We consider linear difference equations whose coefficients are meromorphic at infinity. We characterize the meromorphic equivalence classes of such equations by means of a system of meromorphic invariants. Using an approach inspired by the work of G.D. Birkhoff we show that the system is free
AbstractIn this paper, the authors continue to study the growth of meromorphic solutions of homogene...
We deal with a uniqueness question of meromorphic functions sharing a polynomial with their differen...
This book lays the algebraic foundations of a Galois theory of linear difference equations and shows...
We consider linear difference equations whose coefficients are meromorphic at infinity. We character...
We consider linear difference equations whose coefficients are meromorphic at infinity. We character...
We consider linear difference equations whose coefficients are meromorphic at infinity. We character...
We consider linear difference equations whose coefficients are meromorphic at infinity. We character...
A Jordan canonical form for formal difference operators, like the one in [7], is derived in a way in...
For various classes of linear ordinary analytic difference equations with meromorphic coefficients, ...
AbstractA Jordan canonical form for formal difference operators, like the one in [7], is derived in ...
0. Introduction. In the preceding parts! and II (see [1,2]), a theory of invariants for meromorphic ...
AbstractA Jordan canonical form for formal difference operators, like the one in [7], is derived in ...
The Painlevé property is closely connected to differential equations that are integrable via related...
For various classes of linear ordinary analytic difference equations with meromorphic coefficients, ...
For various classes of linear ordinary analytic difference equations with meromorphic coefficients, ...
AbstractIn this paper, the authors continue to study the growth of meromorphic solutions of homogene...
We deal with a uniqueness question of meromorphic functions sharing a polynomial with their differen...
This book lays the algebraic foundations of a Galois theory of linear difference equations and shows...
We consider linear difference equations whose coefficients are meromorphic at infinity. We character...
We consider linear difference equations whose coefficients are meromorphic at infinity. We character...
We consider linear difference equations whose coefficients are meromorphic at infinity. We character...
We consider linear difference equations whose coefficients are meromorphic at infinity. We character...
A Jordan canonical form for formal difference operators, like the one in [7], is derived in a way in...
For various classes of linear ordinary analytic difference equations with meromorphic coefficients, ...
AbstractA Jordan canonical form for formal difference operators, like the one in [7], is derived in ...
0. Introduction. In the preceding parts! and II (see [1,2]), a theory of invariants for meromorphic ...
AbstractA Jordan canonical form for formal difference operators, like the one in [7], is derived in ...
The Painlevé property is closely connected to differential equations that are integrable via related...
For various classes of linear ordinary analytic difference equations with meromorphic coefficients, ...
For various classes of linear ordinary analytic difference equations with meromorphic coefficients, ...
AbstractIn this paper, the authors continue to study the growth of meromorphic solutions of homogene...
We deal with a uniqueness question of meromorphic functions sharing a polynomial with their differen...
This book lays the algebraic foundations of a Galois theory of linear difference equations and shows...
DOI
Add to ORKG