Backward Uniqueness of Kolmogorov Operators
classification
🧮 math.AP
keywords
partialbackwarduniquenesskolmogorovcarlemandecompositionglobalinequality
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The backward uniqueness of the Kolmogorov operator $L=\sum_{i,k=1}^n\partial_{x_i}(a_{i,k}(x,t)\partial_{x_k})+\sum_{l=1}^m x_l\partial_{y_l}-\partial_t$, was proved in this paper. We obtained a weak Carleman inequality via Littlewood-Paley decomposition for the global backward uniqueness.
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