Основные результаты
ТЕОРЕМА 3.1.
(а) Если ![](data:image/png;base64,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) , то каждое решение уравнения
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAEcAAAANCAYAAAD7c3MVAAAACXBIWXMAAA7LAAAPKQGOb1tYAAAFMElEQVR4nO2We1DUVRTHP4uLgrzRYEXwkRvEaKi4KiKGQiCyKhQqiRmoIU6IMEUI5sj4CA0fRUqMioTvFymKaKKh47NGFAvURpOHb3kYi8hrV7ZdIHDHhUT90+/M/mbvPefc8/197/mde4UNDQ1K3kArhNomBZXXWRi7iYBF8dibKbmZm0XW+bv4BgbSw0BHw7fo/C4OXDNi+nQp5rovR6K08BIXbwnwch3crp+i4hZ7dqchGh2Em535yyVrB6f3J1IscMB3gguGnQTaxakqu8M9XSssDZU8uXOOn9JuEbpg5nPCqNFnxMf4yXewLH4/S6J9GxftCJQ15eTeKOTs9mwsJAk4GmilBA1PSFubiql/CG62r18YNUb5BKG7M4Xv9wgZ7i3RLk7J7YcMfX845p2esHd9Kv2nxGsV5j9Yu/hgti+cvDtujOht0iFCAv1ueHr60f3uTcoVbX/hsuLfyS4zYk0/iw6t3yHoGOAwzpv10Un8eLQUYWH2D4yM2Mm2vZkYn5vPsLVVZKwKxGuAPYq6BnKv6zBJbNgUrNq9neFT2VjjyYYQK8JitrNm/z7sjQx428SYwnJZqzgq32jvAcRnFWvkf2/yN5zdEa1RYerq2XrwLFOlUZTmZeA5LZy5SacYXbkFyfzjZB3cR6+iAhQ97FvjmrlMSzzEys3pXDqUxcLkRBWXF2uhAsEDIkf6UOm3jMh+pwjZrUda6teY6ZtiWlrFgwOHEYqcZrIjvIKci38TKJlIapw9UjdxC+lq4068pStoUXZ83Fauzp5A+v1VHDn+s9qr0WRqXMdfRTJwbN2F4OXrGR3RoEHKSGSrIYyi5jG7EuNQdrdG1kWOmXg021bHsOnkBaYGuBIf68XQPqbk55bSzXpQS1zmd1EUui5BuSqeAM8opiQktQjz4MqvJKUepKL+mcT6lkwPDUNiY9Q4lFcbsGDnesI+jyHfPZns7T2b/Drp0cf0Hs7kINTvaojYwY7tmWe40PVdxkvFGi+jX6ugVK7EpnNzrLyMR2UC7K1FPJLT0oQrKrsgsjbWiFU87aJ61rS7g38eS+FStYOqUovRkdVR210PC/EQSjL38Fu+M15jPBr9DEwMqCz6p2nX6+5yOV/OqMDBFJxNQCBxw7FXax8S9Xdn8Ur3dvMK9Y2oqyxHXiWkp5UZVdVyDLvqoqyr5V61iKt6Y5t6jsiqHxWF2Zj4B2mcOOp+MMJWSd61Chwl3blybCP7cpR8EjFZlTyOzmGRTHIWN5Z4gayScT00G6WdxBW7dgjKVDmT0m4QtuZbFBlLSViXiOjLubxjbIqerIBaywhszPUbfS37DkGZfoaqpx9gpGeIhfl9EqLmMdGlJ2V5+Rw+8Qchfk7tCvIsjqQsoVDHgSB/MQsjl7IkNganvrrUVJVQomoRZrO8msSpr6/De9JnjLR//hTw8ffmo3VH8RscQH+PYNWvaf4X6TMiFpwgT+FCqMjohcmpYdLXjY1b3JoGM1awuXm+vhycpJ/iPUzU4tu19yDMHm7meu1T1YlmQvDqDIKbbYEzO5S2EeNmLmr+58u4Oa3zJTkn6Ww/lsQvPBBuWhyOrvMMJnsP1LqI0taX5K8uk5ayhbEB07Xec06U9SMlQarqJR0nqQFVBaYnxXPbwpUZ0rGaNlUPW5G6nOyMZI7ZfYjHQMtXTPY8Th/YwGOLMayeZ4ehUolwVmzC/waZ2QwiKHiQVpv6njPjdbFTCeAburhNs/ozd58yp037q2KUz2yNcRs3rjdQ44047eBfryDGM/Fo8pMAAAAASUVORK5CYII=) (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 периодическая краевая задача
