagonal factorizations of totally nonnegative matrices. American Mathe¬matical Monthly, 108(8):697-712, 2001.
[19] T. X. He and J. S. Shiue. A note on Horner's method. Journal of Concrete and Applicable Mathematics, 10(1):53-64, 2012.
[20] J. G. Kemeny and J. L. Snell. Finite Markov chains. Springer-Verlag, New York, 1976.
REFERENCES
150
[21] X. G. Lv, T. Z. Huang, and Z. G. Ren. A new algorithm for linear systems of the Pascal type. Journal of computational and applied mathematics, 225(1):309-315, 2009.
[ 22] C. Y. Ma and S. L. Yang. Pascal type matrices and Bernoulli numbers. International Journal of Pure and Applied Mathematics, 58(3):249-254, 2010.
[ 23] E. N. Onwuchekwa. Some classes of lower triangular matrices and their inverses. Inter¬national Journal ofMathematical Sciences and Applications, 1(3):1169-1180, 2011.
[ 24] H. Oruc and H. K. Akmaz. Symmetric functions and the Vandermonde matrix. Journal ofComputational and Applied Mathematics, 172:49-64, 2004.
[ 25 ] T. Sogabe and M. E. A. El-Mikkawy. On a problem related to the Vandermonde determi¬nant. Discrete Applied Mathematics, 157:2997-2999, 2009.
[ 26] R. Vein and P. Dale. Determinants and their applications in mathematical physics. Springer,
New York, 1999.
[ 27] W. Wang and T. Wang. Commentary on an open question. Applied Mathematics and
Computation, 196(1):353-355, 2008.
[28] W. Wang and T. Wang. Remarks on two special matrices. Ars Combinatoria, 94:521-535,
2010.
[ 29] X. Wang. A Stable fast algorithm for solving linear systems of the Pascal type. Journal of Computational Analysis and Applications, 9(4):411-419, 2007.
[ 30] X. Wang and L. Lu. A fast algorithm for solving linear systems of the Pascal type. Applied Mathematics and Computation, 175(1):441-451, 2006.
[31] S. L. Yang. On the LU factorization of the Vandermonde matrix. Discrete Applied Mathematics, 146:102-105, 2005.
[ 32] S. L. Yang. On a connection between the Pascal, Stirling and Vandermonde matrices. Discrete Applied Mathematics, 155(15):2025-2030, 2007.
[33] S. L. Yang and Z. K. Qiao. The Bessel numbers and Bessel matrices. Journal of Mathe¬matical Research and Exposition, 31(4):627-636, 2011.
[ 34] S. L. Yang and H. You. On a relationship between Pascal matrix and Vandermonde matrix. Journal ofMathematical Research and Exposition, 26(1):33-39, 2006.
[ 35 ] Z. Zeng, Y. Tu, and J. Xiao. A neural-network method based on RLS algorithmforsolv-ing special linear systems of equations. Journal ofComputational Information Systems,
8(7):2915-2920, 2012.
[ 36] Z. Z. Zhang. The linear algebra of the generalized Pascal matrix. Linear Algebra and its
Applications, 250:51-60, 1997.
REFERENCES
151
[ 37] Z. Z. Zhang and M. Liu. An extension of the generalized Pascal matrix and its algebraic properties. Linear Algebra and its Applications, 271:169-177, 1998.

Thank you for copying data from http://www.arastirmax.com