# A resolution of the inclusive flavor-breaking $\tau$ $|V_{us}|$ puzzle

**Authors:** Renwick J. Hudspith, Randy Lewis, Kim Maltman, James Zanotti

arXiv: 1702.01767 · 2018-05-09

## TL;DR

This paper proposes a new method for extracting |V_{us}| from tau decay data, addressing previous inconsistencies and achieving results consistent with unitarity expectations.

## Contribution

It introduces a novel sum rule approach that fits both |V_{us}| and higher-dimension condensates to data, reducing unphysical dependencies and resolving the longstanding puzzle.

## Key findings

- New sum rule implementation yields higher |V_{us}| values.
- Results are in agreement with K_{l3} determinations.
- Addresses and corrects previous unphysical dependencies.

## Abstract

We revisit the puzzle of $|V_{us}|$ values obtained from the conventional implementation of hadronic-$\tau$-decay-based flavor-breaking finite-energy sum rules lying $>3 \sigma$ below the expectations of three-family unitarity. Significant unphysical dependences of $|V_{us}|$ on the choice of weight, w, and upper limit, $s_0$, of the experimental spectral integrals entering the analysis are confirmed, and a breakdown of assumptions made in estimating higher dimension, $D>4$, OPE contributions is identified as the main source of these problems. A combination of continuum and lattice results is shown to suggest a new implementation of the flavor-breaking sum rule approach in which not only $|V_{us}|$, but also $D>4$ effective condensates, are fit to data. Lattice results are also used to clarify how to reliably treat the slowly converging D=2 OPE series. The new sum rule implementation is shown to cure the problems of the unphysical w- and $s_0$-dependence of $|V_{us}|$ and to produce results $\sim 0.0020$ higher than those of the conventional implementation. With B-factory input, and using, in addition, dispersively constrained results for the $K\pi$ branching fractions, we find $\vert V_{us}\vert =0.2231(27)_{exp}(4)_{th}$, in excellent agreement with the result from $K_{\ell 3}$, and compatible within errors with the expectations of three-family unitarity, thus resolving the long-standing inclusive $\tau$ $|V_{us}|$ puzzle.

## Full text

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## Figures

12 figures with captions in the complete paper: https://tomesphere.com/paper/1702.01767/full.md

## References

36 references — full list in the complete paper: https://tomesphere.com/paper/1702.01767/full.md

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Source: https://tomesphere.com/paper/1702.01767