Prime-like Elements and Semi-direct Products in Commutative Banach Algebras

Abstract: We develop results which show that elements in the radical of a commutative Banach algebra are often precluded from having prime-like properties if we avoid certain exceptional situations involving torsion elements. This makes the proof of the Singer-Wermer conjecture conceptually much clearer. It also motivates the definition of an element having regular powers and allows us to strengthen our previous results concerning necessary conditions for a commutative Banach algebra A to be the semidirect product of so… Show more

“…Indeed, in this case the product of two elements (b, a) and (b ′ , a ′ ) of B ⊕ I is given by (b, a)(b ′ , a ′ ) = (bb ′ , aa ′ + ba ′ + ab ′ ), and this algebra endowed with the norm (b, a) = b + a is a Banach algebra. This notion was also studied by Berndt [4] and Thomas [21,22] and they considered under what conditions a commutative Banach algebra is the semidirect product of a subalgebra and a principal ideal. We also note that the algebra B ⊕ I is a splitting extension of B by I.…”

The multiplier algebra and BSE-functions for certain product of Banach algebras

“…Indeed, in this case the product of two elements (b, a) and (b ′ , a ′ ) of B ⊕ I is given by (b, a)(b ′ , a ′ ) = (bb ′ , aa ′ + ba ′ + ab ′ ), and this algebra endowed with the norm (b, a) = b + a is a Banach algebra. This notion was also studied by Berndt [4] and Thomas [21,22] and they considered under what conditions a commutative Banach algebra is the semidirect product of a subalgebra and a principal ideal. We also note that the algebra B ⊕ I is a splitting extension of B by I.…”

The multiplier algebra and BSE-functions for certain product of Banach algebras

“…The above definition can be extended to define (weakly) almost k-prime and (weakly) almost prime elements (see below). These definitions are due to Thomas; see [3]. Thomas, with help from a theorem of Runde, has reduced the unbounded Kleinecke-Shirokov conjecture [1] to showing the non-existence of elements with certain prime-like properties in commutative radical Banach algebras [4].…”

An Almost Prime Element in a Commutative Radical Banach Algebra