Generalized Stieltjes and other integral operators on Sobolev-Lebesgue spaces

Abstract

For μ>β>0, the generalized Stieltjes operators Sβ,μ f(t):=tμ-β∫0∞ sβ-1 (s+t)μf(s)ds, t>0, defined on Sobolev spaces Tp(α)(tα) (where α 0 is the fractional order of derivation and these spaces are embedded in Lp(+) for p 1) are studied in detail. If 0 < β - < μ, then operators Sβ,μ are bounded (and we compute their operator norms which depend on p); commute and factorize with generalized Ces\'aro operator on Tp(α)(tα) . We calculate and represent explicitly their spectrum set σ (Sβ,μ). The main technique is to subordinate these operators in terms of C0-groups and transfer new properties from some special functions to Stieltjes operators. We also prove some similar results for generalized Stieltjes operators Sβ,μ in the Sobolev-Lebesgue Tp(α)( tα) defined on the real line . We show connections with the Fourier and the Hilbert transform and a convolution product defined by the Hilbert transform.