算子单调函数的新不等式

S. Dragomir
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引用次数: 0

摘要

”在本文中,我们证明,如果f:[0,∞)→R是运营商单调在[0,∞),然后对所有A, B, 0 <α≤≤的β<γB≤≤δ一些积极的常量α、β、γ、δ,0≤(γ-β)((f(δ)- f(β))/(δ-β))f - f (A) (B)≤≤(δ-α)((f(γ)- f(α))/(γ-α))。特别是,我们有著名的细化和反向Lowner-Heinz不等式0 <(γ-β)((δ^ {r} -β^ {r}) /(δ-β))≤B ^ {r}——^ {r}≤(δ-α)((γ^ {r} -α^ {r}) /(γ-α))为所有r∈(0,1)。”
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New inequalities for operator monotone functions
"In this paper we prove that, if f:[0,∞)→R is operator monotone on [0,∞), then for all A, B such that 0<α≤A≤β<γ≤B≤δ for some positive constants α, β, γ, δ, 0≤(γ-β)((f(δ)-f(β))/(δ-β))≤f(B)-f(A)≤(δ-α)((f(γ)-f(α))/(γ-α)). In particular, we have the refinement and reverse of the celebrated Löwner-Heinz inequality 0<(γ-β)((δ^{r}-β^{r})/(δ-β))≤B^{r}-A^{r}≤(δ-α)((γ^{r}-α^{r})/(γ-α)) for all r∈(0,1]."
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CiteScore
1.10
自引率
10.00%
发文量
18
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