res1 = ampaPNL[4 mPip^2][0] /. _NIntegrate -> 0

1 Power :: infy : Infinite expression - encountered. 0

1 Power :: infy : Infinite expression - encountered. 0

∞ :: indet : Indeterminate expression \!\n\(TraditionalForm\`\(0\\ \*InterpretationBox[\"ComplexInfinity\", \n       DirectedInfinity[]]\)\)\n encountered.

1 Power :: infy : Infinite expression - encountered. 0

General :: stop : Further output of Power :: \" infy \" will be suppressed during this calculation.

∞ :: indet : Indeterminate expression \!\n\(TraditionalForm\`\(0\\ \*InterpretationBox[\"ComplexInfinity\", \n       DirectedInfinity[]]\)\)\n encountered.

∞ :: indet : Indeterminate expression \!\n\(TraditionalForm\`\(0\\ \*InterpretationBox[\"ComplexInfinity\", \n       DirectedInfinity[]]\)\)\n encountered.

General :: stop : Further output of ∞ :: \" indet \" will be suppressed during this calculation.

NIntegrate :: inum : Integrand Indeterminate is not numerical at {z} = {0.`} .

NIntegrate :: ploss : Numerical integration stopping due to loss of precision. Achieved neither the requested PrecisionGoal nor AccuracyGoal; suspect one of the following: highly oscillatory integrand or the true value of the integral is 0. If your integrand is oscillatory try using the option Method->Oscillatory in NIntegrate.

NIntegrate :: inum : Integrand Indeterminate is not numerical at {z} = {0.`} .

NIntegrate :: inum : Integrand Indeterminate is not numerical at {z} = {0.`} .

General :: stop : Further output of NIntegrate :: \" inum \" will be suppressed during this calculation.

{0.005877901572252493`, 0.0007394920349552837`, 0.01175053274969464`, -0.000849657864405479`, 0, 6.596462116748257`*^-6, 0.`}

Converted by Mathematica  (July 10, 2003)