The inverse Stefan problem as a problem of nonlinear approximation theory

Both one-dimensional two-phase Stefan problem with the thermodynamic equilibrium condition uðRðtÞ; tÞ ¼ 0 and with the kinetic rule u e ðR e ðtÞ; tÞ ¼ eR 0 e ðtÞ at the moving boundary are considered. We prove, when e approaches zero, R e ðtÞ converges to RðtÞ in C 1þd=2 ½0; T for any finite T > 0;

It is an enlarged explanation of some results presented in the author's dissertation ,,Beitriige zum inversen Problem der bLAoE-Gleichung und der bihermonischen Gleichung", Martin-Luther-Universitat Halle -Wittenberg 1984.

A deforming E'EM (DFEM) analysis of one-dimensional inverse Stefan problems is presented. Specifically, the problem of calculating the position and velocity of the moving interface from the temperature measurements of two or more sensors located inside the solid phase is addressed. Since the interfa

In this paper, we discuss an inverse problem in elasticity for determining a contact domain and stress on this domain. We show that this problem is an ill-posed problem, and we establish the uniqueness and ¸-conditional stability estimation for the stress.