Ultra-bornological space
A locally convex space which can be represented as an inductive limit of Banach spaces. Alternatively, an ultra-bornological space can be defined as a locally convex space 
in which every absolutely convex subset 
that absorbs each Banach disc 
in 
, is a neighbourhood of zero. (A Banach disc is an absolutely convex bounded set 
such that its span 
equipped with the natural norm 
is a Banach space.) A bornological space is a locally convex space that can be represented as an inductive limit of normed spaces, or, alternatively, a locally convex space in which every absolutely convex subset that absorbs each bounded set, is a neighbourhood of zero.
References
| [1] | A.P. Robertson, W.S. Robertson, "Topological vector spaces" , Cambridge Univ. Press (1964) |
Comments
An ultra-bornological space is barrelled and bornological, but the converse is false. Every quasi-complete bornological space is ultra-bornological but, again, the converse fails.
References
| [a1] | H. Jachow, "Locally convex spaces" , Teubner (1981) |
| [a2] | M. Valdivia, "Topics in locally convex spaces" , North-Holland (1982) |
Ultra-bornological space. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Ultra-bornological_space&oldid=49060