The Hilbert transform along $C^{1+epsilon}$ vector fields

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Department of Mathematics,
University of California San Diego

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Math 278 - Analysis Colloquium

Xiaochun Li

UCLA

The Hilbert transform along $C^{1+epsilon}$ vector fields

Abstract:

Let $v$ be a vector field from ${mathbb R}^2$ to the unit circle ${mathbb S}^1$. We study the operator $$ H_vf(x)= p.v. int_{-1}^{1}f(x-tv(x))frac{dt}{t},.$$ We prove that if the vector field $v$ has $1+epsilon$ derivatives, then $H_v$ extends to a bounded map from $L^2$ into itself.

Department of Mathematics,
University of California San Diego

Math 278 - Analysis Colloquium

Xiaochun Li

UCLA

The Hilbert transform along $C^{1+epsilon}$ vector fields

Abstract:

February 3, 2004

9:00 AM

AP&M 6438

Department of Mathematics, University of California San Diego

Math 278 - Analysis Colloquium

Xiaochun Li

UCLA

The Hilbert transform along $C^{1+epsilon}$ vector fields

Abstract:

February 3, 2004

9:00 AM

AP&M 6438

Department of Mathematics,
University of California San Diego