Mixed norm estimates for dilated averages over planar curves
Abstract
In this paper, we investigate the mixed norm estimates for the operator T associated with a dilated plane curve (ut, uγ(t)), defined by \[ Tf(x, u) := ∫01 f(x1 - ut, x2 - uγ(t)) \, dt, \] where x := (x1, x2) and γ is a general plane curve satisfying appropriate smoothness and curvature conditions. More precisely, we establish the Lxp(R2) → Lxq Lur(R2 × [1, 2]) (space-time) estimates for T , whenever (1p,1q) satisfy \[ \0, 12p - 12r, 3p - r+2r\ < 1q ≤ 1p < r+12r \] and 1 + (1 + ω)(1q - 1p) > 0, where r ∈ [1, ∞] and ω := t → 0+ |γ(t)| t . These results are sharp, except for certain borderline cases. Additionally, we examine the Lxp(R2) → Lur Lxq(R2 × [1, 2]) (time-space) estimates for T , which are especially almost sharp when p=2 or p∈ [1, 32] [4, ∞].
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