Suppose that γ(t):=(γ1(t),…,γn(t))=(a1td1,…,antdn),1≤d1<⋯<dn,ai=0 is a homogeneous polynomial curve. We prove that whenever p1,…,pn>1 and p1=∑j=1npj1≤1, there exists an absolute constant 0<C=Cp1,…,pn;γ<∞ so that ∥r>0supr1∫0ri=1∏n∣fi(x−γi(t))∣dt∥Lp(R)≤C⋅i=1∏n∥fj∥Lpj(R). Our main tool is a smoothing estimate, adapted from work of Kosz-Mirek-Peluse-Wright.
@article{arxiv.2508.09080,
title = {On Multi-linear Maximal Operators Along Homogeneous Curves},
author = {Lars Becker and Ben Krause},
journal= {arXiv preprint arXiv:2508.09080},
year = {2026}
}