Abstract
In 1966 Cora Sadosky introduced a number of results in a remarkable paper “A note on Parabolic Fractional and Singular Integrals”, see Sadosky (Studia Math 26:295–302, 1966), in particular, a quasi homogeneous version of Sobolev’s immersion theorem was discussed in the paper. Later, C. P. Calderon and T. Kwembe, following those ideas and incorporating the context of Fabes-Riviere homogeneity (Fabes and Riviere, Studia Math 27:19–38, 1966), proved a similar results for potential operators with kernels having mixed homogeneity. Calderon-Kwembe’s (Dispersal models. X Latin American School of Mathematics (Tanti, 1991). Rev Un Mat Argent 37(3–4):212–229, 1991/1992) basic theorem was very much in the spirit of Sadosky’s result. The natural extension of Sadosky’s paper is nevertheless the joint paper by C. Sadosky and M. Cotlar (On quasi-homogeneous Bessel potential operators. In: Singular integrals. Proceedings of symposia in pure mathematics, Chicago, 1966. American Mathematical Society, Providence, 1967, pp 275–287) which constitutes a true tour de force through, what is now considered, local properties of solutions of parabolic partial differential equations. The tools are the introduction of “Parabolic Bessel Potentials” combined with mixed homogeneity local smoothness estimates.
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