Cohen–Hewitt factorization theorem
In mathematics, the Cohen–Hewitt factorization theorem states that if is a left module over a Banach algebra with a left approximate unit , then an element of can be factorized as a product (for some and ) whenever . The theorem was introduced by Paul Cohen (1959) and Edwin Hewitt (1964).
References
- Cohen, Paul J. (1959), "Factorization in group algebras", Duke Mathematical Journal, 26: 199–205, doi:10.1215/s0012-7094-59-02620-1, MR 0104982
- Hewitt, Edwin (1964), "The ranges of certain convolution operators", Mathematica Scandinavica, 15: 147–155, MR 0187016
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