汎用データベース

世話人:川村一宏,平山至大,石井敦,丹下基生,蓮井翔

日時 2015年8月27日(木)16:30~17:30
場所 筑波大学 自然系学系D棟 D814
講演者 Arkady Leiderman (Ben-Gurion University of the Negev, Israel)
講演題目 Basic families of functions and embeddings of free locally convex spaces
アブストラクト Let X be a completely regular topological space. The free locally convex space on X is a locally convex space L(X) for which X forms a Hamel basis and such that every continuous mapping from X to a locally convex space E extends uniquely to a continuous linear operator from L(X) to E. In our talk we survey the results which are related to the following problem: characterize all topological spaces X such that L(X) can be embedded into L[0,1] as a linear subspace / a linear closed subspace, where [0,1] is a usual unit segment. The proofs are based on the Ostrand's theorem which generalizes the dimensional aspect of the Kolmogorov's Superposition Theorem: every n-dimensional metrizable compact can be basically embedded into the cube [0,1]^{2n+1}.
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