On unbounded solutions for differential equations with mean curvature operator
Abstract
summary:We present necessary and sufficient conditions for the existence of unbounded increasing solutions to ordinary differential equations with mean curvature operator. The results illustrate the asymptotic proximity of such solutions with those of an auxiliary linear equation on the threshold of oscillation. A new oscillation criterion for equations with mean curvature operator, extending Leighton criterion for linear Sturm-Liouville equation, is also derivedSimilar works
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Last time updated on 20/04/2025
This paper was published in Institute of Mathematics AS CR, v. v. i..
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