Lower bounds for quasianalytic functions, I. How to control smooth functions

Abstract: Let F be a class of functions with the uniqueness property: if f ∈ F vanishes on a set E of positive measure, then f is the zero function. In many instances, we would like to have a quantitative version of this property, e.g. the estimate from below for the norm of the restriction operator f → f | E or, equivalently, a lower bound for |f | outside a small exceptional set. Such estimates are well-known and useful for polynomials, complex-and real-analytic functions, exponential polynomials. In this work we prov… Show more

“…We reproduce the proof of the latter for the convenience of the reader and for the sake of completeness (cf. also [13]). …”

On the Borel mapping in the quasianalytic setting

“…We reproduce the proof of the latter for the convenience of the reader and for the sake of completeness (cf. also [13]). …”

On the Borel mapping in the quasianalytic setting

“…Nazarov, Sodin and Volberg [23] showed, in fact, that there is a quasianalytic Denjoy-Carleman class Q M , and a function f ∈ Q M ([0, 1)) which admits no extension to a function in Q M ′ ((−δ, 1)), for any quasianalytic Q M ′ and δ > 0.…”

Solutions of quasianalytic equations

“…One can extract a quantitative estimate from his proof which however is essentially weaker than Theorem A above and Theorem B from the part I [12] of this work.…”

Lower bounds for quasianalytic functions, II The Bernstein quasianalytic functions.