Majoration of the dimension of the space of concatenated solutions of a specific pantograph equation

Abstract

For each λ ∈ N*, we consider the integral equation: \[ ∫λ y λ x f(t)\, d t = f(x) - f(y) for every (x,y)∈ R+2, \] where f is the concatenation of two continuous functions fa,fb:[0,λ] → R along a word u= u0u1·s∈\a,b\ N such that u=σ(u), where σ is a λ-uniform substitution satisfying some combinatorial conditions. There exists some non-trivial solutions. We show in this work that the dimension of the set of solutions is at most two.