Let \(\left(a;b;c\right)\rightarrow\left(\frac{yz}{x^2};\frac{xz}{y^2};\frac{xy}{z^2}\right)\) we have:
\(\frac{x^4}{y^2z^2+x^2yz+x^4}+\frac{y^4}{x^2z^2+xy^2z+y^4}+\frac{z^4}{x^2y^2+xyz^2+z^4}\ge1\left(○\right)\)
By Cauchy-Schwarz: \(L-H-S_{\left(○\right)}\ge\frac{\left(x^2+y^2+z^2\right)^2}{Σ_{cyc}x^4+Σ_{cyc}x^2yz+Σ_{cyc}y^2z^2}\)
Hence we need to prove: \(\frac{\left(x^2+y^2+z^2\right)^2}{Σ_{cyc}x^4+Σ_{cyc}x^2yz+Σ_{cyc}y^2z^2}\ge1\)
\(\Leftrightarrow\left(x^2+y^2+z^2\right)^2\geΣ_{cyc}x^4+Σ_{cyc}x^2yz+Σ_{cyc}y^2z^2\)
\(\Leftrightarrow x^2yz+xyz^2+xy^2z\ge x^2y^2+y^2z^2+z^2x^2\)
Follow AM-GM's ineq, it's enough to prove the last ineq
The equality occurs when \(a=b=c=1\)
