A remark on singular Calderón-Zygmund theory

Abstract: ABSTRACT. It is shown that in Rn the operator /+oo f(X! -t,...Xn-tn)t-ldt ■oo maps L(logL) to weak L1 locally. A slight variant of the Calderón-Zygmund procedure provides a new approach to the previously known Lp boundedness of H, 1 < p < oo. Relatively sharp bounds are obtained as p -> 1+, and extrapolation produces the result for L(logL).Let a = al < ■ ■ ■ < an G Z, and for all t G R let -y(i) = (tai,..., ta") G Rn. The Lp boundedness of operators such as Hf(x) -pv J f(x -7(í))í_1 dt has been studied by a nu… Show more

“…The nonvanishing curvature hypothesis in Theorem 1.1 guarantees an estimate of the form (1.2) via van der Corput's lemma. This L log L result essentially reproved earlier work of Christ and Stein [9] who, for example, considered the class of homogeneous curves in R d given by (t) = (t α 1 , . .…”

MAXIMAL OPERATORS AND HILBERT TRANSFORMS ALONG FLAT CURVES NEAR L¹

“…The nonvanishing curvature hypothesis in Theorem 1.1 guarantees an estimate of the form (1.2) via van der Corput's lemma. This L log L result essentially reproved earlier work of Christ and Stein [9] who, for example, considered the class of homogeneous curves in R d given by (t) = (t α 1 , . .…”

MAXIMAL OPERATORS AND HILBERT TRANSFORMS ALONG FLAT CURVES NEAR L¹

“…We will follow the idea of C. Fefferman [11] of using more information of the L 2 operator norm (in our case, L iα L 2 →L 2 = 1) by smoothing out the bad functions b i at a scale smaller than the size of its support and considering this part of the good function where L 2 estimates can be used (see also [4]). In our case for each…”

Imaginary powers of Laplace operators

“…We now turn our attention to the proof of Theorem 1.2, which relies on the result obtained by Christ and Stein [1987]. Indeed, we shall show that the general statement they proved applies to the operator (2).…”

“…He also pointed out that H 1 → L 1 boundedness cannot hold. A previous result of Christ and Stein [1987] had MSC2000: 44A12, 42B20. Keywords: strongly singular integrals, Radon transforms.…”

Strongly singular integrals along curves