Florian Luca

Florian Luca (born 16 March 1969 in Galați) is a Romanian mathematician who specializes in number theory with emphasis on Diophantine equations, linear recurrences and the distribution of values of arithmetic functions. He has made notable contributions to the proof that irrational automatic numbers are transcendental and the proof of a conjecture of Erdős on the intersection of the Euler Totient function and the sum of divisors function.

Luca graduated with a BS in Mathematics from Alexandru Ioan Cuza University in Iași (1992), and Ph.D. in Mathematics from the University of Alaska Fairbanks (1996). He has held various appointments at Syracuse University, Bielefeld University, Czech Academy of Sciences, and National Autonomous University of Mexico. Currently he is a research professor at the University of the Witwatersrand. He has co-authored over 500 papers in mathematics with more than 200 co-authors.[1][2][3]

He is a recipient of the award of a 2005 Guggenheim Fellowship for Natural Sciences, Latin America & Caribbean.[4]

Luca is one of the editors-in-chief of INTEGERS: the Electronic Journal of Combinatorial Number Theory[5] and an editor of the Fibonacci Quarterly.[6]

Selected works

gollark: So you could do the boring uncool thing of just fighting it with DE gear, but it turns out there's an AS ritual to freeze hostile mobs which works on it.
gollark: That giant flat area is a nice design. I should try that somehow.
gollark: Oh, I could probably do that.
gollark: I would use a digital miner on them, except I can't get one to configure it with.
gollark: They are *also* not on the surface.

References

  1. Most Published Authors, Journal of Number Theory, Accessed August 14, 2015
  2. Most Published Authors, International Journal of Number Theory, Accessed August 14, 2015
  3. Most Published Authors, Acta Arithmetica, Accessed August 14, 2015
  4. John Simon Guggenheim Foundation | Florian Luca, John Simon Guggenheim Memorial Foundation
  5. Editorial Board, INTEGERS: the Electronic Journal of Combinatorial Number Theory. Accessed August 14, 2015
  6. Editorial Team, Fibonacci Quarterly, Accessed August 14, 2015
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