On Normed Vector Spaces
Definition: A bilinear form on a normed vector space is bounded, if there is a constant C such that for all u, v ∈ V
Definition: A bilinear form on a normed vector space is elliptic, or coercive, if there is a constant c > 0 such that for all u ∈ V
Read more about this topic: Unimodular Form
Famous quotes containing the word spaces:
“through the spaces of the dark
Midnight shakes the memory
As a madman shakes a dead geranium.”
—T.S. (Thomas Stearns)