Barrelled set functional analysis , a subset of a topological vector space is called a barrel barrelled set if it is closed convex balanced and absorbing . sets play an important role in the definitions of several classes of topological vector spaces , such as barrelled spaces.Definitions Let X be a TVS and let B be a subset of X . B is a barrel if it is closed convex balanced and absorbing in X . B 0 X is called an ultrabarrel if it is a closed and balanced subset of X and if there exists a sequence of closed balanced and absorbing subsets of X such that B i +1B i +1B i i = 0, 1,.... defining sequence for B 0 . B 0 of a TVS X is called a bornivorous ultrabarrelX and if there exists a sequence of closed balanced and bornivorous subsets of X such that B i +1B i +1B i i = 0, 1,.... B 0 of a TVS X is called an suprabarrel if it is a balanced subset of X and if there exists a sequence of balanced and absorbing subsets of X such that B i +1B i +1B i i = 0, 1,.... defining sequence for B 0 .B 0 of a TVS X is called a bornivorous suprabarrel if it is a balanced and bornivorous subset of X and if there exists a sequence of balanced and bornivorous subsets of X such that B i +1B i +1B i i = 0, 1,....Properties Note that every bornivorous ultrabarrel is an ultrabarrel and that every bornivorous suprabarrel is a suprabarrel.Examples
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