Add to ORKGWe characterize the closed sets E in the unit circle T which have the property that, for some nondecreasing h: (0, ∞) →(0, ∞) with h(0+) = 0, all the Hausdorff h-measure 0 closed sets F ⊆ E are sets of uniqueness (for trigonometric series). In conjunction with Körner's result on the existence of Helson sets of multiplicity, this implies the existence of closed sets of multiplicity (M-sets) within which Hausdorff h-measure 0 implies uniqueness, for some h. This is contrasted with the case of closed sets of strict multiplicity (M_0-sets), where results of Ivashev-Musatov and Kaufman establish the opposite
AbstractGiven a sequence of independent random variables (fk) on a standard Borel space Ω with proba...
The authors give an explicit construction of a countable closed subset of the circle group T which i...
Let R denote the class of complex Borel measures on the circle whose Fourier-Stieltjes coefficients ...
We characterize the closed sets E in the unit circle T which have the property that, for some nondec...
We characterize the closed sets E in the unit circle T which have the property that, for some nondec...
Let T denote the group [0, 1) with addition modulo one, let Z denote the integers, and let E be a su...
Abstract. A subset E of the d-dimensional torus Td is called a set of unique-ness, or U-set, if ever...
Using Baire's theorem, we give a very simple proof of a special version of the Lusin-Privalov theore...
It is shown that theσ-ideal U_0 of closed sets of extended uniqueness in T is hereditarily non-Borel...
It is shown that theσ-ideal U_0 of closed sets of extended uniqueness in T is hereditarily non-Borel...
It is shown that theσ-ideal U_0 of closed sets of extended uniqueness in T is hereditarily non-Borel...
Abstract. Five uniqueness questions for multiple trigonometric series are surveyed. If a multiple tr...
The study of sets of uniqueness for trigonometric series has a long history, originating in the work...
The study of sets of uniqueness for trigonometric series has a long history, originating in the work...
The study of sets of uniqueness for trigonometric series has a long history, originating in the work...
AbstractGiven a sequence of independent random variables (fk) on a standard Borel space Ω with proba...
The authors give an explicit construction of a countable closed subset of the circle group T which i...
Let R denote the class of complex Borel measures on the circle whose Fourier-Stieltjes coefficients ...
We characterize the closed sets E in the unit circle T which have the property that, for some nondec...
We characterize the closed sets E in the unit circle T which have the property that, for some nondec...
Let T denote the group [0, 1) with addition modulo one, let Z denote the integers, and let E be a su...
Abstract. A subset E of the d-dimensional torus Td is called a set of unique-ness, or U-set, if ever...
Using Baire's theorem, we give a very simple proof of a special version of the Lusin-Privalov theore...
It is shown that theσ-ideal U_0 of closed sets of extended uniqueness in T is hereditarily non-Borel...
It is shown that theσ-ideal U_0 of closed sets of extended uniqueness in T is hereditarily non-Borel...
It is shown that theσ-ideal U_0 of closed sets of extended uniqueness in T is hereditarily non-Borel...
Abstract. Five uniqueness questions for multiple trigonometric series are surveyed. If a multiple tr...
The study of sets of uniqueness for trigonometric series has a long history, originating in the work...
The study of sets of uniqueness for trigonometric series has a long history, originating in the work...
The study of sets of uniqueness for trigonometric series has a long history, originating in the work...
AbstractGiven a sequence of independent random variables (fk) on a standard Borel space Ω with proba...
The authors give an explicit construction of a countable closed subset of the circle group T which i...
Let R denote the class of complex Borel measures on the circle whose Fourier-Stieltjes coefficients ...