Peripherally Monomial-Preserving Maps between Uniform Algebras

Abstract: Let A and B be uniform algebras and p(z, w) = z m w n a twovariable monomial. We characterize maps T from certain subsets of A into B such that σπ(p(T (f ), T (g))) ⊂ σπ(p(f, g)) holds for all f and g in the domain of T ; peripherally monomial-preserving maps. Furthermore A and B are proved to be isometrical isomorphic as Banach algebras. If the greatest common divisor of m and n is 1, then T is extended to an isometrical linear isomorphism; a weighted composition operator. An example of peripherally monomial-… Show more

“…Motivated by this equality, we will consider two surjections S and T that satisfy r(S( f )T (g) − α) = r( f g − α) for some α ∈ C \ {0}, or σ π (S( f )T (g)) = σ π ( f g). In this paper, we will extend the results in [3,18] for S and T under the spectral radius condition, or the peripheral spectral condition.…”

“…Luttman and Tonev [16] proved that a peripherally multiplicative surjection S : A → B with S(1) = 1 is an isometric algebra isomorphism. Most recently, Hatori, Hino, Miura and Oka [3] have generalized the theorem of Luttman and Tonev. Among other things, they proved that if natural numbers m, n and a surjection S : A → B with S(1) = 1 satisfy σ π (S( f ) m S(g) n ) ⊂ σ π ( f m g n ) for all f , g ∈ A, then there exists an isometric algebra isomorphismS :…”

“…In [3], surjections S : A → B between uniform algebras that satisfy σ π (S( f ) m S(g) n ) ⊂ σ π ( f m g n ) ( f , g ∈ A) for some natural numbers m and n were characterized. The case when m = n = 1 was proven by Lambert, Luttman and Tonev [15,Corollary 4].…”

“…The notion of absolute multiplicativity was introduced in [3]. For example, if M is a multiplicative semigroup of A, that is M ⊂ A is closed under multiplication of A, then M is absolutely multiplicative.…”

Generalizations of spectrally multiplicative surjections between uniform algebras

“…Motivated by this equality, we will consider two surjections S and T that satisfy r(S( f )T (g) − α) = r( f g − α) for some α ∈ C \ {0}, or σ π (S( f )T (g)) = σ π ( f g). In this paper, we will extend the results in [3,18] for S and T under the spectral radius condition, or the peripheral spectral condition.…”

“…Luttman and Tonev [16] proved that a peripherally multiplicative surjection S : A → B with S(1) = 1 is an isometric algebra isomorphism. Most recently, Hatori, Hino, Miura and Oka [3] have generalized the theorem of Luttman and Tonev. Among other things, they proved that if natural numbers m, n and a surjection S : A → B with S(1) = 1 satisfy σ π (S( f ) m S(g) n ) ⊂ σ π ( f m g n ) for all f , g ∈ A, then there exists an isometric algebra isomorphismS :…”

“…In [3], surjections S : A → B between uniform algebras that satisfy σ π (S( f ) m S(g) n ) ⊂ σ π ( f m g n ) ( f , g ∈ A) for some natural numbers m and n were characterized. The case when m = n = 1 was proven by Lambert, Luttman and Tonev [15,Corollary 4].…”

“…The notion of absolute multiplicativity was introduced in [3]. For example, if M is a multiplicative semigroup of A, that is M ⊂ A is closed under multiplication of A, then M is absolutely multiplicative.…”

Generalizations of spectrally multiplicative surjections between uniform algebras

“…For instance, the Gleason-Kahane-Żelazko theorem and the theorem by Kowalski and S lodkowski are related to this problem. Recently in [29] Tonev and Toneva gave non-linear sufficient conditions for isometries between dense subsets of uniformly closed function algebras, not necessarily unital, to be weighted composition operators and in particular, they obtained a characterization of norm-additive in modulus maps using a technique similar to the one used in the study of weak multiplicative maps ( [28]), or one can see some related conclusions in [5,13,14,16,26]. Moreover, Miura characterized in [21] R-linear isometries between function algebras and generalized some previous results.…”

Norm-additive in modulus maps between function algebras

Maps Between Uniform Algebras Preserving Norms of Rational Functions