- Research Grants
graduate at Bacharelado em Matemática from Universidade Estadual de Campinas (2004) and master's at Mestrado em Matemática from Universidade Estadual de Campinas (2007). Has experience in Mathematics, focusing on Mathematics, acting on the following subjects: partições, funções simétricas, funções geradoras, problemas de enumeração combinatória and permutações. (Source: Lattes Curriculum)
This project is devoted to the study of arithmetic properties of partition functions. In particular, we are interested in functions which enumerate partitions of n and dependent on more parameters than just n (AU)
This project is devoted to the study of recurrence relations that enumerate integer partitions satisfying certain conditions. In order to do so, generating functions, recurrence relations and Theory of Partitions will be studied in detail.
This project aims the study of combinatorial proofs of partitions identities. Based on the combinatorial proofs of the classic results, proofs of this type will be seek for some identities that still do not have them.
This project is aimed to study properties of discrete nature in Additive Number Theory, both in Z and its field of fractions, Q, as in the more general context of function fields and polynomial rings over finite fields. In particular, we want to investigate what would be the analogues of integer partitions in function fields and investigate their properties, which has not yet been done.
(References retrieved automatically from Web of Science and SciELO through information on FAPESP grants and their corresponding numbers as mentioned in the publications by the authors)
|Data from Web of Science|