Add to ORKGWe obtain the structure relations for q-orthogonal polynomials in the expo-nential lattice q 2s and from that we construct the recurrence relation for the connection coecients between two families of polynomials belonging to the classical class of discrete q-orthogonal polynomials. An explicit example is also given
AbstractWe describe a simple approach in order to build recursively the connection coefficients betw...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
AbstractThe recurrence relations for classical orthogonal polynomials are derived in a new way by us...
AbstractWe give explicitly recurrence relations satisfied by the connection coefficients between two...
We obtain the structure relations for q-orthogonal polynomials in the exponential lattice q 2s and f...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
AbstractWe describe a simple approach in order to build recursively the connection coefficients betw...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
AbstractAn algorithmic approach is given to construct recurrence relations for the coefficients of t...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
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...
AbstractFormulae expressing explicitly the q-difference derivatives and the moments of the polynomia...
Abstract. Let {Pk} and Qk be any two sequences of classical orthogonal polynomials. Using theorems o...
AbstractWe describe a simple approach in order to build recursively the connection coefficients betw...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
AbstractThe recurrence relations for classical orthogonal polynomials are derived in a new way by us...
AbstractWe give explicitly recurrence relations satisfied by the connection coefficients between two...
We obtain the structure relations for q-orthogonal polynomials in the exponential lattice q 2s and f...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
AbstractWe describe a simple approach in order to build recursively the connection coefficients betw...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
AbstractAn algorithmic approach is given to construct recurrence relations for the coefficients of t...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
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...
AbstractFormulae expressing explicitly the q-difference derivatives and the moments of the polynomia...
Abstract. Let {Pk} and Qk be any two sequences of classical orthogonal polynomials. Using theorems o...
AbstractWe describe a simple approach in order to build recursively the connection coefficients betw...
AbstractWe present a simple approach in order to compute recursively the connection coefficients bet...
AbstractThe recurrence relations for classical orthogonal polynomials are derived in a new way by us...