Khabibullin's conjecture (version 1, 1992). Let ${\displaystyle \displaystyle S}$  be a non-negative increasing function on the half-line ${\displaystyle [0,+\infty )}$  such that ${\displaystyle \displaystyle S(0)=0}$ . Assume that ${\displaystyle \displaystyle S(e^{x})}$  is a convex function of ${\displaystyle x\in [-\infty ,+\infty )}$ . Let ${\displaystyle \lambda \geq 1/2}$ , ${\displaystyle n\geq 2}$ , and ${\displaystyle n\in \mathbb {N} }$ . If

${\displaystyle \int _{0}^{1}S(tx)\,(1-x^{2})^{n-2}\,x\,dx\leq t^{\lambda }{\text{ for all }}t\in [0,+\infty ),}$

(1)

then

${\displaystyle \int _{0}^{+\infty }S(t)\,{\frac {t^{2\lambda -1}}{(1+t^{2\lambda })^{2}}}\,dt\leq {\frac {\pi \,(n-1)}{2\lambda }}\prod _{k=1}^{n-1}{\Bigl (}1+{\frac {\lambda }{2k}}{\Bigr )}.}$

(2)

This statement of the Khabibullin's conjecture completes his survey.^[2]

The product in the right hand side of the inequality (2) is related to the Euler's Beta function ${\displaystyle \mathrm {B} }$ :

${\displaystyle {\frac {\pi \,(n-1)}{2\lambda }}\prod _{k=1}^{n-1}{\Bigl (}1+{\frac {\lambda }{2k}}{\Bigr )}={\frac {\pi \,(n-1)}{\lambda ^{2}}}\cdot {\frac {1}{\mathrm {B} (\lambda /2,n)}}}$ 

For each fixed ${\displaystyle \lambda \geq 1/2}$  the function

${\displaystyle S(t)=2(n-1)\prod _{k=1}^{n-1}{\Bigl (}1+{\frac {\lambda }{2k}}{\Bigr )}\,t^{\lambda },}$ 

turns the inequalities (1) and (2) to equalities.

The Khabibullin's conjecture is valid for ${\displaystyle \lambda \leq 1}$  without the assumption of convexity of ${\displaystyle S(e^{x})}$ . Meanwhile, one can show that this conjecture is not valid without some convexity conditions for ${\displaystyle S}$ . In 2010, R. A. Sharipov showed that the conjecture fails in the case ${\displaystyle n=2}$  and for ${\displaystyle \lambda =2}$ .^[3]

Khabibullin's conjecture (version 2). Let ${\displaystyle \displaystyle h}$  be a non-negative increasing function on the half-line ${\displaystyle [0,+\infty )}$  and ${\displaystyle \alpha >1/2}$ . If

${\displaystyle \int _{0}^{1}{\frac {h(tx)}{x}}\,(1-x)^{n-1}\,dx\leq t^{\alpha }{\text{ for all }}t\in [0,+\infty ),}$ 

then

${\displaystyle \int _{0}^{+\infty }{\frac {h(t)}{t}}\,{\frac {dt}{1+t^{2\alpha }}}\leq {\frac {\pi }{2}}\prod _{k=1}^{n-1}{\Bigl (}1+{\frac {\alpha }{k}}{\Bigr )}={\frac {\pi }{2\alpha }}\cdot {\frac {1}{\mathrm {B} (\alpha ,n)}}.}$ 

Khabibullin's conjecture (version 3). Let ${\displaystyle \displaystyle q}$  be a non-negative continuous function on the half-line ${\displaystyle [0,+\infty )}$  and ${\displaystyle \alpha >1/2}$ . If

${\displaystyle \int _{0}^{1}{\Bigl (}\,\int _{x}^{1}(1-y)^{n-1}{\frac {dy}{y}}{\Bigr )}q(tx)\,dx\leq t^{\alpha -1}{\text{ for all }}t\in [0,+\infty ),}$ 

then

${\displaystyle \int _{0}^{+\infty }q(t)\log {\Bigl (}1+{\frac {1}{t^{2\alpha }}}{\Bigr )}\,dt\leq \pi \alpha \prod _{k=1}^{n-1}{\Bigl (}1+{\frac {\alpha }{k}}{\Bigr )}={\frac {\pi }{\mathrm {B} (\alpha ,n)}}.}$ 

• Logarithmically convex function