Objetivo
This INTAS project brings together the expert researchers in Western Europe and the school around A. A. Gonchar in the New Independent States. The backbone of the project is the development of the theory of rational approximation of analytic functions, in particular the extension to simultaneous rational approximation to a system of functions. Important tools for rational approximation are Riemann-Hilbert problems, the theory of orthogonal polynomials, logarithmic potential theory, and operator theory for difference operators. Most European experts for these tools are members of the various teams in the project.
One of the main objectives is to work out applications of rational approximation in four areas:
Spectral theory of difference operators. There is a close connection between polynomials satisfying a second order recurrence relation (difference equation), orthogonal polynomials, and denominators of Padé approximation. One of the objectives is to find a similar connection between polynomials satisfying a higher order recurrence relation, multiple orthogonal polynomials, and common denominators of Hermite-Padé approximation. This extension deals with non-symmetric finite order difference equations which have not been considered in the literature but which occur naturally in some situations. We expect to obtain necessary and/or sufficient conditions on the coefficients in the recurrence relations implying multiple orthogonality on the real line, to set up perturbation theory of certain standard recurrence relations (constant coefficients), and to work out the scattering theory for such operators using the asymptotic behaviour of the polynomials and the corresponding Riemann-Hilbert problem.
Non-linear dynamical systems. Certain discrete integrable dynamical systems (Toda lattice, Langmuir lattice) can be solved using tridiagonal operators. Our objective is to study discrete dynamical systems corresponding to banded Hessenberg operators, appearing in the spectral theory of multiple orthogonal polynomials. We expect to find transformations between discrete dynamical systems of higher order, an explicit method for obtaining the solution of these dynamical systems, and we hope to find useful results for the continuous dynamical systems obtained as continuum limits of the discrete systems (as in the continuum limit of the Toda lattice).
Special functions. The multiple orthogonal polynomials arising from Hermite-Padé approximation for very specific systems of functions can be expressed in terms of special functions with various important structure properties. These special functions extend the classical orthogonal polynomials. The objective is to make a full characterisation of the classical multiple orthogonal polynomials, with the relevant properties involving the differential operators, the difference operator, and the q-difference operator, and to investigate their asymptotic behaviour using the Riemann-Hilbert approach. We expect to work out explicit formulas for all these classical polynomials and to list all the relevant quantities characterising these special functions.
Number theory. Historically Hermite-Padé approximation was introduced in the nineteenth century to prove the transcendence of the remarkable constant e (the basis of the natural logarithm). Our objective is to use Hermite-Padé approximation to prove properties of other remarkable constants and we hope to be able to prove irrationality and transcendence of certain constants that are not yet known to be irrational, such as Catalan's constant and Euler's constant. We expect to find explicit rational numbers, expressed in terms of the special function found higher, approximating these constants.
Programa(s)
Programas de financiación plurianuales que definen las prioridades de la UE en materia de investigación e innovación.
Programas de financiación plurianuales que definen las prioridades de la UE en materia de investigación e innovación.
Tema(s)
Las convocatorias de propuestas se dividen en temas. Un tema define una materia o área específica para la que los solicitantes pueden presentar propuestas. La descripción de un tema comprende su alcance específico y la repercusión prevista del proyecto financiado.
Las convocatorias de propuestas se dividen en temas. Un tema define una materia o área específica para la que los solicitantes pueden presentar propuestas. La descripción de un tema comprende su alcance específico y la repercusión prevista del proyecto financiado.
Convocatoria de propuestas
Procedimiento para invitar a los solicitantes a presentar propuestas de proyectos con el objetivo de obtener financiación de la UE.
Datos no disponibles
Procedimiento para invitar a los solicitantes a presentar propuestas de proyectos con el objetivo de obtener financiación de la UE.
Régimen de financiación
Régimen de financiación (o «Tipo de acción») dentro de un programa con características comunes. Especifica: el alcance de lo que se financia; el porcentaje de reembolso; los criterios específicos de evaluación para optar a la financiación; y el uso de formas simplificadas de costes como los importes a tanto alzado.
Régimen de financiación (o «Tipo de acción») dentro de un programa con características comunes. Especifica: el alcance de lo que se financia; el porcentaje de reembolso; los criterios específicos de evaluación para optar a la financiación; y el uso de formas simplificadas de costes como los importes a tanto alzado.
Datos no disponibles
Coordinador
3001 Leuven
Bélgica
Los costes totales en que ha incurrido esta organización para participar en el proyecto, incluidos los costes directos e indirectos. Este importe es un subconjunto del presupuesto total del proyecto.