Effective actions in supersymmetric gauge theories: heat kernels for non-minimal operators

Abstract

We study the quantum dynamics of a system of n Abelian N=1 vector multiplets coupled to 12 n(n+1) chiral multiplets which parametrise the Hermitian symmetric space Sp(2n, R)/ U(n). In the presence of supergravity, this model is super-Weyl invariant and possesses the maximal non-compact duality group Sp(2n, R) at the classical level. These symmetries should be respected by the logarithmically divergent term (the ``induced action'') of the effective action obtained by integrating out the vector multiplets. In computing the effective action, one has to deal with non-minimal operators for which the known heat kernel techniques are not directly applicable, even in flat (super)space. In this paper we develop a method to compute the induced action in Minkowski superspace. The induced action is derived in closed form and has a simple structure. It is a higher-derivative superconformal sigma model on Sp(2n, R)/ U(n). The obtained N=1 results are generalised to the case of N=2 local supersymmetry: a system of n Abelian N=2 vector multiplets coupled to N=2 chiral multiplets XI parametrising Sp(2n, R)/ U(n). The induced action is shown to be proportional to ∫ d4x d4 θ d4 θ \, E \, K(X, X ), where K(X, X ) is the K\"ahler potential for Sp(2n, R)/ U(n). We also apply our method to compute DeWitt's a2 coefficients in some non-supersymmetric theories with non-minimal operators.