A complete topological vector space is a concept from functional analysis, a branch of mathematics that studies vector spaces endowed with a topology, particularly focusing on continuity and convergence properties. In more detail, a **topological vector space** \( V \) is a vector space over a field (usually the real or complex numbers) that is also equipped with a topology that makes the vector operations (vector addition and scalar multiplication) continuous.
Articles by others on the same topic
There are currently no matching articles.