Non-uniqueness for a differential equation and a proof by ChatGPT

Abstract

Let f(t,x),M(t,x)∈ C([0,1]2) with M(t,x)>0. We consider differential equations of the form \[ ∂ f∂ t(t,x)=M(t,x)f(t,x)-M(t,0)f(t,0)x, x>0. \] For a fixed positive weight M, we ask whether the condition f(0,x)=0 forces f 0. We show the answer is negative for smooth functions: there exist f(t,x),M(t,x)∈ C∞([0,1]2) with f(0,x)=0, f(t,0) 0, and M(t,x)>0 satisfying the above equation. However, we show that for a large class of M(t,x), the equation does have uniqueness. We relate this to uniqueness/non-uniqueness theorems for weighted Laplace transforms. A key example originated in an output by ChatGPT-5.5-Pro, and we include a discussion of its output as well as a complete proof.