Oscillation Numbers for Continuous Lagrangian Paths and Maslov Index
The result's identifiers
Result code in IS VaVaI
<a href="https://www.isvavai.cz/riv?ss=detail&h=RIV%2F00216224%3A14310%2F23%3A00134002" target="_blank" >RIV/00216224:14310/23:00134002 - isvavai.cz</a>
Result on the web
<a href="https://link.springer.com/article/10.1007/s10884-022-10140-7" target="_blank" >https://link.springer.com/article/10.1007/s10884-022-10140-7</a>
DOI - Digital Object Identifier
<a href="http://dx.doi.org/10.1007/s10884-022-10140-7" target="_blank" >10.1007/s10884-022-10140-7</a>
Alternative languages
Result language
angličtina
Original language name
Oscillation Numbers for Continuous Lagrangian Paths and Maslov Index
Original language description
In this paper we present the theory of oscillation numbers and dual oscillation numbers for continuous Lagrangian paths in R-2n. Our main results include a connection of the oscillation numbers of the given Lagrangian path with the Lidskii angles of a special symplectic orthogonal matrix. We also present Sturmian type comparison and separation theorems for the difference of the oscillation numbers of two continuous Lagrangian paths. These results, as well as the definition of the oscillation number itself, are based on the comparative index theory (Elyseeva, 2009). The applications of these results are directed to the theory of Maslov index of two continuous Lagrangian paths. We derive a formula for the Maslov index via the Lidskii angles of a special symplectic orthogonal matrix, and hence we express the Maslov index as the oscillation number of a certain transformed Lagrangian path. The results and methods are based on a generalization of the recently introduced oscillation numbers and dual oscillation numbers for conjoined bases of linear Hamiltonian systems (Elyseeva, 2019 and 2020) and on the connection between the comparative index and Lidskii angles of symplectic matrices (Šepitka and Šimon Hilscher, 2021).
Czech name
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Czech description
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Classification
Type
J<sub>imp</sub> - Article in a specialist periodical, which is included in the Web of Science database
CEP classification
—
OECD FORD branch
10101 - Pure mathematics
Result continuities
Project
<a href="/en/project/GA19-01246S" target="_blank" >GA19-01246S: New oscillation theory for linear Hamiltonian and symplectic systems</a><br>
Continuities
P - Projekt vyzkumu a vyvoje financovany z verejnych zdroju (s odkazem do CEP)
Others
Publication year
2023
Confidentiality
S - Úplné a pravdivé údaje o projektu nepodléhají ochraně podle zvláštních právních předpisů
Data specific for result type
Name of the periodical
Journal of Dynamics and Differential Equations
ISSN
1040-7294
e-ISSN
1572-9222
Volume of the periodical
35
Issue of the periodical within the volume
3
Country of publishing house
US - UNITED STATES
Number of pages
32
Pages from-to
2589-2620
UT code for WoS article
000763193100001
EID of the result in the Scopus database
2-s2.0-85125526670