AbstractThis work is a continuation of [7]. In that paper, a sufficient condition was given on a real analytic fmlction g defined near 0 in C so that the algebra generated by z2 and g2 is dense in the space of continuous functions on D for all disks D close enough to the origin in C. By using the same methods and some ideas taken from the first named author's thesis we deal with the case where g is only of class C1 near 0
We introduce notions of absolutely continuous functionals and representations on the non-commutative...
The space C(X) of all continuous functions on a compact space X carries the structure of a normed ve...
AbstractIt is shown that on closed disks D around the origin in the complex plane and for every inte...
AbstractThis work is a continuation of [7]. In that paper, a sufficient condition was given on a rea...
Abstract: In this article we study the function algebra generated by z2 and g2 on a small closed dis...
This paper is a continuation of [P]. The main result of [P] is that there are functions G defined i...
Let F be a family of continuous functions defined on a compact interval. We give a sufficient condit...
We prove that functions analytic in the unit disk and continuous up to the boundary are dense in the...
AbstractFor a large class of functions G, defined in a neighborhood of the origin in the complex pla...
AbstractWe consider Lagrange interpolation polynomials for functions in the disk algebra with nodes ...
Any Banach space can be realized as a direct summand of a uniform algebra, and one does not expect a...
We provide an analytic proof that if H ∞ is the algebra of bounded analytic functions on the unit di...
PhDMathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue.li...
We provide an analytic proof that if $H^\infty$ is the algebra of bounded analytic functions on the ...
summary:A DC-space (or space of dense constancies) is a Tychonoff space $X$ such that for each $f\in...
We introduce notions of absolutely continuous functionals and representations on the non-commutative...
The space C(X) of all continuous functions on a compact space X carries the structure of a normed ve...
AbstractIt is shown that on closed disks D around the origin in the complex plane and for every inte...
AbstractThis work is a continuation of [7]. In that paper, a sufficient condition was given on a rea...
Abstract: In this article we study the function algebra generated by z2 and g2 on a small closed dis...
This paper is a continuation of [P]. The main result of [P] is that there are functions G defined i...
Let F be a family of continuous functions defined on a compact interval. We give a sufficient condit...
We prove that functions analytic in the unit disk and continuous up to the boundary are dense in the...
AbstractFor a large class of functions G, defined in a neighborhood of the origin in the complex pla...
AbstractWe consider Lagrange interpolation polynomials for functions in the disk algebra with nodes ...
Any Banach space can be realized as a direct summand of a uniform algebra, and one does not expect a...
We provide an analytic proof that if H ∞ is the algebra of bounded analytic functions on the unit di...
PhDMathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue.li...
We provide an analytic proof that if $H^\infty$ is the algebra of bounded analytic functions on the ...
summary:A DC-space (or space of dense constancies) is a Tychonoff space $X$ such that for each $f\in...
We introduce notions of absolutely continuous functionals and representations on the non-commutative...
The space C(X) of all continuous functions on a compact space X carries the structure of a normed ve...
AbstractIt is shown that on closed disks D around the origin in the complex plane and for every inte...
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