BijnensLogs1 = Collect[(4 2^(1/2) QuarkCondensate[]^2 (ParticleMass[PseudoScalar[2]]^2 - ParticleMass[PseudoScalar[6]]^2) (BijnensLogs) /. gellmannOkubo /. C -> 1 /. Log -> log // Simplify) /. log[a_] :> log[a /. toEtaRules] /. log[ParticleMass[p_]^2/ParticleMass[q_]^2] -> log[ParticleMass[p]^2/ScaleMu^2] - log[ParticleMass[q]^2/ScaleMu^2] // Simplify, {_DecayConstant, Pi, _log}] /. log[a_] * b_ :> log[a] * Simplify[b]

1/(π^2 (f _ ϕ^(ó  ))^2) (-1/4 log((m _ K^(ó  ))^2/μ^2) (m _ K^(ó  ))^2 (c _ 5^( ) ((m _ π^(ó  ))^4 - 2 (m _ K^(ó  ))^2 (m _ π^(ó  ))^2 + p _ 1^2 (m _ K^(ó  ))^2) + c _ 2^( ) ((m _ π^(ó  ))^2 (m _ K^(ó  ))^2 + p _ 1^2 (4 (m _ π^(ó  ))^2 - 5 (m _ K^(ó  ))^2))) (!, _ 0^( ))^2 - 1/72 log((m _ η^(ó  ))^2/μ^2) ((m _ π^(ó  ))^2 - 4 (m _ K^(ó  ))^2) (3 c _ 5^( ) (-(m _ π^(ó  ))^4 + 2 (m _ K^(ó  ))^2 (m _ π^(ó  ))^2 + p _ 1^2 (m _ K^(ó  ))^2) + c _ 2^( ) ((m _ π^(ó  ))^4 - 4 (m _ K^(ó  ))^2 (m _ π^(ó  ))^2 + p _ 1^2 (5 (m _ K^(ó  ))^2 - 8 (m _ π^(ó  ))^2))) (!, _ 0^( ))^2 + 1/8 log((m _ π^(ó  ))^2/μ^2) (m _ π^(ó  ))^2 (c _ 5^( ) (3 (m _ π^(ó  ))^4 - 6 (m _ K^(ó  ))^2 (m _ π^(ó  ))^2 + p _ 1^2 (m _ K^(ó  ))^2) + c _ 2^( ) (3 (m _ π^(ó  ))^4 + p _ 1^2 (7 (m _ K^(ó  ))^2 - 8 (m _ π^(ó  ))^2))) (!, _ 0^( ))^2)

Converted by Mathematica  (July 10, 2003)