Existence theorem for the difference equation Yn+1−2Yn+Yn−1=h2f(yn)

Existence theorem for the difference equation Yn+1−2Yn+Yn−1=h2f(yn)

For the difference equation (Yn+1−2Yn+Yn−1)h2=f(Yn) sufficient conditions are shown such that for a given Y0 there is either a unique value of Y1 for which the sequence Yn strictly monotonically approaches a constant as n approaches infinity or a continuum interval of such values. It has been shown...

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Bibliographic Details
Main Author: F. Weil
Format: Article
Language:English
Published: Wiley 1980-01-01
Series:International Journal of Mathematics and Mathematical Sciences
Subjects:
existence theorem
difference equations.
Online Access:http://dx.doi.org/10.1155/S0161171280000051
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Summary:For the difference equation (Yn+1−2Yn+Yn−1)h2=f(Yn) sufficient conditions are shown such that for a given Y0 there is either a unique value of Y1 for which the sequence Yn strictly monotonically approaches a constant as n approaches infinity or a continuum interval of such values. It has been shown previously that the first alternative is related to the existence of a Peierls barrier energy in the dislocation model of Frenkel and Kontorova.
ISSN:0161-1712
1687-0425

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