المجموع المتغير لمؤثرات التفاضلات الجزئية لدوال محدبة - مقعرة .
Abstract
يلعب تقريب مورو – يوشيدا دوراَ مهمّاً في دراسة مسائل تحليل المتغيرات وتطبيقاتها. في هذا البحث سنستخدم تقريب مورو – يوشيدا لمتحولين في دراسة المجموع المتغير لمؤثرات التفاضلات الجزئية لدوال محدبة –مقعرة , ونقوم بتعميم النتائج المتعلقة بدراسة المجموع المتغير لمؤثرات التفاضلات الجزئية لدوال محدبة درست من قبل أتوش وبيون وتيرا في .
The Moreau-Yosida approximation plays a central role in the variationl analyses and their applications. In this paper, we used the Moreau-Yosida approximation of two variables to study the variationl sum of subdifferential operators of convex-concave functions. We generalize the results of variationl sum of convex functions in subdifferential operators of.
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