Mohamed Bouabdallah, Omar Chakrone, Mohammed Chehabi
abstract:
In this paper, by using the critical point theory, specially the fountain
theorem given in [W. Zou, Variant fountain theorems and their applications.
Manuscripta Math. 104 (2001), no. 3, 343-358], we prove the existence
of infinitely many solutions for a second order impulsive differential equation
governed by the one-dimensional p-Laplacian operator. Finally, an example
is presented to illustrate our main result.
Mathematics Subject Classification: 35R12, 35J20, 35J60
Key words and phrases: p-Laplacian operator, Impulsive differential equations, Critical point theory, Fountain theorem