Основные результаты
ТЕОРЕМА 3.1.
(а) Если ![](data:image/png;base64,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) , то каждое решение уравнения
![](data:image/png;base64,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) (3.1)
является решением уравнения Штурма-Лиувилля
![](data:image/png;base64,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) (3.2)
(б) Пространство решений уравнения (3.1) является одномерным;
(в) Общее решение уравнения (3.1) имеет следующий вид
![](data:image/png;base64,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) (3.3)
где произвольная постоянная.
ТЕОРЕМА 3.2. Если ![](data:image/png;base64,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) , то антипериодическая краевая задача
![](data:image/png;base64,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) , (3.4)
![](data:image/png;base64,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) , (3.5)
имеет две серий вещественных собственных значений и соответствующих им собственных функций:
а) ![](data:image/png;base64,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) (3.6)
![](data:image/png;base64,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) (3.7)
б) ![](data:image/png;base64,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) , (3.8)
![](data:image/png;base64,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) . (3.9)
Собственные функции ![](data:image/png;base64,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) образуют ортонормированный базис пространства ![](data:image/png;base64,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) , а собственные функции ![](data:image/png;base64,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) не полны в пространстве ![](data:image/png;base64,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) .
Достарыңызбен бөлісу: |