Jinho Jeoung's portfolio page
Ph.D. candidate (grad. in Aug. 2024) in Mathematical Sciences
Seoul National University, South Korea
Work Eligibility: Can legally work in Canada
Email: zinomorph@gmail.com
Ph.D. candidate (grad. in Aug. 2024) in Mathematical Sciences
Seoul National University, South Korea
Work Eligibility: Can legally work in Canada
Email: zinomorph@gmail.com
Digital Painting: https://www.artstation.com/jinho_jeoung
LinkedIn: www.linkedin.com/in/jinho-jeoung-336a4b2a4/
GitHub: github.com/zinckot
Skills: Houdini, C++, Adobe products(Illustrator, etc.), Painting
During my Ph.D. in mathematics, I focused on homogeneous dynamics and hyperbolic geometry. Prior to my mathematics studies, I worked as a painter, specializing in both traditional and digital techniques, including design and video editing.
Using Houdini, I merge my artistic and mathematical skills.
Spherical effect by using visualization of Kleinian groups (Houdini)
Hallucigenia 3D modeling and character rigging (Houdini)
Hallucigenia is a sea creature in the Cambrian Period.
3D modeling, movement, and walk cycles are all procedurally implemented. It has a little rigging problem after applying the bone deform node as this piece is my first character rigging trial.
Slime mold simulation with diffusion algorithm (Houdini)
N-Body Simulation with the Barnes-Hut algorithm (Houdini)
Trees (Houdini)
A Topological Mixing on a Torus (Houdini)
The Apollonian Gasket (Houdini)
Thesis and figures for thesis (Illustrator)
The figures represent the Bruhat-Tits tree of the projective general linear group of dimension 2 over the quadratic unramified extension of the p-adic field, where p is an odd prime number. The figures also depict the action of a Schottky subgroup within the projective general linear group.
These representations are simplified, as it is impractical to illustrate the genuine infinite tree and challenging to discern dynamical behavior in the actual tree.
Here's the uploaded paper on arxiv: arxiv.org/abs/2311.11118