егер >0, онда (1)-(3) есеп барлық t>t1 шешілмейді.
(1)-(3) есеп үшін бір тиімді жоспары болатын немесе есеп шешілмейтін t![](data:image/png;base64,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) параметрінің барлық мәндерін анықтап, қарастырудан шығарылатын t параметрінің аралық өзгерісін аламыз. t парамертінің мәнін аралығына жататын кейбір санға тең деп есептеп, алынған есептің шешімін табамыз.
Итерацияның соңғы санынан кейін барлық параметрдің мәні үшін есептің бір тиімді жоспары болатын аралықты анықтайды немесе барлық параметрлердің мәні үшін есептің шешімі болмайтын аралықты анықтайды.
Сонымен, (1)-(3) есептің шешімін табу процесі келесі қадамдардан тұрады:
t параметрінің мәнін кез-келген t0![](data:image/png;base64,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) санына тең деп есептеп, Х* тиімді жоспарын табады немесе алынған сызықты программалау есебінің шешілмейтіндігін анықтайды.
Табылған тиімді жоспардың t![](data:image/png;base64,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) параметрінің көптеген мәндерінде есептің тиімді болатынын немесе шешілмейтіндігін анықтайды.
t параметрінің мәнін аралығында жататын кез-келген санға тең болып болжап, алынған сызықтық программалаудың есебін симплекс әдісімен есептейді.
Табылған тиімді жоспардың t параметрінің көптеген мәндерінде есептің тиімді болатынын немесе шешілмейтіндігін анықтайды. Есептеуді t![](data:image/png;base64,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) параметрінің барлық мәндері зерттелгенге дейін қайталайды.
Достарыңызбен бөлісу: |