# Kai Udo Berger

> Ph.D. Technische Universität Carolo-Wilhelmina zu Braunschweig 2012

**Wikidata**: [Q103055563](https://www.wikidata.org/wiki/Q103055563)  
**Source**: https://4ort.xyz/entity/kai-udo-berger

## Summary
Kai Udo Berger is a German computer scientist who earned his Ph.D. from Technische Universität Carolo-Wilhelmina zu Braunschweig in 2012. He completed his doctoral studies under the supervision of Marcus Magnor, contributing to the field of computer science through academic research.

## Biography
- Education: Ph.D. from Technische Universität Carolo-Wilhelmina zu Braunschweig (2012)
- Doctoral Advisor: Marcus Magnor
- Occupation: Computer scientist
- Field(s): Computer science

## Contributions
Kai Udo Berger's primary academic contribution stems from his doctoral research completed at Technische Universität Carolo-Wilhelmina zu Braunschweig in 2012. Under the guidance of his doctoral advisor Marcus Magnor, Berger contributed to the body of knowledge in computer science. His work is documented in the Mathematics Genealogy Project with ID 243630, indicating his position in the academic lineage of mathematical and computational research. While specific details about his research focus and publications are not provided in the source material, his completion of a Ph.D. program represents a significant contribution to advancing knowledge in computer science through original research and scholarly work.

## FAQs
### Q: Where did Kai Udo Berger earn his Ph.D.?
A: Kai Udo Berger earned his Ph.D. from Technische Universität Carolo-Wilhelmina zu Braunschweig in 2012.

### Q: Who was Kai Udo Berger's doctoral advisor?
A: Marcus Magnor served as Kai Udo Berger's doctoral advisor during his Ph.D. studies.

### Q: When did Kai Udo Berger complete his doctorate?
A: Kai Udo Berger completed his Ph.D. in 2012 at Technische Universität Carolo-Wilhelmina zu Braunschweig.

## Why They Matter
Kai Udo Berger represents an important link in the academic chain of computer science education and research. As a Ph.D. graduate from Technische Universität Carolo-Wilhelmina zu Braunschweig, he contributes to the institution's reputation in computer science education. His inclusion in the Mathematics Genealogy Project database demonstrates his role in the continuation of academic research traditions in computational fields. Through his doctoral work supervised by Marcus Magnor, Berger has added to the collective knowledge base of computer science, training the next generation of researchers and practitioners in the field. His academic achievement represents the rigorous preparation required for advanced research in computer science and helps maintain the quality standards of German technical universities in computational disciplines.

## Notable For
• Completed Ph.D. in Computer Science from Technische Universität Carolo-Wilhelmina zu Braunschweig in 2012
• Academic genealogy documented in Mathematics Genealogy Project with ID 243630
• Student of Marcus Magnor, contributing to the academic lineage in computer science
• Represents the tradition of rigorous technical education at German universities

## Body
### Academic Achievement
Kai Udo Berger successfully completed his doctoral degree at Technische Universität Carolo-Wilhelmina zu Braunschweig in 2012. This achievement represents the culmination of extensive research and study in computer science.

### Supervision and Mentorship
Berger's doctoral studies were guided by Marcus Magnor, who served as his doctoral advisor. This mentorship relationship placed Berger within a specific academic tradition of computer science research.

### Academic Documentation
His educational background is formally recorded in the Mathematics Genealogy Project under ID 243630, which documents the academic lineage of mathematicians and computer scientists worldwide.

### Institutional Affiliation
Technische Universität Carolo-Wilhelmina zu Braunschweig, where Berger earned his doctorate, is a recognized institution for technical and scientific education in Germany, adding credibility to his academic credentials.

## References

1. Mathematics Genealogy Project