Abstract:
We study two statements of nonlinear problems in Hölder spaces for a parabolic equation with an unknown coefficient at the time derivative and with boundary conditions of the first kind. One statement is a system containing a boundary value problem and an equation for the time dependence of the sought coefficient. In the other statement, in addition it is necessary to determine a boundary function in one of the boundary conditions by using an additional information on this coefficient at a final time. For these statements we justify a construction of approximate solutions on the basis of the Rothe method and the method of quasisolutions.
Keywords:parabolic equations, boundary value problem of the first kind, Hölder spaces, Rothe method, inverse problems, final observation, stability estimates, quasisolutions.
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