Asymptotic Expansions of the Heat Kernel of the Laplacian for General Annular Bounded Domains with Robin Boundary Conditions：Further Results

The asymptotic expansions of the trace of the heat kernel θ(t)=∑^∞v=1^exp(-tλv) for small positive t,where {λv} are the eigenvalues of the negative Laplacian -△n=-∑^ni=1(D/Dx^1)^2 in R^2(n=2 or 3),are studied for a general annular bounded domain Ω with a smooth inner boundary DΩ1 and a smooth outer boundary DΩ2,where a finite number of piecewise smooth Robin boundary conditions(D/Dnj γh)Ф=0 on the components Гj(j= 1,...,m) of (DΩ1 and on the components Гj (j=k 1,…,m) of of DΩ2 are considered such that DΩl=U^kj=lГj and DΩ2= U^m=k 1Гj and where the coefficients γj(j=1,...,m) are piecewise smooth positive functions. Some applications of θ(t) for an ideal gas enclosed in the general annular bounded domain Ω are given. Further results are also obtained.

Asymptotic Expansions of the HeatKernel of the Laplacian for General Annular Bounded Domains withRobin Boundary Conditions: Further Results

Abstract The asymptotic expansions of the trace of the heat kernel for small positive t, where {λ _v } are the eigenvalues of the negative Laplacian in R ⁿ (n = 2 or 3), are studied for a general annular bounded domain Ω with a smooth inner boundary and a smooth outer boundary , where a finite number of piecewise smooth Robin boundary conditions on the components Γ _j (j = 1, ..., k) of and on the components Γ _j (j = k+1, ...,m) of are considered such that and and where the coeffcients γ _j (j = 1, ...,m) are piecewise smooth positive functions. Some applications of Θ(t) for an ideal gas enclosed in the general annular bounded domain Ω are given. Further results are also obtained.