A lower bound for the beta function
Abstract
We present a new lower bound for Euler's beta function, B(x,y), which states that the inequality equation* B(x,y)>x+yxy(1-2xyx+y+1) equation* holds on (0,1]×(0,1], which improves a lower bound obtained by P. Iv\'ady [12, Theorem, (3.2)] in the case of 0<x+y<1.
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