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We consider integral kernels for functions f (F ^) of a minimal second-order differential operator F ^ (∇) on a curved spacetime. We show that they can be expanded in a functional series, analogous to the DeWitt expansion for the heat kernel, by integrating the latter term-by-term. This procedure leads to a separation of two types of data: all information about the bundle geometry and the operator F ^ (∇) is still contained in the standard heat kernel coefficients a ^ k F | x, x ′ (we call this property “off-diagonal functoriality”), while information about the function f is encoded in some new scalar functions B α f | σ and W α f | σ, m 2, which we call basis and complete massive kernels, respectively. These objects are calculated for operator functions of the form exp (− τ F ^ ν) / (F ^ μ + λ) as multiple Mellin-Barnes integrals. The article also discusses subtle issues such as the validity of the term-by-term integration, the regularization of IR divergent integrals, and the physical interpretation of the resulting expansions.
Barvinsky et al. (Tue,) studied this question.