Control of the Bilinear Indicator Cube Testing property

Abstract

We show that the α-fractional Bilinear Indicator/Cube Testing Constant arising in arXiv:1906.05602 is controlled by the classical fractional Muckenhoupt constant, provided the product measure σ x ω is diagonally reverse doubling (in particular if it is reverse doubling) with exponent exceeding 2(n-α). Moreover, this control is sharp within the class of diagonally reverse doubling product measures. When combined with the main results in arXiv:1906.05602, 1907.07571 and 1907.10734, the above control of BICTTα for α>0 yields a two weight T1 theorem for doubling weights with appropriate diagonal reverse doubling, i.e. the norm inequality for Tα is controlled by cube testing constants and the α-fractional one-tailed Muckenhoupt constants (without any energy assumptions), and also yields a corresponding cancellation condition theorem for the kernel of Tα, both of which hold for arbitrary α-fractional Calder\'on-Zygmund operators Tα. We do not know if the analogous result for BICTH(σ,ω) holds for the Hilbert transform H in case α=0, but we show that BICTHdy(σ,ω) is not controlled by the Muckenhoupt condition for the dyadic Hilbert transform Hdy and doubling weights σ,ω.