Balanced Core and Balanced Hull #
Main definitions #
balancedCore
: The largest balanced subset of a sets
.balancedHull
: The smallest balanced superset of a sets
.
Main statements #
balancedCore_eq_iInter
: Characterization of the balanced core as an intersection over subsets.nhds_basis_closed_balanced
: The closed balanced sets form a basis of the neighborhood filter.
Implementation details #
The balanced core and hull are implemented differently: for the core we take the obvious definition
of the union over all balanced sets that are contained in s
, whereas for the hull, we take the
union over r • s
, for r
the scalars with ‖r‖ ≤ 1
. We show that balancedHull
has the
defining properties of a hull in Balanced.balancedHull_subset_of_subset
and subset_balancedHull
.
For the core we need slightly stronger assumptions to obtain a characterization as an intersection,
this is balancedCore_eq_iInter
.
References #
- [Bourbaki, Topological Vector Spaces][bourbaki1987]
Tags #
balanced
The largest balanced subset of s
.
Instances For
Helper definition to prove balanced_core_eq_iInter
Instances For
The smallest balanced superset of s
.
Instances For
The balanced core of t
is maximal in the sense that it contains any balanced subset
s
of t
.
The balanced hull of s
is minimal in the sense that it is contained in any balanced superset
t
of s
.