AbstractThe problem of computing a principal coefficient function P in the differential equation −∇·(P(x)∇u)=f, x∈Ω⊂RM, M⩾1, on a bounded region Ω from a knowledge of the solution function u and the right-hand side f, where u, f are known only approximately and P may have mild discontinuities, is solved by minimization of an associated functional
AbstractThe identification of the nonlinearity a:Rd→Rd in the equation−diva(∇y)=finΩ,y=0on∂Ω, is don...
AbstractElliptic inverse problems can be formulated using coefficient-dependent energy least-squares...
We study a linear elliptic partial differential equation of second order in a bounded domain ? ? R...
AbstractThe problem of computing a principal coefficient function P in the differential equation −∇·...
A number of algorithms have been proposed and analyzed for estimating a coefficient in an elliptic b...
AbstractWe consider the question of recovering the coefficient q from the equation −Δuj+q(x)uj=ƒj(x)...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
We consider elliptic problems with complicated, discontinuous diffusion tensor A0. One of the standa...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
AbstractWe prove W1,p estimates for elliptic equations in divergence form under the assumption that ...
AbstractThe paper deals with an elliptic problem with coefficients discontinuous along a certain sur...
Abstract. We consider boundary value problems where the operator defined in a domain and the boundar...
Thesis (Ph.D.)--Wichita State University, College of Liberal Arts and Sciences, Dept. of Mathematics...
AbstractWe analyze the numerical identification of the transmissivity coefficient in the n-dimension...
We present a technique for the rapid and reliable evaluation of linear-functional output of ellipti...
AbstractThe identification of the nonlinearity a:Rd→Rd in the equation−diva(∇y)=finΩ,y=0on∂Ω, is don...
AbstractElliptic inverse problems can be formulated using coefficient-dependent energy least-squares...
We study a linear elliptic partial differential equation of second order in a bounded domain ? ? R...
AbstractThe problem of computing a principal coefficient function P in the differential equation −∇·...
A number of algorithms have been proposed and analyzed for estimating a coefficient in an elliptic b...
AbstractWe consider the question of recovering the coefficient q from the equation −Δuj+q(x)uj=ƒj(x)...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
We consider elliptic problems with complicated, discontinuous diffusion tensor A0. One of the standa...
We propose a double obstacle phase field approach to the recovery of piece-wise constant diffusion c...
AbstractWe prove W1,p estimates for elliptic equations in divergence form under the assumption that ...
AbstractThe paper deals with an elliptic problem with coefficients discontinuous along a certain sur...
Abstract. We consider boundary value problems where the operator defined in a domain and the boundar...
Thesis (Ph.D.)--Wichita State University, College of Liberal Arts and Sciences, Dept. of Mathematics...
AbstractWe analyze the numerical identification of the transmissivity coefficient in the n-dimension...
We present a technique for the rapid and reliable evaluation of linear-functional output of ellipti...
AbstractThe identification of the nonlinearity a:Rd→Rd in the equation−diva(∇y)=finΩ,y=0on∂Ω, is don...
AbstractElliptic inverse problems can be formulated using coefficient-dependent energy least-squares...
We study a linear elliptic partial differential equation of second order in a bounded domain ? ? R...