Title of article :
On Vector-Valued Banach Function Algebras
Author/Authors :
Mahyar ، Hakimeh Department of Mathematics - Kharazmi University , Esmaeili ، Kobra Faculty of Engineering - Ardakan University
Abstract :
We consider vector-valued Banach function algebras on a compact Hausdorff space. Then, we define the subalgebras generated by vector-valued polynomials and rational functions, and determine their maximal ideal spaces and Šilov boundaries.We finally make use the results for a certain category of these algebras such as vector-valued Lipschitz algebras, vector-valued Dales–Davie algebras (algebras of vector-valued differentiable functions) and the algebras of vector-valued differentiable Lipschitz functions.
Keywords :
Vector , valued Banach function algebra , Vector , valued Lipschitz algebra · Algebra of vector , valued differentiable (Lipschitz) functions , Maximal ideal space , Šilov boundary , Approximation , Vector , valued polynomials and rational functions
Journal title :
Bulletin of the Iranian Mathematical Society
Journal title :
Bulletin of the Iranian Mathematical Society
