The confirmation of this model’s adequacy leads to further applications by experts of this model to other proteins and to fields such as computational drug design. He used Python programming in order see if his mathematical model can effectively describe the Snow Flea Antifreeze Protein (sfAFP) and its unusual structure. His project in computational chemistry involved the use of differential equations dealing with Hamiltonian and Lagrangian mechanics in order to evaluate the adequacy of a model for describing the structure of proteins. Philippe is a Bronx Science senior from Queens. Redefining Protein Stability with the First Adequate Model for Secondary Structure Calculations Zarubin, Vera, First Place Winner in Engineeringīaron, Philippe, Third Place Winner in Chemistry Takada, Wataru, First Place Winner in Mathematics Wataru Takada, Vera Zarubin, and Philippe Baron. The Mathematics Department faculty congratulates 3 senior Math and Computer Science Research students with mastery of advanced areas of Mathematics and Computer Science demonstrated by the Finalist awards of the NYC Metro Junior Science and Humanities Symposia (JSHS) 2018: Outside of research, Wataru volunteers for a non-profit education organization, and plays soccer for DUSC.Ĭongratulations! Mathematics Department faculty congratulates 3 senior Math and Computer Science Research students with mastery of advanced areas of Mathematics and Computer Science demonstrated by the Finalist awards of the NYC Metro Junior Science and Humanities Symposia (JSHS) 2018: Wataru Takada, Vera Zarubin, and Philippe Baron. With this successful approach, he would be able to predict the growth rate of exponential progressions over a much more general class of base structures. While studies in exponential representations of integers through minimal g-adic representations have been discussed in the works of Nathanson and Khovanskii in the context of metric geometries with bi-Lipschitz equivalence and group nets, this project aimed for a simpler and more effective approach with base-n integer representations. There were no previous experts to explore sumsets with torsion free groups that allow well-defined exponential operators, which makes exponential progressions a completely unique object of study within this field. After he created his mathematical model, the numerical optimization algorithm was inputted into Mathematica as a non-linear programming process. His project is focused on developing a growth model for a new object in additive combinatorics related to sumsets that used numerical optimization to obtain sharp bounds for the size of specific cases of base sets over Shimura varieties in Weisstraus restriction mappings. Wataru is a Bronx Science senior from Manhattan. On the Growth of Exponential Progressions Takada, Wataru, fifth place in 2018 JSHS finals.Outside of research, Vera is a member of the Bronx Science cross country and track teams and plays classical clarinet. Her methodology is applicable to the assembly of polymers for energy harvesting applications and nanoscale biomedical devices. Her approach significantly outperforms attempts of experts in the field. Vera implemented thermodynamics equations to describe magnetophoresis and discovered through experimentation that the application of magnetic fields resulted in the alignment of robust nanostructures. Her project in materials science and engineering focuses on the application of magnetophoresis, or the motion induced by a magnetic field on a particle in a fluid, to control the assembly of polymers. Vera is a Bronx Science senior from the Bronx in the Mathematics/Computer Science Research Program.
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