Ahlfors theory
Jump to navigation
Jump to search
English[edit]
Alternative forms[edit]
Etymology[edit]
Named after Finnish mathematician Lars Ahlfors (1907—1996), who published the theory in 1935.[1]
Noun[edit]
- (complex analysis, differential geometry) A geometric counterpart to Nevanlinna theory that extends the applicability of the concept of covering surface (of a topological space) by defining a covering number (a generalised "degree of covering") applicable to any bordered Riemann surface equipped with a conformal Riemannian metric.
- 1968, Joseph Belsley Miles, The Asymptotic Behavior of the Counting Function for the A-values of a Meromorphic Function, University of Wisconsin-Madison, page 29:
- In this chapter we use Ahlfors' theory of covering surfaces to obtain results on the functional .
- 1986, Pacific Journal of Mathematics, volumes 122-123, page 441:
- Terms of the form in Ahlfors theory are given in the form where is a constant.
- 2004, G. Barsegian, “A new program of investigations in analysis: Gamma-lines approaches”, in G. Barsegian, I. Laine, C. C. Yang, editors, Value Distribution Theory and Related Topics, Kluwer Academic, page 43:
- The Ahlfors theory itself describes covering of curves or domains, but not covering of distinct, complex values .
Translations[edit]
theory that extends the concept of covering surface
References[edit]
- ^ 1935, "Zur Theorie der Uberlagerungsflachen", Acta Mathematica, Volume 65, 157–194.[1]