Integral Methods in Science and Engineering, Volume 2 Computatio

Mathematical models—including those based on ordinary, partial differential, integral, and integro-differential equations—are indispensable tools for studying the physical world and its natural manifestations. Because of the usefulness of these models, it

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C O M P U T AT I O N A L M E T H O D S

C. Constanda, M.E. Pérez, E D I T O R S

  

  

     

        

       

                                                        

       



                                                       



                                                                



                   



            



                        



                     



             



                







           

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