C space
In the mathematical field of functional analysis, the space denoted by c is the vector space of all convergent sequences of real numbers or complex numbers. When equipped with the uniform norm:
the space c becomes a Banach space. It is a closed linear subspace of the space of bounded sequences, ℓ∞, and contains as a closed subspace the Banach space c0 of sequences converging to zero. The dual of c is isometrically isomorphic to ℓ1, as is that of c0. In particular, neither c nor c0 is reflexive.
In the first case, the isomorphism of ℓ1 with c* is given as follows. If ∈ ℓ1, then the pairing with an element in c is given by
This is the Riesz representation theorem on the ordinal ω.
For c0, the pairing between in ℓ1 and in c0 is given by
