# John Michael Lounsbery

> Ph.D. University of Washington 1994

**Wikidata**: [Q102251150](https://www.wikidata.org/wiki/Q102251150)  
**Source**: https://4ort.xyz/entity/john-michael-lounsbery

## Summary
John Michael Lounsbery is a computer scientist known for his work in multiresolution analysis for surfaces, culminating in his 1994 Ph.D. from the University of Washington. Born in 1966, he specialized in computer science and engineering, contributing foundational research in geometric modeling and surface representation.

## Biography
- **Born**: 1966  
- **Nationality**: [Not specified in source material]  
- **Education**: Ph.D. in computer science/engineering, University of Washington (1994)  
- **Known for**: Research on multiresolution analysis for surfaces of arbitrary topological type  
- **Employer(s)**: [Not specified in source material]  
- **Field(s)**: Computer science, computer engineering  

## Contributions
John Michael Lounsbery’s primary contribution is his doctoral thesis, *Multiresolution Analysis for Surfaces of Arbitrary Topological Type* (1994), which advanced geometric modeling techniques. Under the supervision of Anthony David DeRose, his work addressed the challenge of representing and analyzing complex surfaces in computer graphics and engineering. While specific applications or follow-up publications are not detailed in the source material, his research laid groundwork for methods in surface subdivision and topological analysis. The thesis remains a reference in academic databases, including the Mathematics Genealogy Project (ID: 71924), highlighting its technical relevance to fields like computer-aided design and 3D modeling.

## FAQs
### Q: What is John Michael Lounsbery best known for?
A: He is best known for his Ph.D. thesis on multiresolution analysis for surfaces, completed at the University of Washington in 1994.

### Q: Who supervised his doctoral research?
A: His doctoral advisor was Anthony David DeRose.

### Q: What field did Lounsbery contribute to?
A: His work falls within computer science and engineering, specifically geometric modeling and surface analysis.

## Why They Matter
John Michael Lounsbery’s research on multiresolution surface analysis contributed to foundational techniques in computer graphics and geometric modeling. His thesis addressed critical challenges in representing complex topologies, influencing methodologies for surface subdivision and data compression. While direct industrial applications are not specified, his academic work aligns with advancements in 3D visualization, computer-aided design, and digital geometry processing. His inclusion in the Mathematics Genealogy Project underscores his role in the academic lineage of computational geometry.

## Notable For
- Ph.D. in computer science/engineering from the University of Washington (1994).  
- Thesis: *Multiresolution Analysis for Surfaces of Arbitrary Topological Type* (1994).  
- Doctoral advisor: Anthony David DeRose.  
- Mathematics Genealogy Project ID: 71924.  

## Body
### Academic Career
Lounsbery earned his doctorate in 1994 from the University of Washington, focusing on computer science and engineering. His research was supervised by Anthony David DeRose, a notable figure in computational geometry.  

### Research Focus
His thesis, *Multiresolution Analysis for Surfaces of Arbitrary Topological Type*, explored mathematical frameworks for analyzing and representing surfaces with complex topologies. This work is relevant to:  
- **Computer Graphics**: Enabling detailed surface modeling for visualizations and simulations.  
- **Engineering**: Improving computational tools for designing and optimizing 3D structures.  

### Legacy
While specific industrial impacts are not documented in the source material, his research aligns with ongoing developments in:  
- **Subdivision Surfaces**: Techniques for creating smooth surfaces from coarse meshes.  
- **Topological Data Analysis**: Methods for studying shape and structure in digital data.  

His inclusion in academic databases like the Mathematics Genealogy Project reflects his contribution to the broader field of computational geometry.

## References

1. Mathematics Genealogy Project
2. WorldCat