A property of locally convex Baire spaces

“…(Mazur and Orlicz (1948), p. 208). Although the complete space E = \\ I E i need not be metrizable, the result of the corollary may also be obtained for this choice of E h iel, from the fact that a product of complete metrizable spaces is Baire (Bourbaki (1948), p. 4, Exercise 7), and such subspaces F of E, as in the corollary, are Baire if E is Baire (Todd and Saxon (1973), p. 32, Theorem 4.11).…”

“…As a direct corollary of Theorem 4.1 of Todd and Saxon (1973), the following requires no topology and is true without the requirement that 38 consist of closed sets; however, the present formulation is adequate for its use in Theorem 3.1. PROOF.…”

“…Suppose 88 = {5 n } nS 1 is a family of closed balanced convex subsets of E which covers F. It is readily seen (Todd and Saxon (1973), p. 31, Lemma 4.9) that!% covers E. As no factor E t may be covered by 38i -{kB: k is an integer, and B is a member of J 1 which is not absorbing in E t }, Theorem 3.1 implies that there is an element B of 3D which is absorbing in E.…”

“…If locally convex linear topological spaces alone are considered, and the cover contains integral multiples of a single balanced convex rare set, we obtain a characterization of barrelled spaces (those locally convex linear topological spaces all of whose closed absorbing balanced convex subsets (barrels) are neighborhoods of the origin). Other restrictions on the covers, also of an algebraic nature, result in properties intermediate to the Baire and barrelled properties (see Todd and Saxon (1973) for a detailed discussion of these properties and citations of other papers by Saxon). In particular, a locally 282 Aaron R. Todd [2] convex linear topological space is unordered Baire-like if and only if it has no cover by a countable family of rare balanced convex subsets, equivalently, each cover of the space by a countable family of closed balanced convex sets contains a neighborhood of the origin.…”

Coverings of products of linear topological spaces

“…(Mazur and Orlicz (1948), p. 208). Although the complete space E = \\ I E i need not be metrizable, the result of the corollary may also be obtained for this choice of E h iel, from the fact that a product of complete metrizable spaces is Baire (Bourbaki (1948), p. 4, Exercise 7), and such subspaces F of E, as in the corollary, are Baire if E is Baire (Todd and Saxon (1973), p. 32, Theorem 4.11).…”

“…As a direct corollary of Theorem 4.1 of Todd and Saxon (1973), the following requires no topology and is true without the requirement that 38 consist of closed sets; however, the present formulation is adequate for its use in Theorem 3.1. PROOF.…”

“…Suppose 88 = {5 n } nS 1 is a family of closed balanced convex subsets of E which covers F. It is readily seen (Todd and Saxon (1973), p. 31, Lemma 4.9) that!% covers E. As no factor E t may be covered by 38i -{kB: k is an integer, and B is a member of J 1 which is not absorbing in E t }, Theorem 3.1 implies that there is an element B of 3D which is absorbing in E.…”

“…If locally convex linear topological spaces alone are considered, and the cover contains integral multiples of a single balanced convex rare set, we obtain a characterization of barrelled spaces (those locally convex linear topological spaces all of whose closed absorbing balanced convex subsets (barrels) are neighborhoods of the origin). Other restrictions on the covers, also of an algebraic nature, result in properties intermediate to the Baire and barrelled properties (see Todd and Saxon (1973) for a detailed discussion of these properties and citations of other papers by Saxon). In particular, a locally 282 Aaron R. Todd [2] convex linear topological space is unordered Baire-like if and only if it has no cover by a countable family of rare balanced convex subsets, equivalently, each cover of the space by a countable family of closed balanced convex sets contains a neighborhood of the origin.…”

Coverings of products of linear topological spaces

“…A l.c.s. E is said to be unordered Baire-like (UBL in brief) [12] if, given a sequence of closed absolutely convex subsets of E covering E, one of them is a neighbourhood of the origin in E. A l.c.s. E is said to be Baire-like (BL in brief) [11] if, given an increasing sequence of closed absolutely convex subsets of E covering E, then one of them is a neighbourhood of the origin in E. One has that…”

On some spaces of vector-valued bounded functions

On the Mathematical Work of Professor Manuel López-Pellicer