A presente contribuição tem como objetivo desenvolver uma ferramenta numérica para a resolução de problemas inversos modelados por equações diferenciais ordinárias com ordem fracionária. Esta consiste da associação entre o Método da Colocação Ortogonal no contexto fracionário com o algoritmo de Busca Fractal Estocástica. Os resultados obtidos com a extensão do Método da Colocação Ortogonal em funções matemáticas demonstraram a habilidade desta estratégia em comparação com outras abordagens numéricas. Para fins de ilustração, um problema inverso que consiste na determinação dos parâmetros de um modelo e da ordem fracionária do processo de fermentação da enzima lacase é proposto e resolvido. Em relação a este estudo pode-se concluir que o aumento do número de graus de liberdade (ordem fracionária é mais uma variável de projeto) aumenta a chance de um melhor ajuste do modelo aos pontos experimentais.

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