Khabibullin's conjecture is a conjecture in mathematics related to Paley's problem[1] for plurisubharmonic functions and to various extremal problems in the theory of entire functions of several variables. The conjecture was named after its proposer, B. N. Khabibullin.
There are three versions of the conjecture, one in terms of logarithmically convex functions, one in terms of increasing functions, and one in terms of non-negative functions. The conjecture has implications in the study of complex functions and is related to Euler's Beta function. While the conjecture is known to hold for certain conditions, counterexamples have also been found.
Khabibullin's conjecture (version 1, 1992). Let
\displaystyleS
[0,+infty)
\displaystyleS(0)=0
\displaystyleS(ex)
x\in[-infty,+infty)
λ\geq1/2
n\geq2
n\inN
then
This statement of the Khabibullin's conjecture completes his survey.[2]
\Beta
| \pi(n-1) | |
| 2λ |
| n-1 | ||
| \prod | l(1+ | |
| k=1 |
| λ | r)= | |
| 2k |
| \pi(n-1) | ⋅ | |
| λ2 |
| 1 | |
| \Beta(λ/2,n) |
For each fixed
λ\geq1/2
| n-1 | ||
| S(t)=2(n-1)\prod | l(1+ | |
| k=1 |
| λ | |
| 2k |
r) tλ,
turns the inequalities and to equalities.
The Khabibullin's conjecture is valid for
λ\leq1
S(ex)
S
n=2
λ=2
Khabibullin's conjecture (version 2). Let
\displaystyleh
[0,+infty)
\alpha>1/2
| 1 | |
| \int | |
| 0 |
| h(tx) | |
| x |
(1-x)n-1dx\leqt\alphaforallt\in[0,+infty),
then
| +infty | |
| \int | |
| 0 |
| h(t) | |
| t |
| dt | \leq | |
| 1+t2\alpha |
| \pi | |
| 2 |
| n-1 | ||
| \prod | l(1+ | |
| k=1 |
| \alpha | r)= | |
| k |
| \pi | |
| 2\alpha |
⋅
| 1 | |
| B(\alpha,n) |
.
Khabibullin's conjecture (version 3). Let
\displaystyleq
[0,+infty)
\alpha>1/2
| 1 | |
| \int | |
| 0 |
| 1 | |
| l(\int | |
| x |
(1-y)n-1
| dy | |
| y |
r)q(tx)dx \leqt\alpha-1forallt\in[0,+infty),
then
| +infty | |
| \int | |
| 0 |
q(t)logl(1+
| 1{t | |
| 2\alpha |
\displaystyleCn