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Tropical formulae for summation over a part of [InlineEquation not available : see fulltext.]. / Kalinin, Nikita; Shkolnikov, Mikhail.

In: European Journal of Mathematics, Vol. 5, No. 3, 15.09.2019, p. 909-928.

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Harvard

Kalinin, N & Shkolnikov, M 2019, 'Tropical formulae for summation over a part of [InlineEquation not available: see fulltext.]', European Journal of Mathematics, vol. 5, no. 3, pp. 909-928. https://doi.org/10.1007/s40879-018-0218-0

APA

Kalinin, N., & Shkolnikov, M. (2019). Tropical formulae for summation over a part of [InlineEquation not available: see fulltext.]. European Journal of Mathematics, 5(3), 909-928. https://doi.org/10.1007/s40879-018-0218-0

Vancouver

Kalinin N, Shkolnikov M. Tropical formulae for summation over a part of [InlineEquation not available: see fulltext.]. European Journal of Mathematics. 2019 Sep 15;5(3):909-928. https://doi.org/10.1007/s40879-018-0218-0

Author

Kalinin, Nikita ; Shkolnikov, Mikhail. / Tropical formulae for summation over a part of [InlineEquation not available : see fulltext.]. In: European Journal of Mathematics. 2019 ; Vol. 5, No. 3. pp. 909-928.

BibTeX

@article{f404fb3b0b7341d59b9805dfa0227fe0,
title = "Tropical formulae for summation over a part of [InlineEquation not available: see fulltext.]",
abstract = "Let [InlineEquation not available: see fulltext.], let [InlineEquation not available: see fulltext.] stand for a, b, c, d∈ Z⩾ 0 such that ad- bc= 1. Define [Equation not available: see fulltext.]In other words, we consider the sum of the powers of the triangle inequality defects for the lattice parallelograms (in the first quadrant) of area one.We prove that [InlineEquation not available: see fulltext.] converges when s> 1 and diverges at s= 1 / 2. We also prove that ∑(a,b,c,d)1(a+c)2(b+d)2(a+b+c+d)2=13,and show a general method to obtain such formulae. The method comes from the consideration of the tropical analogue of the caustic curves, whose moduli give a complete set of continuous invariants on the space of convex domains.",
keywords = "Summation, Tropical geometry, [InlineEquation not available: see fulltext.], π",
author = "Nikita Kalinin and Mikhail Shkolnikov",
year = "2019",
month = sep,
day = "15",
doi = "10.1007/s40879-018-0218-0",
language = "English",
volume = "5",
pages = "909--928",
journal = "European Journal of Mathematics",
issn = "2199-675X",
publisher = "Springer Nature",
number = "3",

}

RIS

TY - JOUR

T1 - Tropical formulae for summation over a part of [InlineEquation not available

T2 - see fulltext.]

AU - Kalinin, Nikita

AU - Shkolnikov, Mikhail

PY - 2019/9/15

Y1 - 2019/9/15

N2 - Let [InlineEquation not available: see fulltext.], let [InlineEquation not available: see fulltext.] stand for a, b, c, d∈ Z⩾ 0 such that ad- bc= 1. Define [Equation not available: see fulltext.]In other words, we consider the sum of the powers of the triangle inequality defects for the lattice parallelograms (in the first quadrant) of area one.We prove that [InlineEquation not available: see fulltext.] converges when s> 1 and diverges at s= 1 / 2. We also prove that ∑(a,b,c,d)1(a+c)2(b+d)2(a+b+c+d)2=13,and show a general method to obtain such formulae. The method comes from the consideration of the tropical analogue of the caustic curves, whose moduli give a complete set of continuous invariants on the space of convex domains.

AB - Let [InlineEquation not available: see fulltext.], let [InlineEquation not available: see fulltext.] stand for a, b, c, d∈ Z⩾ 0 such that ad- bc= 1. Define [Equation not available: see fulltext.]In other words, we consider the sum of the powers of the triangle inequality defects for the lattice parallelograms (in the first quadrant) of area one.We prove that [InlineEquation not available: see fulltext.] converges when s> 1 and diverges at s= 1 / 2. We also prove that ∑(a,b,c,d)1(a+c)2(b+d)2(a+b+c+d)2=13,and show a general method to obtain such formulae. The method comes from the consideration of the tropical analogue of the caustic curves, whose moduli give a complete set of continuous invariants on the space of convex domains.

KW - Summation

KW - Tropical geometry

KW - [InlineEquation not available: see fulltext.]

KW - π

UR - http://www.scopus.com/inward/record.url?scp=85070704285&partnerID=8YFLogxK

U2 - 10.1007/s40879-018-0218-0

DO - 10.1007/s40879-018-0218-0

M3 - Article

AN - SCOPUS:85070704285

VL - 5

SP - 909

EP - 928

JO - European Journal of Mathematics

JF - European Journal of Mathematics

SN - 2199-675X

IS - 3

ER -

ID: 48791298