𝐒𝐋₂(ℝ), exponential Herglotz representations, and spectral averaging

Gesztesy, Fritz; Makarov, Konstantin

doi:10.1090/S1061-0022-04-00814-3

$\mathbf {\operatorname {SL} _2({\mathbb {R}})}$, exponential Herglotz representations, and spectral averaging
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by Fritz Gesztesy and Konstantin A. Makarov

St. Petersburg Math. J. 15 (2004), 393-418

DOI: https://doi.org/10.1090/S1061-0022-04-00814-3

Published electronically: March 30, 2004

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Abstract:

We revisit the concept of spectral averaging and point out its relationship with one-parameter subgroups of $\operatorname {SL}_2({\mathbb {R}})$ and the corresponding Möbius transformations. In particular, we identify exponential Herglotz representations as the basic ingredient for the absolute continuity of averaged spectral measures with respect to Lebesgue measure; the associated spectral shift function turns out to be the corresponding density for the averaged measure. As a by-product of our investigations we unify the treatment of rank-one perturbations of selfadjoint operators and that of selfadjoint extensions of symmetric operators with deficiency indices $(1,1)$. Moreover, we derive separate averaging results for absolutely continuous, singular continuous, and pure point measures and conclude with an averaging result for the $\kappa$-continuous part (with respect to the $\kappa$-dimensional Hausdorff measure) of singular continuous measures.

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