On-diagonal asymptotics for heat kernels of a class of inhomogeneous partial differential operators

Abstract

We consider certain constant-coefficient differential operators on Rd with positive-definite symbols. Each such operator with symbol P defines a semigroup e-t , t>0 , admitting a convolution kernel HtP for which the large-time behavior of HPt(0) cannot be deduced by basic scaling arguments. The simplest example has symbol P()=(η+ζ2)2+η4 , =(η,ζ)∈ R2 . We devise a method to establish large-time asymptotics of HtP(0) for several classes of examples of this type and we show that these asymptotics are preserved by perturbations by certain higher-order differential operators. For the P just given, it turns out that HtP(0) cPt-5/8 as t∞ . We show how such results are relevant to understand the convolution powers of certain complex functions on Zd . Our work represents a first basic step towards a good understanding of the semigroups associated with these operators. Obtaining meaningful off-diagonal upper bounds for HPt remains an interesting challenge.