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1)Minimal Families,¼«Ð¡´Ø

2)minimal,¼«Ð¡

3)minimum,¼«Ð¡

4)minimizer,¼«Ð¡

5)min-min programming,¼«Ð¡¼«Ð¡¹æ»®

6)Minimum sample,¼«Ð¡Ñù±¾

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Remark on isoparametric minimal hypersurfaces of S~(n+1);

¹ØÓÚS~(n+1)Öм«Ð¡µÈ²Î³¬ÇúÃæµÄ×¢¼Ç

This paper,using Laplace operator,Green integral and manifold toplogy,by pinching method and technique,studies conharmonicly flat totally real minimal submanifolds M in CP4.

ÔËÓÃÀ­ÊÏËã×Ó¡¢¸ñÁÖ»ý·ÖºÍÁ÷ÐÎÍØÆË,¸ù¾ÝPinching·½·¨ºÍ¼¼ÇÉÑо¿CP4Öе÷ºÍƽ̹µÄȫʵ¼«Ð¡×ÓÁ÷ÐÎM,µÃµ½MÌå»ýµÄÏÂÈ·½çÒÔ¼°È¡µÃÏÂÈ·½çµÄ³äÒªÌõ¼þ¡£

In this paper,We study quasi-conformably flat totally real minimal submanifolds M in CP4.

Ñо¿CP4ÖÐÄâ¹²ÐÎƽ̹µÄȫʵ¼«Ð¡×ÓÁ÷ÐÎM,µÃµ½MÌå»ýµÄÏÂÈ·½çÒÔ¼°È¡µÃÏÂÈ·½çµÄ³äÒªÌõ¼þ,»¹ÓÐÆäÌØÀý¡ª¡ª¹²Ô²Æ½Ì¹ÇéÐεÄÈ«²¿¶ÔÓ¦½á¹û¡£

HûÖlder Continuity and Minimum for Free Discontinuity Problems;

HûÖlderÁ¬ÐøÐÔÓë×ÔÓɲ»Á¬ÐøÎÊÌâµÄ¼«Ð¡

There are many near optimal methods for solving m¡Án permutation schedule problems and in general that is to get minimum maximum flow time.

ͬ˳Ðòm¡ÁnÅÅÐòÎÊÌâͨ³£ÊÇÇó¼«Ð¡×î´óÁ÷³Ìʱ¼ä,¶øÇÒ½üËÆ×îÓŽâ½â·¨±È½Ï¶à¡£

Local Boundedness of Minimizers of Functionals Involving Anisotropic Growth Conditions;

¸÷ÏòÒìÐÔ·ºº¯¼«Ð¡µÄ¾Ö²¿ÓнçÐÔ

It is proved that the unconstrained minimizers for the p(x)-Laplacian integral functionals satisfying some natural conditions must possess radial symmetry.

Ö¤Ã÷ÁËÔÚ×ÔÈ»Ìõ¼þÏÂp(x)-Laplace»ý·Ö·ºº¯µÄÎÞÔ¼Êø¼«Ð¡±Ø¾ß¾¶Ïò¶Ô³ÆÐÔ,ÍƹãÁËLopesÔÚp=2ʱµÄÒ»¸öÏàÓ¦µÄ½á

It is proved that the unconstrained minimizers and the constrained minimizers for the ª§pª§-Laplacian integral functionals satisfying some natural conditions must possess radial symmetry.

Ö¤Ã÷ÁËÔÚ×ÔÈ»Ìõ¼þÏ p- Laplace»ý·Ö·ºº¯µÄÎÞÔ¼Êø¼«Ð¡ºÍÔ¼Êø¼«Ð¡±Ø¾ß¾¶Ïò¶Ô³ÆÐÔ ,ÍƹãÁË LopesÔÚ p =2ʱµÄÏàÓ¦½á¹û ¡£