# Ulrike Fischer

> Dr.-Ing. Technische Universität Dresden 2013

**Wikidata**: [Q102761004](https://www.wikidata.org/wiki/Q102761004)  
**Source**: https://4ort.xyz/entity/ulrike-fischer-q102761004

## Summary  
Ulrike Fischer is a German computer scientist who earned her Dr.-Ing. (Doctor of Engineering) degree from Technische Universität Dresden in 2013. She completed her doctorate under the supervision of Wolfgang Lehner, a noted computer‑science professor at the same university.

## Biography  
- **Born:** –  
- **Nationality:** – (affiliated with German academic institutions)  
- **Education:** Dr.-Ing., Technische Universität Dresden (2013) – doctoral advisor: Wolfgang Lehner  
- **Known for:** Doctoral research in computer science at TU Dresden  
- **Employer(s):** – (no specific employer listed)  
- **Field(s):** Computer science  

## Contributions  
Ulrike Fischer’s primary scholarly contribution is her doctoral dissertation completed in 2013 at Technische Universität Dresden. Under the guidance of Wolfgang Lehner, her research added to the body of knowledge in computer science, meeting the rigorous standards required for the Dr.-Ing. degree. The dissertation is recorded in the Mathematics Genealogy Project (ID 224302), linking her to an international academic lineage. While specific publications or patents are not listed in the source material, the attainment of a Dr.-Ing. signifies a substantial original research effort that has been reviewed and accepted by the university’s faculty.

## FAQs  
### Q: What degree did Ulrike Fischer obtain?  
A: She earned a Dr.-Ing. (Doctor of Engineering) from Technische Universität Dresden in 2013.  

### Q: Who supervised Ulrike Fischer’s doctoral work?  
A: Her doctoral advisor was Wolfgang Lehner, a computer‑science professor at TU Dresden.  

### Q: Is Ulrike Fischer listed in any academic genealogy?  
A: Yes, she appears in the Mathematics Genealogy Project with the identifier 224302.  

## Why They Matter  
Ulrike Fischer’s achievement of a Dr.-Ing. places her among a select group of scholars who have contributed original research to computer science in Germany. Her work, supervised by a recognized expert, reinforces the academic standards of TU Dresden and adds to the university’s reputation for producing high‑quality doctoral research. By joining the Mathematics Genealogy Project, she becomes part of a documented scholarly lineage, enabling future researchers to trace intellectual influences across generations. Her doctorate exemplifies the rigorous training that underpins advancements in computing theory and practice.  

## Notable For  
- Awarded the Dr.-Ing. degree from Technische Universität Dresden (2013)  
- Doctoral supervision by Wolfgang Lehner, a prominent computer scientist  
- Inclusion in the Mathematics Genealogy Project (ID 224302)  
- Recognized as a professional computer scientist in German academic circles  

## Body  

### Education  
- **Institution:** Technische Universität Dresden (TU Dresden)  
- **Degree:** Dr.-Ing. (Doctor of Engineering) in Computer Science, awarded 2013  
- **Advisor:** Wolfgang Lehner, professor of computer science at TU Dresden  

### Doctoral Research  
- Conducted original research under Lehner’s supervision.  
- Satisfied TU Dresden’s doctoral requirements, culminating in the Dr.-Ing. award.  

### Academic Lineage  
- Listed in the Mathematics Genealogy Project (ID 224302), establishing her place in the scholarly ancestry of computer scientists.  

### Professional Identity  
- Classified in Wikidata as a “computer scientist” and a “human” (instance of).  
- Holds the given name *Ulrike* and family name *Fischer*.  

### Impact and Recognition  
- The Dr.-Ing. credential signals a high level of expertise and research capability in engineering and computer science.  
- Her connection to Wolfgang Lehner links her to a network of German computer‑science researchers, potentially influencing collaborative projects and academic mentorship.  

*All information presented is derived exclusively from the supplied source material.*

## References

1. Mathematics Genealogy Project