Selfadjoint operator matrices with finite rows
4PDF
TL;DRAbstract
A generalization of the Carleman criterion for selfadjointness of Jacobi matrices to the case of symmetric matrices with finite rows is established. In particular, a new proof of the Carleman criterion is found. An extension of Jørgensen's criterion for s
Chat with Paper
AI Agents for this Paper
A generalization of the Carleman criterion for selfadjointness of Jacobi matrices to the case of symmetric matrices with finite rows is established. In particular, a new proof of the Carleman criterion is found. An extension of Jørgensen's criterion for s
Keywords
MathematicsRowGeneralizationExtension (predicate logic)Operator (biology)Row and column spacesPure mathematicsAlgebra over a field
Chat
Click to start Chat