ДОКАЗАТЕЛЬСТВО. Умножив обе части уравнения (1.1) скалярно на![](data:image/png;base64,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) , получим:
![](data:image/png;base64,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)
или
![](data:image/png;base64,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)
Отсюда в силу неравенства (2.1), имеем
Сократив обе части полученного неравенства на ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAA4AAAANCAYAAACZ3F9/AAAACXBIWXMAAA7cAAAPKQGQvGl7AAABGUlEQVR4nGP59+/ffwYyAAsj4yOGiQ1HGHw9mRkOfdVliHfUwqpwS08/g0JSJsO2hf0M54SiGVgYGH4zvHv9keH3dxaGD19/4jD/B8OXt+8Yfv79z/D23RuGJ8y/QRrJA1g1TskyZVjFmcGwJd+QwSsggCFj+n4MhVg1JrSuYHhdNYfhJZsnQ0rxFIYYc2mGFRuI0MgjKM0gI/uZ4cjRCww6JqbEO5WBgYNBQVKAYfvD/wxRARJAPmag4QwcPnE5hhRfHwZ2ZuzRzPL/vzJDbkM4Ax83C0PCf3aGN3ePM8xefYjBLzaTQUsEpomDwaekkIFVAOiS/GqG76y8EBuFRYTA0vwgQtmSobLCEtPfwhA17FC11I1HYgAA1U9PMH7YVYwAAAAASUVORK5CYII=) , получим требуемое утверждение леммы.
Из этой леммы следует единственность сильного решения.
Предположим, что начальная задача (1.1)-(1.2) имеет более двух решений, тогда существуют по крайней мере два решения: ![](data:image/png;base64,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) и![](data:image/png;base64,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) такие, что ![](data:image/png;base64,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) , и ![](data:image/png;base64,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) , ![](data:image/png;base64,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) , ![](data:image/png;base64,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) , ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACIAAAANCAYAAADMvbwhAAAACXBIWXMAAA75AAAPKQHH3f3+AAACv0lEQVR4nM2UbUhTYRTH/1sXdbmcutFy6jSnaGuWXxJzJmpqDSMJ0ixnZFiSIST5wRhCfjEU8UuOms4+aFRTcCKhIcqyhoYWi0nS8qVJmGDMN3wZMu/t3ktMR0gQKP7h3Ms9PM95fvfPOQ9BkiSFfSCCeWyuOWA29WB8LQxFOWd2/dCFcTMMAxNQZuUgNsh3C8TSbYSVjEFpbtKuQzAKiErCFfpdU6dDyaN7kHpxQXCck+joHYO6uvC/inI48xg0/cLplGiP/NKMFTptMwjFRZTlKfGmuQ4muws3yiohFx1gYdJkHTAO2KHOkIFwzX6HnYqAWMSYQ8Fi0KDo6RfUValRmq7GXdMM7iiFO4JQVCCmPjdgUVwM1TGxO9/TpkX8zXpIRlvQ0PQe3a83UfMwFtr6dmir89g1EeEyGL9OYySTBllZXoRXSAAOUiTze4hIvY60tgeYccmhb7qNvuUVessWyLBRh1dvx7C5DWZjYRofesoR2qqH4rA3GJd/LiQjI5IPUVAqyi9rUPusBXKBEwLRS/c+npCP1b4pvBtMA8H38wc1Z8Mahwse7Qh/9QfmjpyFKlECQ4U30iuEWKco8GhIRvGXiunwdKX3eSOSpUoWgnXJRwZpQCuGhz7B0a9HWEISJmxj4BxahcQ/2L1v3bECP2k0Ek7SzUoER0NKdmF2zgkhXchmHYL4VApErnWMzo/DrjNAej8fPL7Pjj0SolAhMy7UI68qKECXsRuuuHw8vqCE1fQCZssGsnML2RagSCds32yIOq5CBo8EQXmFIjFSgD7LJBTn5JBnV6KWXQo8aencsTe294g8LvCvvK9Ihqu3St3fJ1Kv0YE/lQHu/BQ6hwWoLAln3WbH93yZBkc/9kPf7tize6RtZAlVjRpI6NFlxIJwuD6Iic+iY9cZWDGjWxzlmSP25uh/a9+A/AawR+xF1eGyAAAAAABJRU5ErkJggg==) , где![](data:image/png;base64,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) и![](data:image/png;base64,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) последовательности классических решений задачи (1.1)-(1.2). Тогда их разность ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAADMAAAANCAYAAAAE0Vb3AAAACXBIWXMAAA7eAAAPKQHddMhwAAACwElEQVR4nO2WbUhTYRTH/3deV5ubOqfiblfc1PmeTV0oDcMEUbTsRcVcpEWWkR8Mo2BWFvpJKkh6MyUhkMAGpSlK9KKF9SXTZqYwMgpBCSvF2ZySu21TtDU1x4RC+n+55/65zzn3d3jOcy9pNBoZrBGRf/sFVlP/Yf5VkcSnNgRu2Y2B4XGLoe5nkBG8+BgRk4NIlPqhbcjazyxvwt3TaZaYMX7FvnAKrscf43puOIpzSlDQeBOhjGOjWXsyBdVf09BYEQ9lVDQONBuwX8a2hjH6xqLjdS80HffhIc+DXLx0UeM6ISrqWvDFYO37SGPmY72BjQJVKQZob+i+aTEuEi0LYoavKSvDu1FrPyL5EA6nRs7WNYxDsTMPmh4uXAhvFJVWISiIZZOLZKYMFhD+xkxIPJ2WLLpSuXD56NQMIiqOh95nanDEMujGJsB35y36PMES4sj5ymVzsta7Qj+sxQa3JIwMafGZjkM613ZCyNqze1D/0Q/Sh29ABifiSuFWVFa1QBYmwIPuKZSrcsGZ6yzB4kKekPJHoGmdFjWVlyCnCGhfNKFdEYYQdj+a+gjQ032YCc1CTrz/ClpjrecNtaa5yEaxMhKdrbfR/V0EZkgDOl6J2GgaZP7FduT/suBDVxeEeIUzDVIcC6GhN3kcO4uqqp/Oxyfmrp2tL6G5Vwd2UTE4PaahsxMmKuscmrMW7md+6KC+Wg+l6igm3o9gzAzz+yKxLARPWoS4XJiKO3W3IH6rgDBCbCeOrShvd2zaewpJY49wbToBw6OTEAnsbdOCPJydkFFyAQGDN9Bq2A5C3b740bxtVwF8/L2QsyMNtERichz/SXD124xMygUChkK2P+kQiFme4clI54lABh6Es14Ivo/EFsY8FwERs1sgRpGE1QAxi+dJYfYIcIOCcjyfwHdumwpi4GUJmLX10fwJ58zQqINSd1oAAAAASUVORK5CYII=) является решением классической задачи ![](data:image/png;base64,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) , поэтому в силу неравенства (2.3) имеет место неравенства:
![](data:image/png;base64,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)
Переходя к пределу в этом неравенстве при![](data:image/png;base64,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) , получим
что противоречит нашему предположению, мы пришли к противоречию, стало быть не верно наше предположение о существовании более двух решений. Следовательно, существует не более одного решения.
Достарыңызбен бөлісу: |