Publication: On algebraic properties of some q-multiple orthogonal polynomials
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Publication date
2018-05
Defense date
2018-07-16
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Abstract
After an introductory discussion, in which the main notions and background materials of discrete
multiorthogonality are addressed, we focus our attention on some new results, namely Chapters 2,
3, and 4. These three chapters constitute the main core of the Thesis. Indeed, Chapter 2 is focused
on the study of four new families of q-multiple orthogonal polynomials, namely q-multiple Charlier,
q-multiple Meixner of the first and second kind, respectively, and q-multiple Kravchuk. The raising
operators and Rodrigues-type formulas, which provide an explicit expression for these new families,
are obtained. Chapter 3 contains a detailed study of some algebraic properties for the aforementioned
q-families of multiple orthogonal polynomials. More specifically, the (r + 1) order recurrence relation
as well as the (r + 1) order difference equations in the discrete variable on the real line are obtained.
Here the letter r is used to denote the dimension of the vector measure µ [vector]
. Finally, in Chapter 4 some
limit relations between the attained q-families of multiple orthogonal polynomials (when the parameter
q approaches 1) and discrete multiple orthogonal polynomials are established.
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Keywords
Multiple orthogonal polynomials, q-Polynomials, Charlier polynomials, Meixner polynomials, Kravchuk polynomials, Hahn polynomials, Algebraic properties