Beta-dual space
= Beta-dual space
{wiki=Beta-dual_space}
In functional analysis, the concept of dual spaces is central to understanding the properties of linear functionals and the structures of vector spaces. The Beta-dual space specifically refers to a particular type of dual space associated with a certain class of topological vector spaces. To clarify, let’s define some key concepts: 1. **Vector Space**: A set of elements (vectors) that can be added together and multiplied by scalars.