Lời giải:

Áp dụng BĐT AM-GM:

\(\sqrt[3]{\frac{a^4}{b^4}}+\sqrt[3]{\frac{a^4}{b^4}}+\sqrt[3]{\frac{a^4}{b^4}}+\frac{a}{b}+1\geq \frac{5a}{b}\)

\(\sqrt[3]{\frac{b^4}{c^4}}+\sqrt[3]{\frac{b^4}{c^4}}+\sqrt[3]{\frac{b^4}{c^4}}+\frac{b}{c}+1\geq \frac{5b}{c}\)

\(\sqrt[3]{\frac{c^4}{a^4}}+\sqrt[3]{\frac{c^4}{a^4}}+\sqrt[3]{\frac{c^4}{a^4}}+\frac{c}{a}+1\geq \frac{5c}{a}\)

Cộng theo vế và rút gọn:

\(3\text{VT}\geq 4\text{VP}-3\)

Mà theo BĐT AM-GM: \(\text{VP}=\frac{a}{b}+\frac{b}{c}+\frac{c}{a}\geq 3\)

Do đó:

$3\text{VT}\geq 4\text{VP}-3\geq 3\text{VP}$

$\Rightarrow \text{VT}\geq \text{VP}$ (đpcm)

Dấu "=" xảy ra khi $a=b=c$

Cách khác:

Đặt \(\sqrt[3]{\frac{a}{b}}=x;\sqrt[3]{\frac{b}{c}}=y;\sqrt[3]{\frac{c}{a}}=z\Rightarrow xyz=1,x>0,y>0,z>0\) (mục đích là khử căn)

Cần chứng minh: \(x^4+y^4+z^4\ge x^3+y^3+z^3\Leftrightarrow x^4+y^4+z^4\ge\sqrt[3]{xyz}\left(x^3+y^3+z^3\right)\)

Do \(\sqrt[3]{xyz}\le\frac{x+y+z}{3}\). Vì vậy, nó đủ để chứng minh rằng:

\(3\left(x^4+y^4+z^4\right)\ge\left(x+y+z\right)\left(x^3+y^3+z^3\right)\)

Đến đây có nhiều hướng giải, sau đây là một vài hướng:

Hướng 1:

Sử dụng BĐT C-S:

\(3\left(x^4+y^4+z^4\right)=3\left(\frac{x^6}{x^2}+\frac{y^6}{y^2}+\frac{z^6}{z^2}\right)\ge\frac{3\left(x^3+y^3+z^3\right)^2}{x^2+y^2+z^2}\)

\(=\frac{3\left(x^3+y^3+z^3\right)\left(\frac{x^4}{x}+\frac{y^4}{y}+\frac{z^4}{z}\right)}{x^2+y^2+z^2}\ge\frac{\frac{3\left(x^3+y^3+z^3\right)\left(x^2+y^2+z^2\right)^2}{x+y+z}}{x^2+y^2+z^2}\)

\(=\frac{3\left(x^3+y^3+z^3\right)\left(x^2+y^2+z^2\right)}{x+y+z}\ge\left(x^3+y^3+z^3\right)\left(x+y+z\right)\)

Hướng 2:(Dùng SOS)

\(VT-VP=\sum\limits_{cyc} (x^2 +xy+y^2)(x-y)^2 \geq 0\)

Hướng 3: (Dùng S-S)

Giả sử \(z=min\left\{x,y,z\right\}\).

\(VT-VP=2\left(x^2+xy+y^2\right)\left(x-y\right)^2+\left(x-z\right)\left(y-z\right)\left(x^2+xz+y^2+yz+2z^2\right)\ge0\)

Đẳng thức xảy ra khi \(x=y=z=1\Leftrightarrow a=b=c\)

P/s:@Akai Haruma: Em nghĩ hướng này sẽ dễ suy luận hơn cách ghép cặp bằng AM-GM ạ! Cách kia hơi ảo diệu.

