Bernstein's theorem on monotone functions

In real analysis, a branch of mathematics, Bernstein's theorem states that every real-valued function on the half-line $[0, \infty)$ that is totally monotone is a mixture of exponential functions. In one important special case the mixture is a weighted average, or expected value.

Total monotonicity (sometimes also complete monotonicity) of a function $f$ means that $f$ is continuous on $[0, \infty)$ , infinitely differentiable on $(0, \infty)$ , and satisfies $(-1)^{n}{\frac {d^{n}}{dt^{n}}}f(t)\geq 0$ for all nonnegative integers $n$ and for all $t > 0$ . Another convention puts the opposite inequality in the above definition.

The "weighted average" statement can be characterized thus: there is a non-negative finite Borel measure on $[0, \infty)$ with cumulative distribution function $g$ such that $f(t)=\int _{0}^{\infty }e^{-tx}\,dg(x),$ the integral being a Riemann–Stieltjes integral.

In more abstract language, the theorem characterises Laplace transforms of positive Borel measures on $[0, \infty)$ . In this form it is known as the Bernstein–Widder theorem, or Hausdorff–Bernstein–Widder theorem. Felix Hausdorff had earlier characterised completely monotone sequences. These are the sequences occurring in the Hausdorff moment problem.