Please use this identifier to cite or link to this item: https://doi.org/10.15480/882.4173
Publisher DOI: 10.1007/978-3-030-89397-2_4
Title: Ordinary differential equations
Language: English
Authors: Seifert, Christian  
Trostorff, Sascha 
Waurick, Marcus 
Issue Date: 28-Sep-2021
Publisher: Springer
Source: Operator Theory: Advances and Applications 287: 51-66 (2022-01-01)
Abstract (english): 
In this chapter, we discuss a first application of the time derivative operator constructed in the previous chapter. More precisely, we analyse well-posedness of ordinary differential equations and will at the same time provide a Hilbert space proof of the classical Picard–Lindelöf theorem (There are different notions for this theorem. It is also called existence and uniqueness theorem for initial value problems for ordinary differential equations as well as Cauchy–Lipschitz theorem). We shall furthermore see that the abstract theory developed here also allows for more general differential equations to be considered. In particular, we will have a look at so-called delay differential equations with finite or infinite delay; neutral differential equations are considered in the exercises section.
URI: http://hdl.handle.net/11420/11746
DOI: 10.15480/882.4173
ISBN: 978-3-030-89397-2
978-3-030-89396-5
Institute: Mathematik E-10 
Document Type: Chapter (Book)
License: CC BY 4.0 (Attribution) CC BY 4.0 (Attribution)
Part of Series: Operator theory 
Volume number: 287
Appears in Collections:Publications with fulltext

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