Add to ORKGWe derive sparse bounds for the bilinear spherical maximal function in any dimension $d\geq 1$. When $d\geq 2$, this immediately recovers the sharp $L^p\times L^q\to L^r$ bound of the operator and implies quantitative weighted norm inequalities with respect to bilinear Muckenhoupt weights, which seems to be the first of their kind for the operator. The key innovation is a group of newly developed continuity $L^p$ improving estimates for the single scale bilinear spherical averaging operator.Comment: 35 pages; final version to appear in JLM
We examine the L^p norm dimensional asymptotics of spherical and ball maximal averaging operators on...
In this work we extend Lacey’s domination theorem to prove the pointwise control of bilinear Calderó...
AbstractWe use simple one-dimensional operators to bound pointwise the spherical maximal operator ac...
We prove sparse bounds for the spherical maximal operator of Magyar, Stein and Wainger. The bounds a...
We obtain boundedness for the bilinear spherical maximal function in a range of exponents that inclu...
Let f∈Lp(Rd), d≥3, and let Atf(x) be the average of f over the sphere with radius t centered at x. F...
Let f∈Lp(Rd), d≥3, and let Atf(x) be the average of f over the sphere with radius t centered at x. F...
Let f∈Lp(Rd), d≥3, and let Atf(x) be the average of f over the sphere with radius t centered at x. F...
In this paper we introduce and study a bilinear spherical maximal function of product type in the sp...
Weighted inequality on the Hardy-Littlewood maximal function is completely understood while it is no...
AbstractWe use simple one-dimensional operators to bound pointwise the spherical maximal operator ac...
Improved $\ell^p$-Boundedness for Integral $k$-Spherical Maximal Functions, Discrete Analysis 2018:1...
In dimensions n [greater than or equal to] 2 we obtain Lp1(Rn) x ... x Lpm(Rn) to Lp(Rn) boundedness...
We prove analogue statements of the spherical maximal theorem of E. M. Stein, for the lattice points...
The spherical maximal operator Af(x) = sup_(t>0) | Atf(x)| = sup_(t>0) ∣ ∫f(x−ty)dσ(y)∣ where σ is ...
We examine the L^p norm dimensional asymptotics of spherical and ball maximal averaging operators on...
In this work we extend Lacey’s domination theorem to prove the pointwise control of bilinear Calderó...
AbstractWe use simple one-dimensional operators to bound pointwise the spherical maximal operator ac...
We prove sparse bounds for the spherical maximal operator of Magyar, Stein and Wainger. The bounds a...
We obtain boundedness for the bilinear spherical maximal function in a range of exponents that inclu...
Let f∈Lp(Rd), d≥3, and let Atf(x) be the average of f over the sphere with radius t centered at x. F...
Let f∈Lp(Rd), d≥3, and let Atf(x) be the average of f over the sphere with radius t centered at x. F...
Let f∈Lp(Rd), d≥3, and let Atf(x) be the average of f over the sphere with radius t centered at x. F...
In this paper we introduce and study a bilinear spherical maximal function of product type in the sp...
Weighted inequality on the Hardy-Littlewood maximal function is completely understood while it is no...
AbstractWe use simple one-dimensional operators to bound pointwise the spherical maximal operator ac...
Improved $\ell^p$-Boundedness for Integral $k$-Spherical Maximal Functions, Discrete Analysis 2018:1...
In dimensions n [greater than or equal to] 2 we obtain Lp1(Rn) x ... x Lpm(Rn) to Lp(Rn) boundedness...
We prove analogue statements of the spherical maximal theorem of E. M. Stein, for the lattice points...
The spherical maximal operator Af(x) = sup_(t>0) | Atf(x)| = sup_(t>0) ∣ ∫f(x−ty)dσ(y)∣ where σ is ...
We examine the L^p norm dimensional asymptotics of spherical and ball maximal averaging operators on...
In this work we extend Lacey’s domination theorem to prove the pointwise control of bilinear Calderó...
AbstractWe use simple one-dimensional operators to bound pointwise the spherical maximal operator ac...