![](data:image/png;base64,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) , (3.4)
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAADEAAAANCAYAAAAAJIbKAAAACXBIWXMAAA7ZAAAPKQHAcfjIAAAEOklEQVR4nN2Wf0zUZRzHX8ghcBwCd/wK4vglCHgKtKHCFH805I6RTjiYzIolIlgCNUtbBgOX0CqGFBphydC5JYiiDpo/MklJzNB0y8LJj9ORTFIQDw4E7jq+lxSKxmb/2Hv7bs/zfH48n/fneT7P5yvS6/UGnnGIHifoartATd05YpLTcZeYjZMdKP8UB4WKxWF+/0kQujst7N1zgIhVGwly/Pectjbu5+g1WxKTopGZP4bE0L0OKvec4cWMVIHAjcZq8nafwtErlJy3V7N81auUbSnivmMm0d6ypyIwcr+Hyu1VzEp9QyAwGmDJvtMMW7mz4Z0sPKWWj9j4zFMT1fMl23afITJu7sQk2s4fRytXEOBgLRAq/KKa7MJyDm+KZ29TLKlhziyL8eWzY01Epy19KhI9motcGpGR7GqLmUFHc7eEDwqLqc1fxZ7vrvB+fOiEdt5L1Nxan01y/R1Erd8UoNh8jvb6SkpTA2lSfEyGYyd2/uGCsk7bid41RMiIMjaEoostYCThJp/O7f2/0K8H8RST452ZUaSVfDtus/TSBnasNfm6ef5rItK2ceTgES6WJvHRLSUHE+wReQQJcoOZNSqVUhhbT7VCJrGn67djRC5S0nzL5M/WxZu6863Md7fE6d4QnfvqELkuzKQ8diONGi3hK/NImrOUS9U/I7OzEYyGBv7g5o37j2RiyjQ7LHpa6e43IP6rZpTr8qlV3R6nJ1cEjo2dg5XsWt9Gw+VO5qnWUSqN5G5zBTJ7u3E2l+v30SJPIjXKG73Whq0F25DPWUxl1Ulyc7KMSTNgwBq5tIsIziISi20ImeNJxQ8nWDA9CHdXCRoLMe29/YJDKxsPzIYruT1izOTvPQQEyIV1fe9dhux9cBCPL/onwXyqPZ5Bfhyu/x7PkGAig5xo73BAa/T7ANqWBo52OfP6EhdONV5DFWxB+3UrAsI6kUiN9TfQZzx6G+HqdWoduWIVbaoJb7+ZXKj+iTT1cuFqyP1d+bG1DRb7I3HyRv2COakpGUyzlLH1FTdhs+utV3BR+I5dpVF4BIYZvycTkXt40XG1Ac+XkwVbFx8f+s7+apTMFwLL3vAe99xms6FGw/Mr8vDvbeKG9Dmm6bppOX2cxkULWTLbhmFdHx2WU3FISTCR0On6Wftm5thLMCMknI7KGjRrlHgajy1xYxmJDwVzoraZBekrJn0KDzAwMEh88hoC3SXC3N59FuZtdWjMzIS9imrqH7IIpchUJlRU/R3F4NWTDHrFsH1zFKKy3CycVVnEzXUYUzBIZ/BJvppDX+1ElJgyYZ9QvJXDXOOLMlmMZrmqpIA+/2UkRM0cWzcXO/Lh55s4tKuYvpeyJt0nGu/6sePdUMQGA6K1ucUTKlpLfVm52ndCWdxrmZMO/gFGXx51xpYJZaNETD4n9/Mw2id8/jF/bMd+lvC/IPEnuCRog8c70GEAAAAASUVORK5CYII=) , (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: |