Generalized M.A. Lavrentiev’s inequality

Bakhtin, A. K.; Denega, Iryna

doi:10.1007/s10958-022-05806-y

Cited by 9 publications

(7 citation statements)

References 27 publications

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“…where r i is the mapping radius of the map from unit disk 0 < |w i | ≤ 1 to the face of the critical graph the puncture at z = ξ i belongs. As a matter of fact, (1.6) has been rigorously proved in geometric function theory [32][33][34][35][36][37], but appears to have been unnoticed in physics literature; here we rediscovered it. We test (1.6) against some of the known cases of Strebel differentials in section 3.…”

Section: Jhep05(2023)186mentioning

confidence: 99%

Bootstrapping closed string field theory

Fırat

2023

J. High Energ. Phys.

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The determination of the string vertices of closed string field theory is shown to be a conformal field theory problem solvable by combining insights from Liouville theory, hyperbolic geometry, and conformal bootstrap. We first demonstrate how Strebel differentials arise from hyperbolic string vertices by performing a WKB approximation to the associated Fuchsian equation, which we subsequently use it to derive a Polyakov-like conjecture for Strebel differentials. This result implies that the string vertices are generated by the interactions of n zero momentum tachyons, or equivalently, a certain limit of suitably regularized on-shell Liouville action. We argue that the latter can be related to the interaction of three zero momentum tachyons on a generalized cubic vertex through classical conformal blocks. We test this claim for the quartic vertex and discuss its generalization to higher-string interactions.

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Section: Jhep05(2023)186mentioning

confidence: 99%

Bootstrapping closed string field theory

Fırat

2023

J. High Energ. Phys.

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“…In [9] there were proposed a method allowing to obtain new estimates for the products of inner radii of mutually non-overlapping domains. In particular, it allowed to generalize and strengthen the result of M. A. Lavrentiev [36] on the maximum of product of conformal radii of two non-overlapping simply connected domains.…”

Section: Generalized M a Lavrentiev's Inequalitymentioning

confidence: 99%

“…Theorem 6.1. [9] Let n P N. Then, for any fixed system of mutually distinct points ta k u n k=1 P Czt0u and any mutually non-overlapping domains tB k u n k=0 , a k P B k Ă C, k = 0, n, a 0 = 0, the following inequality holds r n (B 0 , 0) On the other hand, provided all conditions of Corollary 6.2, from the M. A. Lavrentiev' Theorem 3.1, we obtain the inequality r(B 0 , 0)r(B k , a k ) ď ρ 2 , k = 1, n.…”

Section: Generalized M a Lavrentiev's Inequalitymentioning

confidence: 99%

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A.K. Bakhtin. Scientific legacy

Denega¹,

Zabolotnyi²

2023

PIGC

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“…No other ultimate results in this problem for n ⩾ 5 are known at present. In 2021 [4,15] effective upper estimates are obtained for T n , n ⩾ 2. Among the possible applications of the obtained results in other tasks of the function theory are the so-called distortion theorems.…”

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confidence: 99%

Application of upper estimates for products of inner radii to distortion theorems for univalent functions

Denega,

Zabolotnyi

2023

Mat. Stud.

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In 1934 Lavrentiev solved the problem of maximum ofproduct of conformal radii of two non-overlapping simply connected domains. In the case of three or more points, many authors considered estimates of a more general Mobius invariant of the form$$T_{n}:={\prod\limits_{k=1}^nr(B_{k},a_{k})}{\bigg(\prod\limits_{1\leqslant k<p\leqslant n}|a_{k}-a_{p}|\bigg)^{-\frac{2}{n-1}}},$$where $r(B,a)$ denotes the inner radius of the domain $B$ with respect to the point $a$ (for an infinitely distant point under the corresponding factor we understand the unit).In 1951 Goluzin for $n=3$ obtained an accurate evaluation for $T_{3}$.In 1980 Kuzmina showedthat the problem of the evaluation of $T_{4}$ isreduced to the smallest capacity problem in the certain continuumfamily and obtained the exact inequality for $T_{4}$.No other ultimate results in this problem for $n \geqslant 5$ are known at present.In 2021 \cite{Bakhtin2021,BahDen22} effective upper estimates are obtained for $T_{n}$, $n \geqslant 2$.Among the possible applications of the obtained results in other tasks of the function theory are the so-called distortion theorems.In the paper we consider an application of upper estimates for products of inner radii to distortion theorems for univalent functionsin disk $U$, which map it onto a star-shaped domains relative to the origin.

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Generalized M.A. Lavrentiev’s inequality

Cited by 9 publications

References 27 publications

Bootstrapping closed string field theory

Bootstrapping closed string field theory

A.K. Bakhtin. Scientific legacy

Application of upper estimates for products of inner radii to distortion theorems for univalent functions

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