Learning Reduced Order Dynamics via Geometric Representations
Imran Nasim, Melanie Weber
SCML 2024
This paper deals with the descriptive set theoretic properties of the class EC of continuous functions with everywhere convergent Fourier series. It is shown that this set is a complete coanalytic set in C(T). A natural coanalytic rank function on EC is studied that assigns to each f EC a countable ordinal number, which measures the “complexity” of the convergence of the Fourier series of f. It is shown that there exist functions in EC (in fact even differentiable ones) which have arbitrarily large countable rank, so that this provides a proper hierarchy on EC with wi distinct levels. © 1987 American Mathematical Society.
Imran Nasim, Melanie Weber
SCML 2024
Laxmi Parida, Pier F. Palamara, et al.
BMC Bioinformatics
John R. Kender, Rick Kjeldsen
IEEE Transactions on Pattern Analysis and Machine Intelligence
Richard M. Karp, Raymond E. Miller
Journal of Computer and System Sciences