Â鶹AV

Event

Thomas Ransford (Université Laval)

Friday, March 19, 2021 11:00to12:00

Title: Failure of approximation of odd functions by odd polynomials.

Abstract: We construct a Hilbert holomorphic function space $H$ on the unit disk such that the polynomials are dense in $H$, but the odd polynomials are not dense in the odd functions in $H$. As a consequence, there exists a function $f$ in $H$ that lies outside the closed linear span of its Taylor partial sums $s_n(f)$, so it cannot be approximated by any triangular summability method applied to the $s_n(f)$. We also show that there exists a function $f$ in $H$ that lies outside the closed linear span of its radial dilates $f_r, r < 1$. (Joint work with Javad Mashreghi and Pierre-Olivier Parise).

For Zoom meeting information please contact the organizer: dmitry.jakobson [at] mcgill.ca

Follow us on

Back to top