Generalisation of the Muirhead-Rado inequality

Abstract:

For polynomials ${f_\beta }(x)$ of n real variables $x = ({x_1},{x_2}, \cdots ,{x_n})$ of the form \[ {f_\beta }(x) = \sum \limits _i {\sum \limits _j {x_{\rho (i,1)}^{{\beta _1}{e_{j1}}}x_{\rho (i,2)}^{{\beta _2}{e_{j2}}} \cdots } } x_{\rho (i,n)}^{{\beta _n}{e_{jn}}},\] conditions are given which ensure that ${f_\alpha }(x) \leqq {f_\beta }(x)$ for all $x \geqq 0$.