On the Γ-convergence of matrix fields related to the adjugate Jacobian

Adjugate Jacobians of mappings $\text{f}{}_{\mathrm{j}}\text{:Ω?}\text{R}{}^2\text{→}\text{R}{}^2$ can be represented in terms of Jacobian matrices: $\text{adj}\text{Df}{}_{\mathrm{j}}\text{=}\text{A}{}_{\mathrm{j}}\text{(x)Df}{}^{\mathrm{t}}{}_{\mathrm{j}}$, for $\text{j=1,2,…}$, by mean of symmetric matrix fields $\text{A}{}_{\mathrm{j}}\text{(x)}$ with $\text{det}\text{A}{}_{\mathrm{j}}\text{(x)=1}$ a.e. Under suitable conditions, we prove that $\text{Df}{}_{\mathrm{j}}\text{?Df}$ weakly in $\text{L}{}^1{}_{\mathrm{<mtext>loc</mtext>}}\text{(Ω;}\text{R}{}^2\text{)}$ if and only if $\text{A}{}_{\mathrm{j}}\text{(x)}$Γ-converges to a matrix $\text{A}\text{(x)}$ with $\text{det}\text{A}\text{(x)=1}$ satisfying $\text{adj}\text{Df=}\text{A}\text{(x)Df}{}^{\mathrm{t}}$. To cite this article: C. Sbordone, C. R. Acad. Sci. Paris, Ser. I 337 (2003).     

A comparison result for a class of quasilinear elliptic partial differential equations

A comparison theorem and a uniqueness corollary for positive solutions to the equation

on the closure of a bounded open set are found. The important hypotheses on the nonlinear coefficients are that each p_i is positive and monotone increasing in u while q is monotone decreasing in u. An application is made to equations arising in the theory of chemical reactors.     

Trajectories joining critical points of nonlinear parabolic and hyperbolic partial differential equations

Consider the following nonlinear Dirichlet boundary value problems:

$\text{D}{}_{\mathrm{t}}\text{u(t,x)=Lu(t,x)+f(u(t,x)),}\text{t?0,x∈Ω}\text{u(t,x)=0,}\text{t?0,x∈?Ω}$

(1.1)

$\text{D}{}_{\mathrm{t}}\text{D}{}_{\mathrm{t}}\text{u(t,x)=Lu(t,x)+}\text{α}\text{L(D}{}_{\mathrm{t}}\text{u(t,x))+f(u(t,x)),}\text{α}\text{>0,t?0,x∈Ω}\text{u(t,x)=0,}\text{t?0,x∈?Ω}$

(1.2)

$\text{Lu(x)+f(u(x)),}\text{x∈Ω}\text{u(x)=0,}\text{x∈?Ω}$

. (1.3) In all of these equations, f: R → R is a locally Lipschitzian asymptotically linear function with positive asymptotic slope, f(0) = 0, and L is a self-adjoint, negativedefinite and strongly elliptic second-order differential operator on a smooth domain Ω in Rⁿ. The solutions of (1.1) and (1.2) generate semiflows which are not pointdissipative and whose equilibria are determined by solutions of (1.3). In this paper, using an extension (due to the present author) of Conley's Morse index theory to noncompact spaces, we prove not only the existence of positive solutions of (1.3) (a result shown earlier by Peitgen and Schmitt using different methods), but also show the existence of (nonconstant) heteroclinic orbits of (1.1) and (1.2) joining two sets of equilibria.     

Integral transforms of analytic functions on abstract Wiener spaces

Let (H, B) be an abstract Wiener pair and p_t the Wiener measure with variance t. Let $\text{E}$_a be the class of exponential type analytic functions defined on the complexification [B] of B. For each pair of nonzero complex numbers α, β and f ? $\text{E}$_a, we define

$\text{F}{}_{\mathrm{\alpha ,\beta }}\text{f(y)=}\text{∫}\text{B}\text{f(αx+βy)p}{}_1\text{(dx) (y ?[B]).}$

We show that the inverse $\text{F}$_α,β^?1 exists and there exist two nonzero complex numbers α′,β′ such that

. Clearly, the Fourier-Wiener transform, the Fourier-Feynman transform, and the Gauss transform are special cases of $\text{F}$_α,β. Finally, we apply the transform to investigate the existence of solutions for the differential equations associated with the operator $\text{N}$_c, where c is a nonzero complex number and $\text{N}$_c is defined by

$\text{N}{}_{\mathrm{c}}\text{u(x)=?Δu(x)+c(x,Du(x))}$

where Δ is the Laplacian and (·, ·) is the $\text{B-B}{}^1$ pairing. We show that the solutions can be represented as integrals with respect to the Wiener measure.     

Asymptotic stability of some quasilinear parabolic equations in divergence form. L∞ results

In this paper we study the behavior of solutions of some quasilinear parabolic equations of the form

$\text{(}\text{?u}\text{?t}\text{) ?}\text{∑}\text{i=1}\text{n}\text{(}\text{d}\text{dx}{}_{\mathrm{i}}\text{) a}{}_{\mathrm{i}}\text{(x, t, u, u}{}_{\mathrm{x}}\text{) + a(x, t, u, u}{}_{\mathrm{x}}\text{)u + f(x, t) = O,}$

as t → ∞. In particular, the solutions of these equations will decay to zero as t → ∞ in the L^∞ norm.