Sum rule for rate and CP asymmetry in $B^+\to K^+Ï^0$
arXiv:hep-ph/0610227 · doi:10.1016/j.physletb.2006.11.044
Abstract
A sum rule relating the ratio $R_c = 2 Î(B^+ \to K^+ Ï^0)/Î(B^+ \to K^0 Ï^+)$ and the CP asymmetry $A_{CP}(B^+ \to K^+Ï^0)$ is proved to first order in the ratio of tree to penguin amplitudes. The sum rule explains why it is possible to have $R_c$ consistent with 1 together with a small CP asymmetry in $B^+ \to K^+ Ï^0$. The measured ratio $A_{CP}(B^+\to K^+Ï^0)/A_{CP}(B^0\to K^+Ï^-)$ rules out a small strong phase difference between a color-suppressed and a color-favored tree amplitude contributing to $B^+\to K^+Ï^0$ as favored by QCD factorization.
small correction