Add to ORKGIf $\mu$ is a finite complex measure in the complex plane $\mathbb{C}$ we denote by $C^\mu$ its Cauchy integral defined in the sense of principal value. The measure $\mu$ is called \emph{reflectionless} if it is continuous (has no atoms) and $C^\mu=0$ at $\mu$-almost every point. We show that if $\mu$ is reflectionless and its Cauchy maximal function $C^\mu_*$ is summable with respect to $|\mu|$ then $\mu$ is trivial. An example of a reflectionless measure whose maximal function belongs to the "weak" $L^1$ is also constructed, proving that the above result is sharp in its scale. We also give a partial geometric description of the set of reflectionless measures on the line and discuss connections of our results with the notion of sets of fi...
Given a finite nonnegative Borel measure $m$ in $\mathbb{R}^{d}$, we identify the Lebesgue set $\mat...
Let X = {x1, x2, ...} be a countably infinite topological space; then the space C*(X) of all bounded...
summary:Integrals of the Cauchy type extended over the boundary $\partial A$ of a general compact se...
If µ is a finite complex measure in the complex plane C we denote by Cµ its Cauchy integral defined ...
If µ is a finite complex measure in the complex plane C we denote by Cµ its Cauchy integral defined ...
Let µ be a continuous (i.e., without atoms) positive Radon measure on the complex plane. The trunca...
AbstractLet μ be a finite non-negative Borel measure on the complex plane C. We shall prove the foll...
AbstractLet μ be a finite non-negative Borel measure on the complex plane C. We shall prove the foll...
Abstract. Consider a finite complex Radon measure µ in the plane whose Cauchy transform vanishes µ-a...
summary:In this paper we prove an existence theorem for the Cauchy problem \[ x^{\prime }(t) = f(t, ...
summary:In this paper we prove an existence theorem for the Cauchy problem \[ x^{\prime }(t) = f(t, ...
Abstract. Consider a nite complex Radon measure in the plane whose Cauchy transform vanishes -almos...
Motivated by the work of Mateu, Orobitg, Pérez and Verdera, who proved inequalities of the form T _*...
AbstractLet E⊂C be a Borel set with finite length, that is, 0<H1(E)<∞. By a theorem of David and Lég...
summary:Integrals of the Cauchy type extended over the boundary $\partial A$ of a general compact se...
Given a finite nonnegative Borel measure $m$ in $\mathbb{R}^{d}$, we identify the Lebesgue set $\mat...
Let X = {x1, x2, ...} be a countably infinite topological space; then the space C*(X) of all bounded...
summary:Integrals of the Cauchy type extended over the boundary $\partial A$ of a general compact se...
If µ is a finite complex measure in the complex plane C we denote by Cµ its Cauchy integral defined ...
If µ is a finite complex measure in the complex plane C we denote by Cµ its Cauchy integral defined ...
Let µ be a continuous (i.e., without atoms) positive Radon measure on the complex plane. The trunca...
AbstractLet μ be a finite non-negative Borel measure on the complex plane C. We shall prove the foll...
AbstractLet μ be a finite non-negative Borel measure on the complex plane C. We shall prove the foll...
Abstract. Consider a finite complex Radon measure µ in the plane whose Cauchy transform vanishes µ-a...
summary:In this paper we prove an existence theorem for the Cauchy problem \[ x^{\prime }(t) = f(t, ...
summary:In this paper we prove an existence theorem for the Cauchy problem \[ x^{\prime }(t) = f(t, ...
Abstract. Consider a nite complex Radon measure in the plane whose Cauchy transform vanishes -almos...
Motivated by the work of Mateu, Orobitg, Pérez and Verdera, who proved inequalities of the form T _*...
AbstractLet E⊂C be a Borel set with finite length, that is, 0<H1(E)<∞. By a theorem of David and Lég...
summary:Integrals of the Cauchy type extended over the boundary $\partial A$ of a general compact se...
Given a finite nonnegative Borel measure $m$ in $\mathbb{R}^{d}$, we identify the Lebesgue set $\mat...
Let X = {x1, x2, ...} be a countably infinite topological space; then the space C*(X) of all bounded...
summary:Integrals of the Cauchy type extended over the boundary $\partial A$ of a general compact se...