(2)
(1)-теңдеуді Пуассон теңдеуі дейді, (2)-шартпен берілсе, есепті Пуассон теңдеуі үшін Дирихле есебі деп атайды.
Дифференциалдық теңдеулер теориясында шекаралық шарттарға байланысты (1)-теңдеуіне үш түрлі есеп қойылады.
1. Дирихле есебі. (1) теңдеунің G облысында анықталған, ал Г шекарасында =g(p) шартын қанағаттандыратын шешімін табу керек. Мұндағы ![](data:image/png;base64,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) ал -да анықталған белгілі функция.
Достарыңызбен бөлісу: |