Note on singular Sturm comparison theorem and strict majorant
condition

J 2024

Note on singular Sturm comparison theorem and strict majorant condition

ŠEPITKA, Peter a Roman ŠIMON HILSCHER

Základní údaje

Originální název

Note on singular Sturm comparison theorem and strict majorant condition

Autoři

ŠEPITKA, Peter (703 Slovensko, domácí) a Roman ŠIMON HILSCHER (203 Česká republika, garant, domácí)

Vydání

Journal of Mathematical Analysis and Applications, Elsevier, 2024, 0022-247X

Další údaje

Jazyk

angličtina

Typ výsledku

Článek v odborném periodiku

Obor

10101 Pure mathematics

Stát vydavatele

Spojené státy

Utajení

není předmětem státního či obchodního tajemství

Odkazy

URL

Impakt faktor

Impact factor: 1.300 v roce 2022

Organizační jednotka

Přírodovědecká fakulta

DOI

http://dx.doi.org/10.1016/j.jmaa.2024.128391

UT WoS

001229936600001

Klíčová slova anglicky

Linear Hamiltonian system; Sturm comparison theorem; Focal point; Principal solution; Strict majorant condition; Second order linear differential equation

Štítky

rivok

Příznaky

Mezinárodní význam, Recenzováno

Změněno: 31. 5. 2024 10:08, Mgr. Marie Šípková, DiS.

Anotace

V originále

In this note we present a singular Sturm comparison theorem for two linear Hamiltonian systems satisfying a standard majorant condition and the identical normality assumption. Both endpoints of the considered interval may be singular. We identify the exact form of the strict majorant condition, which is necessary and sufficient for the property that every solution (conjoined basis) of the majorant system has more focal points than the solutions of the minorant system. We provide a formula for the exact number of focal points of any solution of the majorant system, depending on the number of focal points of solutions of the minorant system and on the number of right focal points of a solution of a certain transformed linear Hamiltonian system. This transformed system may be in general abnormal. Our result extends the previous Sturm comparison theorems for linear Hamiltonian systems by Kratz (1995) [18] on a compact interval and by the authors (2020) [35], [36] on an open or unbounded interval. The main result is also new for the second order differential equations, where it extends the singular comparison theorem by Aharonov and Elias (2010) [1].

Návaznosti

GA23-05242S, projekt VaV

Název: Oscilační teorie na hybridních časových doménách s aplikacemi ve spektrální teorii a maticové analýze

Investor: Grantová agentura ČR, Oscilační teorie na hybridních časových doménách s aplikacemi ve spektrální a maticové analýze

Citovat

ŠEPITKA, Peter a Roman ŠIMON HILSCHER. Note on singular Sturm comparison theorem and strict majorant condition. Journal of Mathematical Analysis and Applications. Elsevier, 2024, roč. 538, č. 2, s. 1-16. ISSN 0022-247X. Dostupné z: https://dx.doi.org/10.1016/j.jmaa.2024.128391.

@article{2394577,
   author = {Šepitka, Peter and Šimon Hilscher, Roman},
   article_number = {2},
   doi = {http://dx.doi.org/10.1016/j.jmaa.2024.128391},
   keywords = {Linear Hamiltonian system; Sturm comparison theorem; Focal point; Principal solution; Strict majorant condition; Second order linear differential equation},
   language = {eng},
   issn = {0022-247X},
   journal = {Journal of Mathematical Analysis and Applications},
   title = {Note on singular Sturm comparison theorem and strict majorant condition},
   url = {https://www.sciencedirect.com/science/article/pii/S0022247X24003135},
   volume = {538},
   year = {2024}
}

TY  - JOUR
ID  - 2394577
AU  - Šepitka, Peter - Šimon Hilscher, Roman
PY  - 2024
TI  - Note on singular Sturm comparison theorem and strict majorant condition
JF  - Journal of Mathematical Analysis and Applications
VL  - 538
IS  - 2
SP  - 1-16
EP  - 1-16
PB  - Elsevier
SN  - 0022247X
KW  - Linear Hamiltonian system
KW  - Sturm comparison theorem
KW  - Focal point
KW  - Principal solution
KW  - Strict majorant condition
KW  - Second order linear differential equation
UR  - https://www.sciencedirect.com/science/article/pii/S0022247X24003135
N2  - In this note we present a singular Sturm comparison theorem for two linear Hamiltonian systems satisfying a standard majorant condition and the identical normality assumption. Both endpoints of the considered interval may be singular. We identify the exact form of the strict majorant condition, which is necessary and sufficient for the property that every solution (conjoined basis) of the majorant system has more focal points than the solutions of the minorant system. We provide a formula for the exact number of focal points of any solution of the majorant system, depending on the number of focal points of solutions of the minorant system and on the number of right focal points of a solution of a certain transformed linear Hamiltonian system. This transformed system may be in general abnormal. Our result extends the previous Sturm comparison theorems for linear Hamiltonian systems by Kratz (1995) [18] on a compact interval and by the authors (2020) [35], [36] on an open or unbounded interval. The main result is also new for the second order differential equations, where it extends the singular comparison theorem by Aharonov and Elias (2010) [1].
ER  -

ŠEPITKA, Peter a Roman ŠIMON HILSCHER. Note on singular Sturm comparison theorem and strict majorant condition. \textit{Journal of Mathematical Analysis and Applications}. Elsevier, 2024, roč.~538, č.~2, s.~1-16. ISSN~0022-247X. Dostupné z: https://dx.doi.org/10.1016/j.jmaa.2024.128391.

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