On a Mandelbrot-Like Set for a Family of Exponential Maps
Offered By: Banach Center via YouTube
Course Description
Overview
Explore a fascinating mathematical concept in this 26-minute lecture by Dan Paraschiv from the Institute of Mathematics of the Romanian Academy. Delve into the intricacies of a Mandelbrot-like set for a family of exponential maps, gaining insights into complex dynamics and fractal geometry. Discover how these exponential maps relate to the famous Mandelbrot set and learn about their unique properties and behaviors.
Syllabus
On a Mandelbrot-like set for a family of exponential maps
Taught by
Banach Center
Related Courses
Shape Morphing and Menger Sponge in ProcessingCoding Train via YouTube Fractals Are Typically Not Self-Similar
3Blue1Brown via YouTube The Butterfly Effect - What Does It Really Signify?
University of Oxford via YouTube 3D Printed Fractal Vise - The Coolest Tool You Didn't Know You Needed
Teaching Tech via YouTube Self-Similar Sets and Measures on the Line
International Mathematical Union via YouTube