Abstract: Primary Decomposition Theorem in linear algebra ensures that a finite dimensional vector space over a field with a linear operator can be presented by a direct sum of subspaces. Indeed, the subspaces are invariant under the given operator, and this property yields outcomes that their characteristic polynomials and minimal polynomials are factors of those of the operator. Another example is an application on the general solution of an nth homogeneous ODE.
타이거 세미나
제목 | (국문발표 20180612 Primary Decomposition Theorem and its applications on examples)고태희 |
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내용 |
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첨부 |
BK part 1.pdf
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