試解
先證一個引理:
x^3z + y^3x + z^3y - xyz(x+y+z) >= 0.
實際上,等價的形式是: x^2z(x-y) + y^2x(y-z) + z^2y(z-x) >= 0.
兩種情況。
如果x>=y>=z, 有x^2z>= z^2y,y^2x>=z^2y 代入有
左邊 >= z^2y(x-y) + z^2y(y-z) + z^2y(z-x) = 0.
如果x>=z>=y, 有x^2z >= y^2x, x^2z >= z^2y.
左邊 >= x^2z(x-y) + x^2z(y-z) + x^2z(z-x) = 0.
證原不等式。
由齊次性不妨設:xyz=1. 則,原不等式等價於:
x^5z^2 + y^5x^2 + z^5y^2 >= x^3z + y^3x + z^3y).
由A-G不等式
x^5z^2 + y^5x^2 + z^5y^2 + x + y + z >= 2(x^3z + y^3x + z^3y)
再由引理
x + y + z = xyz(x+y+z) <= x^3z + y^3x + z^3y
兩式相減即得。
x^3z + y^3x + z^3y - xyz(x+y+z) >= 0.
實際上,等價的形式是: x^2z(x-y) + y^2x(y-z) + z^2y(z-x) >= 0.
兩種情況。
如果x>=y>=z, 有x^2z>= z^2y,y^2x>=z^2y 代入有
左邊 >= z^2y(x-y) + z^2y(y-z) + z^2y(z-x) = 0.
如果x>=z>=y, 有x^2z >= y^2x, x^2z >= z^2y.
左邊 >= x^2z(x-y) + x^2z(y-z) + x^2z(z-x) = 0.
證原不等式。
由齊次性不妨設:xyz=1. 則,原不等式等價於:
x^5z^2 + y^5x^2 + z^5y^2 >= x^3z + y^3x + z^3y).
由A-G不等式
x^5z^2 + y^5x^2 + z^5y^2 + x + y + z >= 2(x^3z + y^3x + z^3y)
再由引理
x + y + z = xyz(x+y+z) <= x^3z + y^3x + z^3y
兩式相減即得。
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