In this paper some new comparison theorems between lower solutions and upper solutions in the Caratheodory sense of functional Cauchy problems are established. Criteria on continuous dependence and a functional extension of Muller's Theorem are derived as applications.
Comparison theorems in hereditary structures and applications / Marcelli, Cristina. - In: JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS. - ISSN 0022-247X. - STAMPA. - 196:3(1995), pp. 1073-1092.
Comparison theorems in hereditary structures and applications
MARCELLI, Cristina
1995-01-01
Abstract
In this paper some new comparison theorems between lower solutions and upper solutions in the Caratheodory sense of functional Cauchy problems are established. Criteria on continuous dependence and a functional extension of Muller's Theorem are derived as applications.File in questo prodotto:
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