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Basic study of ...-semigroups and their homomorphisms.

Takayuki Tamura — 1974

Semigroup forum

Commutative archimedean cancellative semigroups without idempotent

Takayuki Tamura

Séminaire Dubreil. Algèbre et théorie des nombres

Weak nearly uniform soothness and worth property of $ψ$ -direct sums of Banach spaces

Mikio Kato; Takayuki Tamura — 2006

Commentationes Mathematicae

We shall characterize the weak nearly uniform smoothness of the $ψ$ -direct sum $X \oplus_{ψ} Y$ of Banach spaces $X$ and $Y$ . The Schur and WORTH properties will be also characterized. As a consequence we shall see in the $ℓ_{\infty}$ -sums of Banach spaces there are many examples of Banach spaces with the fixed point property which are not uniformly non-square.

Weak nearly uniform smoothness of the $ψ$ -direct sums ${(X_{1} \oplus \dots \oplus X_{N})}_{ψ}$

Mikio Kato; Takayuki Tamura — 2012

Commentationes Mathematicae

We shall characterize the weak nearly uniform smoothness of the $ψ$ -direct sum ${(X_{1} \oplus \dots \oplus X_{N})}_{ψ}$ of $N$ Banach spaces $X_{1}, \dots, X_{N}$ , where $ψ$ is a convex function satisfying certain conditions on the convex set $Δ_{N} = {(s_{1}, \dots, s_{N - 1}) \in ℝ_{+}^{N - 1} : \sum_{i = 1}^{N - 1} s_{i} \leq 1$ . To do this a class of convex functions which yield $ℓ_{1}$ -like norms will be introduced. We shall apply our result to the fixed point property for nonexpansive mappings (FPP). In particular an example will be presented which indicates that there are plenty of Banach spaces with FPP failing to be uniformly non-square.

Uniform non- $ℓ_{1}^{n}$ -ness of $ℓ_{\infty}$ -sums of Banach spaces

Mikio Kato; Takayuki Tamura — 2009

Commentationes Mathematicae

We shall characterize the uniform non- $ℓ_{1}^{n}$ -ness of $ℓ_{\infty}$ -sums of Banach spaces ${(X_{1} \oplus \dots \oplus X_{m})}_{\infty}$ . As applications, some results on super-reflexivity and the fixed point property for nonexpansive mappings will be presented.

Uniform non- $ℓ_{1}^{n}$ -ness of $ℓ_{1}$ -sums of Banach spaces

Mikio Kato; Takayuki Tamura — 2007

Commentationes Mathematicae

We shall characterize the uniform non- $ℓ_{1}^{n}$ -ness of the $ℓ_{1}$ -sum ${(X_{1} \oplus \dots \oplus X_{m})}_{1}$ of a finite number of Banach spaces $X_{1}, \dots, X_{m}$ . Also we shall obtain that ${(X_{1} \oplus \dots \oplus X_{m})}_{1}$ is uniformly non- $ℓ_{1}^{m + 1}$ if and only if all $X_{1}, \dots, X_{m}$ are uniformly non-square (note that ${(X_{1} \oplus \dots \oplus X_{m})}_{1}$ is not uniformly non- $ℓ_{1}^{m}$ ). Several related results will be presented.

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Currently displaying 1 – 11 of 11

Basic study of ...-semigroups and their homomorphisms.

Commutative archimedean cancellative semigroups without idempotent

Weak nearly uniform soothness and worth property of $ψ$ -direct sums of Banach spaces

Weak nearly uniform smoothness of the $ψ$ -direct sums ${(X_{1} \oplus \dots \oplus X_{N})}_{ψ}$

Uniform non- $ℓ_{1}^{n}$ -ness of $ℓ_{\infty}$ -sums of Banach spaces

Uniform non- $ℓ_{1}^{n}$ -ness of $ℓ_{1}$ -sums of Banach spaces

Positive rational semigroups and commutative power joined cancellative semigroups without idempotent

Examples of completely exclusive direct product

Semi-closure mappings and cofinal chains

Convergence theorems for a pair of nonexpansive mappings.

Note on finite commutative nil-semigroups