Discrete-Continuous Jacobi-Sobolev Spaces and Fourier Series

Abstract

Let p≥ 1, ∈ , α,β>-1 and =(ω0,ω1, …, ω-1)∈ . Given a suitable function f, we define the discrete-continuous Jacobi-Sobolev norm of f as: f:= (Σk=0-1 |f(k)(ωk)|p + ∫-11 |f()(x)|p d(x))1p, where d(x)=(1-x)α (1+x)βdx. Obviously, [2]·= ··, where ·· is the inner product. fg:= Σk=0-1 f(k)(ωk) \, g(k)(ωk) + ∫-11 f()(x) \,g()(x) d(x). In this paper, we summarize the main advances on the convergence of the Fourier-Sobolev series, in norms of type Lp, cases continuous and discrete. We study the completeness of the Sobolev space of functions associated with the norm · and the denseness of the polynomials. Furthermore, we obtain the conditions for the convergence in · norm of the partial sum of the Fourier-Sobolev series of orthogonal polynomials with respect to ·· .