Publication detail
Regularly varying solutions of subhomogeneous differential equations with p(t)-Laplacian
ŘEHÁK, P. FUJIMOTO, K.
English title
Regularly varying solutions of subhomogeneous differential equations with p(t)-Laplacian
Type
WoS Article
Language
en
Original abstract
This paper investigates the asymptotic behavior of increasing solutions to subhomogeneous differential equations involving the p(t)-Laplacian operator. Specifically, we consider the quasilinear equation (a(t)|y'|(p(t)) sgny')' = b(t)|y|(q(t)) L-G(|y|)sgny where p(t) and q(t) are variable exponents and L-G is a slowly varying perturbation. Our focus is on regularly varying solutions under the subhomogeneity condition p(t) > q(t) for large t. We show that all increasing solutions are regularly varying, derive asymptotic formulas for these solutions, and demonstrate their examples. This work contributes to the understanding of nonoscillatory solutions and shows how regular variation can be useful in studying differential equations involving variable exponents.
Keywords in English
Asymptotic behavior, Nonoscillatory solutions, Regularly varying function, Variable exponent, p(t)-Laplacian, Half-linear differential equations
Released
2025-11-08
Publisher
Springer Nature
Volume
33
Number
1
Pages from–to
1–23
Pages count
23
BIBTEX
@article{BUT199535,
author="{} and Pavel {Řehák}",
title="Regularly varying solutions of subhomogeneous differential equations with p(t)-Laplacian",
journal="Nonlinear differential equations and applications",
year="2025",
volume="33",
number="1",
pages="1--23",
doi="10.1007/s00030-025-01164-1",
issn="1021-9722",
url="https://link.springer.com/article/10.1007/s00030-025-01164-1"
}