Carleman estimates and unique continuation property for abstract elliptic equations
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Date
2012
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Springeropen
Abstract
The unique continuation theorems for elliptic differential-operator equations with variable coefficients in vector-valued L (p) -space are investigated. The operator-valued multiplier theorems, maximal regularity properties and the Carleman estimates for the equations are employed to obtain these results. In applications the unique continuation theorems for quasielliptic partial differential equations and finite or infinite systems of elliptic equations are studied. AMS: 34G10; 35B45; 35B60.
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Carleman estimates, unique continuation, embedding theorems, Banach-valued function spaces, differential operator equations, maximal L-p-regularity, operator-valued Fourier multipliers, interpolation of Banach spaces
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