Let E be an Archimedean Riesz space. It is shown that the Kakutani-Krein space of the center of the Dedekind completion of E and the Maeda-Ogasawara space of E are homeomorphic. By applying this, we can reprove a Banach Stone type theorem for C?(S) spaces, where S is a Stonean space. © TÜBİTAK
We show that a CDw (X)-space is isometrically Riesz isomorphic to C(W) for some Whyburn unified spac...
Magill’s and Rayburn’s theorems on the homeomorphism of Stone-Čech remainders and some of their gen...
summary:Let $L$ be an Archimedean Riesz space with a weak order unit $u$. A sufficient condition und...
Let E be an Archimedean Riesz space. It is shown that the KakutaniKrein space of the center of the D...
Let Chi and Upsilon be compact Hausdor spaces, Epsilon be a Banach lattice and F be an AM space with...
Let X and Y be compact Hausclorff spaces, and E and F be locally solid Riesz spaces. If pi : C(X. E)...
AbstractThe unital AM-spaces (AM-spaces with strong order unit) CDw(X) are introduced and studied in...
We give a representation of the space CDw(K) which was defined by Abramovich and Wickstead. We apply...
Abstract. Let X and Y be compact Hausdorff spaces, and E be a nonzero real Banach lattice. In this n...
AbstractFor an Archimedean Riesz space we introduce a Dedekind σ-complete hull, different from Quinn...
In 1932, Banach published the first study on isometries between real-valued function spaces defined ...
AbstractLet X and Y be compact Hausdorff spaces, and E and F be locally solid Riesz spaces. If π:C(X...
summary:We prove that any infinite-dimensional non-archimedean Fréchet space $E$ is homeomorphic to...
AbstractThe Kakutani-Krein and Stone-Weierstrass theorems remain in force when the approximating fam...
We prove that for a compact Hausdorff space K without isolated points, CD0(K) and C(K x {0, 1}) are ...
We show that a CDw (X)-space is isometrically Riesz isomorphic to C(W) for some Whyburn unified spac...
Magill’s and Rayburn’s theorems on the homeomorphism of Stone-Čech remainders and some of their gen...
summary:Let $L$ be an Archimedean Riesz space with a weak order unit $u$. A sufficient condition und...
Let E be an Archimedean Riesz space. It is shown that the KakutaniKrein space of the center of the D...
Let Chi and Upsilon be compact Hausdor spaces, Epsilon be a Banach lattice and F be an AM space with...
Let X and Y be compact Hausclorff spaces, and E and F be locally solid Riesz spaces. If pi : C(X. E)...
AbstractThe unital AM-spaces (AM-spaces with strong order unit) CDw(X) are introduced and studied in...
We give a representation of the space CDw(K) which was defined by Abramovich and Wickstead. We apply...
Abstract. Let X and Y be compact Hausdorff spaces, and E be a nonzero real Banach lattice. In this n...
AbstractFor an Archimedean Riesz space we introduce a Dedekind σ-complete hull, different from Quinn...
In 1932, Banach published the first study on isometries between real-valued function spaces defined ...
AbstractLet X and Y be compact Hausdorff spaces, and E and F be locally solid Riesz spaces. If π:C(X...
summary:We prove that any infinite-dimensional non-archimedean Fréchet space $E$ is homeomorphic to...
AbstractThe Kakutani-Krein and Stone-Weierstrass theorems remain in force when the approximating fam...
We prove that for a compact Hausdorff space K without isolated points, CD0(K) and C(K x {0, 1}) are ...
We show that a CDw (X)-space is isometrically Riesz isomorphic to C(W) for some Whyburn unified spac...
Magill’s and Rayburn’s theorems on the homeomorphism of Stone-Čech remainders and some of their gen...
summary:Let $L$ be an Archimedean Riesz space with a weak order unit $u$. A sufficient condition und...
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