Coherent orthogonal polynomials

• Fundamental characteristic of orthogonal polynomials (OP): existence of a Lie algebra.
• Differential recurrence relations of OP determine a unitary representation of a non-compact Lie group.
• 2nd order Casimir originates a 2nd order differential equation that defines the corresponding OP family.
• Generalized coherent polynomials are obtained from OP.

We discuss a fundamental characteristic of orthogonal polynomials, like the existence of a Lie algebra behind them, which can be added to their other relevant aspects. At the basis of the complete framework for orthogonal polynomials we include thus–in addition to differential equations, recurrence relations, Hilbert spaces and square integrable functions–Lie algebra theory.We start here from the square integrable functions on the open connected subset of the real line whose bases are related to orthogonal polynomials. All these one-dimensional continuous spaces allow, besides the standard uncountable basis {|x〉}{|x〉}, for an alternative countable basis {|n〉}{|n〉}. The matrix elements that relate these two bases are essentially the orthogonal polynomials: Hermite polynomials for the line and Laguerre and Legendre polynomials for the half-line and the line interval, respectively.Differential recurrence relations of orthogonal polynomials allow us to realize that they determine an infinite-dimensional irreducible representation of a non-compact Lie algebra, whose second order Casimir CC gives rise to the second order differential equation that defines the corresponding family of orthogonal polynomials. Thus, the Weyl–Heisenberg algebra h(1)h(1) with C=0C=0 for Hermite polynomials and su(1,1)su(1,1) with C=−1/4C=−1/4 for Laguerre and Legendre polynomials are obtained.Starting from the orthogonal polynomials the Lie algebra is extended both to the whole space of the L2L2 functions and to the corresponding Universal Enveloping Algebra and transformation group. Generalized coherent states from each vector in the space L2L2 and, in particular, generalized coherent polynomials are thus obtained.