[摘要] We put forward a theory extending the notion of principal eigenfunction and principal eigenvalue to the case of linear nonautonomous parabolic PDEs of second order u(t) = Sigma (N)(i,j=1) a(ij)(t, x)partial derivative (2)u/partial derivativex(i)partial derivativex(j) + Sigma (N)(i=1) a(i)(t, x)partial derivativeu/partial derivativex(i) = a(0)(t, x)u, x is an element of Omega, on a bounded domain Omega subset of R-N, With Dirichlet or Robin boundary conditions. A canonically defined one-dimensional subbundle Y (corresponding to the solutions that are globally defined and of the same sign) serves as an analog of principal eigenfunction. The principal spectrum is defined to be the dynamical (Sacker-Sell) spectrum of the linear skew-product flow on Y. Characterizations of principal spectrum in terms of (logarithmic) growth rates of positive solutions are given. Finally, monotonicity of the principal spectrum with respect to zero order terms is proved. (C) 2000 Academic Press.