On the quantum differentiation of smooth real-valued functions

Author
Kolosov Petro
View Count
892
License
Creative Commons CC BY 4.0
Abstract

Calculating the value of Ck ∈ {1, ∞} class of smoothness real-valued function's derivative in point of R+ in radius of convergence of its Taylor polynomial (or series), applying an analog of Newton's binomial theorem and q-difference operator. (P,q)-power difference introduced in section 5. Additionally, by means of Newton's interpolation formula, the discrete analog of Taylor series, interpolation using q-difference and p,q-power difference is shown.

On the quantum differentiation of smooth real-valued functions