A polynomial Roth theorem for corners in R2 and a related bilinear singular integral operator

We prove a quantitative Roth-type theorem for polynomial corners in R-2. Let P-1 and P-2 be two linearly independent polynomials with zero constant term. We show that any measurable subset of [0, 1](2) with positive measure contains three points (x, y), (x + P-1(t), y), (x, y + P-2(t)) with a gap estimate on t. We also prove boundedness results for a variant of the triangular Hilbert transform involving two polynomials and its associated maximal function. These results extend some earlier work of Christ, Durcik and Roos. The key of the proof is to establish certain smoothing inequalities involving two polynomials. To accomplish that we give sublevel set estimates with general polynomials, explicit exponents and simplified proofs.