Giúp với,, TT

Theo bất đẳng thức Cauchy-Schwarz, ta được:

\(\left(\Sigma_{cyc}\frac{a}{\sqrt{a+b}}\right)^2=\)\(\left(\Sigma_{cyc}\sqrt{a\left(5a+b+9c\right)}.\sqrt{\frac{a}{\left(a+b\right)\left(5a+b+9c\right)}}\right)^2\)

\(\le\left(\Sigma_{cyc}a\left(5a+b+9c\right)\right)\left(\Sigma_{cyc}\frac{a}{\left(a+b\right)\left(5a+b+9c\right)}\right)\)

\(=5\left(a+b+c\right)^2\left(\Sigma_{cyc}\frac{a}{\left(a+b\right)\left(5a+b+9c\right)}\right)\)

Đến đây, ta cần chứng minh \(5\left(a+b+c\right)^2\left(\Sigma_{cyc}\frac{a}{\left(a+b\right)\left(5a+b+9c\right)}\right)\le\frac{25}{16}\left(a+b+c\right)\)

\(\Leftrightarrow\left(a+b+c\right)\left(\Sigma_{cyc}\frac{a}{\left(a+b\right)\left(5a+b+9c\right)}\right)\le\frac{5}{16}\)

Thật vậy, ta có: \(\frac{5}{16}-\Sigma_{cyc}\frac{a}{\left(a+b\right)\left(5a+b+9c\right)}\)

\(\Leftrightarrow\frac{\sum_{cyc}ab(a+b)(a+9b)(a-3b)^2+243\sum_{cyc}a^3b^2c+835\sum_{cyc}a^3bc^2+232\sum_{cyc}a^4bc+1230a^2b^2c^2}{16(a+b)(b+c) (c+a)\prod_{cyc}(5a+b+9c)}\ge 0\) (đúng)

(Minh gõ bằng Latex, bạn chịu khó vô trang cá nhân của mình nhé, ngày 17/6 nha)

Đẳng thức xảy ra khi \(a=3b;c=0\)

Áp dụng bất đẳng thức Bunhiacopxki :

\(\left(1^2+4^2\right)\left(a^2+\frac{1}{b^2}\right)\ge\left(a+\frac{4}{b}\right)^2\)

\(\Leftrightarrow17\cdot\left(a^2+\frac{1}{b^2}\right)\ge\left(a+\frac{4}{b}\right)^2\)

\(\Leftrightarrow\sqrt{17}\cdot\sqrt{a^2+\frac{1}{b^2}}\ge a+\frac{4}{b}\)

Tương tự ta có :

\(\sqrt{17}\cdot\sqrt{b^2+\frac{1}{c^2}}\ge b+\frac{4}{c}\)

\(\sqrt{17}\cdot\sqrt{c^2+\frac{1}{a^2}}\ge c+\frac{4}{a}\)

Cộng theo vế của 3 bđt ta được :

\(\sqrt{17}\cdot\left(\sqrt{a^2+\frac{1}{b^2}}+\sqrt{b^2+\frac{1}{c^2}}+\sqrt{c^2+\frac{1}{a^2}}\right)\ge a+b+c+\frac{4}{a}+\frac{4}{b}+\frac{4}{c}\)

\(\Leftrightarrow\sqrt{17}\cdot A\ge a+b+c+\frac{4}{a}+\frac{4}{b}+\frac{4}{c}\)

Áp dụng bất đẳng thức Cô-si :

\(a+b+c+\frac{4}{a}+\frac{4}{b}+\frac{4}{c}\)

\(=16a+\frac{4}{a}+16b+\frac{4}{b}+16c+\frac{4}{c}-15a-15b-15c\)

\(\ge2\sqrt{\frac{4\cdot16a}{a}}+2\sqrt{\frac{4\cdot16b}{b}}+2\sqrt{\frac{4\cdot16c}{c}}-15\left(a+b+c\right)\)

\(\ge16+16+16-15\cdot\frac{3}{2}=\frac{51}{2}\)

Do đó : \(\sqrt{17}\cdot A\ge\frac{51}{2}\)

\(\Leftrightarrow A\ge\frac{3\sqrt{17}}{2}\)

Dấu "=" xảy ra \(\Leftrightarrow a=b=c=\frac{1}{2}\)

Ta chứng minh bổ đề:

Với x,y,z dương thì:

\(8\left(x+y+z\right)\left(xy+yz+zx\right)\le9\left(x+y\right)\left(y+z\right)\left(z+x\right)\)

\(\Leftrightarrow x\left(y-z\right)^2+y\left(z-x\right)^2+z\left(x-y\right)^2\ge0\)(đúng)

Quay lại bài toán ta có:

