The weighted Davis-Wielandt Berezin number for reproducing kernel Hilbert space operators

• Published in: Journal of inequalities and applications Vol. 2025; no. 1; pp. 24 - 13
• Main Authors: Eslami Mahdiabadi, Nooshin, Bakherad, Mojtaba, Hajmohamadi, Monire, Petrushka, Mykola
• Format: Journal Article
• Language: English
• Published: Cham Springer International Publishing 27.02.2025; Springer Nature B.V; SpringerOpen
• Subjects: Analysis; Applications of Mathematics; Berezin set; Berezin symbol; Davis-Wielandt Berezin; Functionals; Hilbert space; Inequalities; Mathematics; Mathematics and Statistics; Operators (mathematics); Riesz theorem; Weighted Berezin number; Davis-Wielandt Berezin; 47B06; Weighted Berezin number; Berezin symbol; 47B34; Berezin set; 47B32
• ISSN: 1029-242X; 1025-5834; 1029-242X
• DOI: 10.1186/s13660-025-03255-0

A functional Hilbert space is the Hilbert space of complex-valued functions on some set Θ ⊆ C that the evaluation functionals φ λ ( f ) = f ( λ ) , λ ∈ Θ are continuous on H . Then, by the Riesz representation theorem, there is a unique element k λ ∈ H such that f ( λ ) = 〈 f , k λ 〉 for all f ∈ H and every λ ∈ Θ . The function k on Θ × Θ defined by k ( z , λ ) = k λ ( z ) is called the reproducing kernel of H . In this study, we defined the weighted Davis-Wielandt Berezin number, and then we obtained some related inequalities. It is shown, among other inequalities, that if X ∈ L ( H ) and ν ∈ [ 0 , 1 ] , then 1 2 ( ber 2 ( X ν + | X ν | 2 ) + c ber 2 ( X ν − | X ν | 2 ) ) ≤ d w ber ν 2 ( X ) ≤ 1 2 ( ber 2 ( X ν + | X ν | 2 ) + ber 2 ( X ν − | X ν | 2 ) ) , where X ν = ( 1 − 2 ν ) X ∗ + X . Some bounds for the weighted Davis-Wielandt Berezin number are also established.