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A Construction Of Primitive Polynomials Over Finite Fields
(Taylor and Francis Ltd., 2017)
Column symmetric polynomials
(Amiens, 2019-09)
Nous étudions l’algébre des polynômes en une m x n matrice de variables sur un anneau contenant les rationnels, sujette à la condition que le produit de deux variables appartenant à une même colonne est nul. Nous montrons ...
Generating Birth and Death Processes
(Taylor & Francis Inc, 2011-01-01)
Associated with an ordered sequence of an even number 2N of positive real numbers is a birth and death process (BDP) on {0, 1, 2,..., N} having these real numbers as its birth and death rates. We generate another birth and ...
Generating Birth and Death Processes
(Taylor & Francis Inc, 2014)
Generating Birth and Death Processes
(Taylor & Francis Inc, 2011-01-01)
Associated with an ordered sequence of an even number 2N of positive real numbers is a birth and death process (BDP) on {0, 1, 2,..., N} having these real numbers as its birth and death rates. We generate another birth and ...
The Determinant of Matching Matrix in the Evaluation of Matching PolynomialThe Determinant of Matching Matrix in the Evaluation of Matching Polynomial
(2011-04-29)
A characterization is given for graphs whose matching polynomial is the determinant of their matching matrices. The matching matrix is then modified and its relation with other graph polynomials is examined.
The Determinant of Matching Matrix in the Evaluation of Matching PolynomialThe Determinant of Matching Matrix in the Evaluation of Matching Polynomial
(2011-04-29)
A characterization is given for graphs whose matching polynomial is the determinant of their matching matrices. The matching matrix is then modified and its relation with other graph polynomials is examined.
A discrete weighted Markov-Bernstein inequality for sequences and polynomials
(Elsevier B.V., 2021-01-01)
For parameters c is an element of(0,1) and beta > 0, let l(2)(c ,beta) be the Hilbert space of real functions defined on N (i.e., real sequences), for which parallel to f parallel to(2)(c,beta) := Sigma(infinity)(k=0)(beta)(k)/k! ...