\(A^{2020}=\left(\sqrt[2020]{\frac{a}{a+b}}+\sqrt[2020]{\frac{b}{b+c}}+\sqrt[2020]{\frac{c}{c+a}}\right)^{2020}\)

\(=\left(\sqrt[2020]{\frac{a\left(a+c\right)}{\left(a+b\right)\left(a+c\right)}}+\sqrt[2020]{\frac{b\left(b+a\right)}{\left(b+c\right)\left(b+a\right)}}+\sqrt[2020]{\frac{c\left(c+b\right)}{\left(c+a\right)\left(c+b\right)}}\right)^{2020}\)

\(\le\left(1+1+1\right)^{2018}.2.\left(a+b+c\right).\left(\frac{a}{\left(a+b\right)\left(a+c\right)}+\frac{b}{\left(b+c\right)\left(b+a\right)}+\frac{c}{\left(c+a\right)\left(c+b\right)}\right)\)

\(=3^{2018}.\frac{4\left(a+b+c\right)\left(ab+bc+ca\right)}{\left(a+b\right)\left(b+c\right)\left(c+a\right)}\)

\(\le3^{2018}.\frac{9\left(a+b\right)\left(b+c\right)\left(c+a\right)}{2\left(a+b\right)\left(b+c\right)\left(c+a\right)}=\frac{3^{2020}}{2}\)

\(\Rightarrow A\le\frac{3}{\sqrt[2020]{2}}\)

\(b^4+c^4-bc\left(b^2+c^2\right)=\left(b^2+bc+c^2\right)\left(b-c\right)^2\)

\(\Rightarrow b^4+c^4\ge bc\left(b^2+c^2\right)\)

Tương tự\(\Rightarrow\Sigma_{cyc}\frac{a}{a+b^4+c^4}\le\Sigma_{cyc}\frac{a}{a+bc\left(b^2+c^2\right)}=\Sigma_{cyc}\frac{a}{bc\left(a^2+b^2+c^2\right)}=\frac{1}{a^2+b^2+c^2}\Sigma_{cyc}\frac{a}{bc}\)

\(\frac{a}{bc}+\frac{b}{ca}+\frac{c}{ab}=\frac{a^2+b^2+c^2}{abc}=a^2+b^2+c^2\)

\(\Rightarrow\frac{1}{a^2+b^2+c^2}\left(\frac{a}{bc}+\frac{b}{ca}+\frac{c}{ab}\right)=1\)

oke rồi he

@Nub :v

Áp dụng Bunhiacopski ta dễ có:

\(\frac{a}{b^4+c^4+a}=\frac{a\left(1+1+a^3\right)}{\left(b^4+c^4+a\right)\left(1+1+a^3\right)}\le\frac{a^4+2a}{\left(a^2+b^2+c^2\right)^2}\)

Tương tự:

\(\frac{b}{a^4+c^4+b}\le\frac{b^4+2b}{\left(a^2+b^2+c^2\right)^2};\frac{c}{a^4+b^4+c}\le\frac{c^4+2c}{\left(a^2+b^2+c^2\right)^2}\)

Cộng lại:

\(A\le\frac{a^4+b^4+c^4+2a+2b+2c}{\left(a^2+b^2+c^2\right)^2}\)

Ta đi chứng minh:

\(\frac{a^4+b^4+c^4+2a+2b+2c}{\left(a^2+b^2+c^2\right)^2}\le1\Leftrightarrow a^2b^2+b^2c^2+c^2a^2\ge abc\left(a+b+c\right)\)

Cái này luôn  đúng theo Cauchy

Đẳng thức xảy ra tại a=b=c=1

\(VT=\dfrac{a}{a+b}+\dfrac{b}{b+c}+\dfrac{c}{a+c}\)

\(VT< \dfrac{a+c}{a+b+c}+\dfrac{b+a}{a+b+c}+\dfrac{c+b}{a+b+c}=2\)

\(VP=\dfrac{a}{\sqrt{a\left(b+c\right)}}+\dfrac{b}{\sqrt{b\left(c+a\right)}}+\dfrac{c}{\sqrt{c\left(a+b\right)}}\)

\(VP\ge\dfrac{2a}{a+b+c}+\dfrac{2b}{a+b+c}+\dfrac{2c}{a+b+c}=2\)

\(\Rightarrow VP>VT\) (đpcm)