AbstractLet {Pk(x)} be any system of the classical orthogonal polynomials, and let {Pk(x; c)} be the corresponding associated polynomials of order c (c ∈ N). Second-order recurrence relation (in k) is given for the connection coefficient an−1,k(c) in Pn−1(x;c)=σk=0n−1 an−1,k(c)Pk(x). This result is obtained thanks to a new explicit form of the fourth-order differential equation satisfied by Pn−1(·;c)
Abstract. Let {Pk} and Qk be any two sequences of classical orthogonal polynomials. Using theorems o...
AbstractThe recurrence relations for classical orthogonal polynomials are derived in a new way by us...
In this paper we study families of semi-classical orthogonal polynomials within class one. We derive...
AbstractLet {Pk(x)} be any system of the classical orthogonal polynomials, and let {Pk(x; c)} be the...
AbstractBy using the second-order recurrence relation this paper gives some new results on associate...
AbstractWe describe a simple approach in order to build recursively the connection coefficients betw...
AbstractLet Pk be any sequence of the classical orthogonal polynomials. We give explicitly a second-...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
AbstractWe give explicitly recurrence relations satisfied by the connection coefficients between two...
AbstractWe describe a simple approach in order to build recursively the connection coefficients betw...
AbstractWe give explicitly recurrence relations satisfied by the connection coefficients between two...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
AbstractBy using the second-order recurrence relation this paper gives some new results on associate...
AbstractA survey is given of the interaction between orthogonal polynomials, associated polynomials ...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
Abstract. Let {Pk} and Qk be any two sequences of classical orthogonal polynomials. Using theorems o...
AbstractThe recurrence relations for classical orthogonal polynomials are derived in a new way by us...
In this paper we study families of semi-classical orthogonal polynomials within class one. We derive...
AbstractLet {Pk(x)} be any system of the classical orthogonal polynomials, and let {Pk(x; c)} be the...
AbstractBy using the second-order recurrence relation this paper gives some new results on associate...
AbstractWe describe a simple approach in order to build recursively the connection coefficients betw...
AbstractLet Pk be any sequence of the classical orthogonal polynomials. We give explicitly a second-...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
AbstractWe give explicitly recurrence relations satisfied by the connection coefficients between two...
AbstractWe describe a simple approach in order to build recursively the connection coefficients betw...
AbstractWe give explicitly recurrence relations satisfied by the connection coefficients between two...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
AbstractBy using the second-order recurrence relation this paper gives some new results on associate...
AbstractA survey is given of the interaction between orthogonal polynomials, associated polynomials ...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
Abstract. Let {Pk} and Qk be any two sequences of classical orthogonal polynomials. Using theorems o...
AbstractThe recurrence relations for classical orthogonal polynomials are derived in a new way by us...
In this paper we study families of semi-classical orthogonal polynomials within class one. We derive...
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