Abstract
We study a holomorphic effective potential W eff( Φ) in chiral superfield model defined in terms of arbitrary kählerian potential K( Φ ̄ ,Φ) and arbitrary chiral potential W( Φ). Such a model naturally arises as an ingredient of low-energy limit of superstring theory and it is called here the general chiral superfield model. Generic procedure for calculating the chiral loop corrections to effective action is developed. We find lower two-loop chiral correction in the form W eff (2)(Φ)= 6 (4π) 4 ζ(3) W ̄ ′′′2(0) W ′′(Φ) K 2 Φ Φ ̄ (0,Φ) 3 , K Φ Φ ̄ (0,Φ)= ∂ 2K( Φ ̄ ,Φ) ∂Φ∂ Φ ̄ Φ ̄ =0 and ζ( x) be the Riemannian dzeta-function. This correction is finite at any K( Φ ̄ ,Φ) , W( Φ).
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