Bounds on the Unitarity Triangle, 2β and Kπ Decays in Models with Minimal Flavour Violation

Abstract

We present a general discussion of the unitarity triangle from εK, Md,s and K π in models with minimal flavour violation (MFV), allowing for arbitrary signs of the generalized Inami--Lim functions Ftt and X relevant for (εK, Md,s) and K π, respectively. In the models in which Ftt has a sign opposite to the one in the Standard Model, i.e. Ftt<0, the data for (εK, Md,s) imply an absolute lower bound on the Bd KS CP asymmetry a KS of 0.69, which is substantially stronger than 0.42 arising in the case of Ftt>0. An important finding of this paper is the observation that for given Br(K+π+) and a KS only two values for Br(KLπ0), corresponding to the two signs of X, are possible in the full class of MFV models, independently of any new parameters arising in these models. This provides a powerful test for this class of models. Moreover, we derive absolute lower and upper bounds on Br(KLπ0) as functions of Br(K+π+). Using the present experimental upper bounds on Br(K+π+) and |Vub/Vcb|, we obtain the absolute upper bound Br(KLπ0)< 7.1 · 10-10 (90% C.L.).

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