Email this article Existence of Solutions with a Given Number of Zeros to a Higher-Order Regular Nonlinear Emden–Fowler Equation
- Authors: Rogachev V.V.1
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Affiliations:
- Lomonosov Moscow State University
- Issue: Vol 54, No 12 (2018)
- Pages: 1595-1601
- Section: Ordinary Differential Equations
- URL: https://journals.rcsi.science/0012-2661/article/view/154896
- DOI: https://doi.org/10.1134/S0012266118120066
- ID: 154896
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Abstract
We consider the nonlinear Emden–Fowler equation
\({y^{(n)}} + p(t,y,y\prime, \ldots ,{y^{(n - 1)}})|y{|^k}{\rm{sgn }}y = 0,\)![]()
, where n ∈ ℕ, n ≥ 2, k ∈ ℝ, k > 1, and the function p(t, ξ1,…, ξn) is jointly continuous in all the variables, satisfies the Lipschitz condition with respect to the variables ξ1,…, ξn, and obeys the inequalities m ≤ p(t, ξ1,…, ξn) ≤ M with some positive constants M and m. For this equation, we prove the existence of solutions that are defined on an arbitrary given interval or half-interval and have a prescribed number of zeros.About the authors
V. V. Rogachev
Lomonosov Moscow State University
Author for correspondence.
Email: valdakhar@gmail.com
Russian Federation, Moscow, 119991
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