$$\sum \limits_{cyc}^{ }{\sqrt[4]{\dfrac{a_i}{a_{i+1}+a_{i+2}+a_{i+3}}}> \sum \limits_{cyc}^{ }{\sqrt[4]{\dfrac{ \sqrt{a_i}^2}{(\sqrt{a_{i+1}}+\sqrt{a_{i+2}}+\sqrt{a_{i+3}})^2}}}}= \sum \limits_{cyc}^{ }{\dfrac{ \sqrt{a_i}}{\sqrt{\sqrt{a_i}(\sqrt{a_{i+1}}+\sqrt{a_{i+2}}+\sqrt{a_{i+3}})}}}\geqslant \sum \limits_{cyc}^{ }{\dfrac{2\sqrt{a_i}}{\sqrt{a_i}+\sqrt{a_{i+1}}+\sqrt{a_{i+2}}+\sqrt{a_{i+3}}}}> \sum \limits_{i=1}^{n=6}{\dfrac{2\sqrt{a_i}}{\sum \limits_{i=1}^{n=6}{\sqrt{a_i}}}}=2$$