The Anatomy of '/ Beyond Leading Logarithms with Improved Hadronic Matrix Elements

Abstract

We use the recently calculated two--loop anomalous dimensions of current-current operators, QCD and electroweak penguin operators to construct the effective Hamiltonian for S=1 transitions beyond the leading logarithmic approximation. We solve the renormalization group equations and give the numerical values of Wilson coeff. functions. We propose a new semi-phenomenological approach to hadronic matrix elements which incorporates the data for CP-conserving K → ππ amplitudes and allows to determine the matrix elements of all (V-A) (V-A) operators in any renormalization scheme and do a renormalization group analysis of all hadronic matrix elements Qi(μ) . We compare critically our treatment of these matrix elements with those given in the literature. We find in the NDR scheme = (6.7 2.6)× 10-4 in agreement with the experimental findings of E731. We point out however that the increase of Q6 by only a factor of two gives = (20.0 6.5)× 10-4 in agreement with the result of NA31. The dependence of on MS, mt and Q6,8 is presented.

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