Given a locally convex space (V,Γ), we find (all) the multiplications π on V (associative or not) such that the algebra A ≡ (V,π,Γ) becomes (i) A-convex, (ii) lm-convex.

On the locally $m$ -convex algebra $L_{Γ} (E)$ and a differential-geometric interpretation of it.

Tsertos, Yannis — 1997

Portugaliae Mathematica

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Smoothness of Locally Multiplicatively Convex Algebras a Gel΄ Fand-Mazur Theorem

Integral Representations of Positive Linear forms

On circle-Exponential Topological Algebras

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On A-convex and lm-convex algebra structures of a locally convex space

On the locally m -convex algebra L Γ ( E ) and a differential-geometric interpretation of it.

On the locally $m$ -convex algebra $L_{Γ} (E)$ and a differential-geometric interpretation of it.