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pippi6
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5Â¥2014-11-23 11:24:18
zaq123321
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suplixia(feixiaolin´ú·¢): ½ð±Ò+1 2014-11-24 07:40:32
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suplixia(feixiaolin´ú·¢): ½ð±Ò+1 2014-11-24 07:40:32
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Can we consider the following example? Let f(x,y) = x^2+y^2-2xy in [0,1]^2. Then f(x,y) is a strictly increasing function of x or y. How about the maximum or minimum. (1,0) or (0,1) are both maximal points. |
2Â¥2014-11-22 01:11:45
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suplixia(feixiaolin´ú·¢): ½ð±Ò+1 2014-11-24 07:40:40
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suplixia(feixiaolin´ú·¢): ½ð±Ò+1 2014-11-24 07:40:40
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×î´óÖµ¡¢×îСֵ´æÔÚÓë·ñºÍ¸ø¶¨º¯ÊýµÄ¶¨ÒåÓòÓÐ¹Ø Èç¹ûÔÚ±ÕÇøÓòÉÏ Á¬Ðøº¯Êý¿Ï¶¨ÊÇÓÐ×î´óÖµ¡¢×îСֵµÄ£¬ÇÒ¿ÉÒÔÈ¡µÃÕâЩֵ ×î´óÖµ¡¢×îСֵһ¶¨ÊÇΨһµÄ µ«ÊÇ ×î´óÖµµãºÍ×îСֵµãδ±ØΨһ ----¼´Ê¹ÔÚÑϸñµ¥µ÷µÄÇé¿öÏ ×î´óÖµµã¡¢×îСֵµãҲδ±ØΨһ ---2Â¥¸ø³öÁ˺ܺõÄʾÀý ÖÁÓÚÓÃÌݶÈËã·¨ Ê×ÏÈ º¯ÊýÖ»ÊÇÁ¬ÐøÇÒÑϸñµ¥µ÷ δ±Ø´æÔÚÌÝ¶È |
3Â¥2014-11-23 09:12:28
pippi6
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suplixia(feixiaolin´ú·¢): ½ð±Ò+1 2014-11-24 07:40:45
suplixia(feixiaolin´ú·¢): ½ð±Ò+1 2014-11-24 07:40:45
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f(x,y) = x^2+y^2-2xy is not a strictly increasing function of x in [0,1]^2, since f_x=2x-2y changes sign when x > y. |
4Â¥2014-11-23 11:18:29
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