On exact solutions of a class of fractional Euler-Lagrange equations

Abstract

In this paper, first a class of fractional differential equations are obtained by using the fractional variational principles. We find a fractional Lagrangian L(x(t), where acDtα x(t)) and 0<α< 1, such that the following is the corresponding Euler-Lagrange % equationtDbα(acDtα) x(t)+ b(t,x(t))(acDtα x(t))+f(t,x(t))=0. equation % At last, exact solutions for some Euler-Lagrange equations are presented. In particular, we consider the following equations % equationtDbα(acDtα x(t))=λ x(t), (λ∈ R) equation % equationtDbα(acDtα x(t))+g(t)acDtα x(t)=f(t), equation where g(t) and f(t) are suitable functions.