Jump to content

Malmquist's theorem

From Wikipedia, the free encyclopedia

This is an old revision of this page, as edited by WereSpielChequers (talk | contribs) at 11:27, 16 March 2016 (Statement of the theorems: Typo fixing, replaced: is is → is using AWB). The present address (URL) is a permanent link to this revision, which may differ significantly from the current revision.

In mathematics, Malmquist's theorem, is the name of any of the three theorems proved by Axel Johannes Malmquist (1913, 1920, 1941). These theorems restrict the forms of first order algebraic differential equations which have transcendental meromorphic or algebroid solutions.

Statement of the theorems

Theorem (1913). If the differential equation

where R(z,w) is a rational function, has a transcendental meromorphic solution, then R is a polynomial of degree at most 2 with respect to w; in other words the differential equation is a Riccati equation, or linear.

Theorem (1920). If an irreducible differential equation

where F is a polynomial, has a transcendental meromorphic solution, then the equation has no movable singularities. Moreover, it can be algebraically reduced either to a Riccati equation or to

where P is a polynomial of degree 3 with respect to w.

Theorem (1941). If an irreducible differential equation

where F is a polynomial, has a transcendental algebroid solution, then it can be algebraically reduced to an equation that has no movable singularities.

A modern account of theorems 1913, 1920 is given in the paper of A. Eremenko(1982)

References

  • Malmquist, J. (1913), "Sur les fonctions a un nombre fini de branches définies par les équations différentielles du premier ordre", Acta Mathematica, 36 (1): 297–343, doi:10.1007/BF02422385
  • Malmquist, J. (1920), "Sur les fonctions a un nombre fini de branches définies par les équations différentielles du premier ordre", Acta Mathematica, 42 (1): 317–325, doi:10.1007/BF02404413
  • Malmquist, J. (1941), "Sur les fonctions a un nombre fini de branches définies par les équations différentielles du premier ordre", Acta Mathematica, 74 (1): 175–196, doi:10.1007/BF02392253, MR 0005974
  • Eremenko, A. (1982), "Meromorphic solutions of algebraic differential equations", Russian Mathematical Surveys, 37 (4): 61–95, MR 0667974{{citation}}: CS1 maint: MR format (link)