Hilbert空间中正算子单调积分变换的中点及梯形规则误差界

Mathematica Pannonica Pub Date : 2021-10-06 DOI:10.1556/314.2021.00011

S. Dragomir

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摘要

对于连续正函数w(λ)， λ > 0， μ a在(0，∞)上的正测度，我们考虑以下单调积分变换，其中积分假设存在于复希尔伯特空间eh上的正算子。我们证明，对于某些常数α， β， δ， Δ，如果β≥A, B≥α > 0，且0 < δ≤(B−A)2≤Δ，则andwhere是实函数的二阶导数。给出了幂函数和对数的应用。

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Error Bounds Related to Midpoint and Trapezoid Rules for the Monotonic Integral Transform of Positive Operators in Hilbert Spaces

For a continuous and positive function w(λ), λ > 0 and μ a positive measure on (0, ∞) we consider the followingmonotonic integral transformwhere the integral is assumed to exist forT a positive operator on a complex Hilbert spaceH. We show among others that, if β ≥ A, B ≥ α > 0, and 0 < δ ≤ (B − A)2 ≤ Δ for some constants α, β, δ, Δ, thenandwhere is the second derivative of as a real function.Applications for power function and logarithm are also provided.

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Mathematica Pannonica

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