Ricardo Estrada
University of Costa Rica
150 Papers
902 Citations
Ricardo Estrada is an academic researcher from University of Costa Rica. The author has contributed to research in topics: Antivenom & Asymptotic expansion. The author has an hindex of 24, co-authored 148 publications. Previous affiliations of Ricardo Estrada include Louisiana State University & Pennsylvania State University.
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Papers
Contributions of the snake venoms of Bothrops asper, Crotalus simus and Lachesis stenophrys to the paraspecificity of the Central American polyspecific antivenom (PoliVal-ICP)
TL;DR: The individual contributions of homologous venoms to the paraspecificity of PoliVal‐ICP were inferred from the capacity of experimental monospecific antivenom toward venoms of B. asper, C. simus and L. stenophrys, and it was found that all antivenoms neutralized their corresponding homologue venoms.
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Cross-reactivity and cross-immunomodulation between venoms of the snakes Bothrops asper, Crotalus simus and Lachesis stenophrys, and its effect in the production of polyspecific antivenom for Central America
Cynthia Arroyo,Sergio Solano,Álvaro Segura,María Herrera,Ricardo Estrada,Mauren Villalta,Mariángela Vargas,José María Gutiérrez,Guillermo León +8 more
TL;DR: Results indicate that there is low cross‐reactivity and cross‐neutralization between venoms of B. asper, C. simus and L. stenophrys, and suggest that addressing the issue of immunomodulation by venoms might improve antivenom manufacture worldwide.
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Boundary values of analytic functions without distributional point values
TL;DR: In this paper, the authors give a method to construct distributions that are boundary values of analytic functions which have non-tangential limits at points where the distributional point value does not exist.
The asymptotic expansion of certain multi-dimensional generalized functions
Ricardo Estrada,Ram P. Kanwal +1 more
TL;DR: In this paper, the authors apply regularization of divergent integrals in the derivation of the asymptotic expansion of certain multi-dimensional generalized functions, which provides a lucid formulation of the expansion of oscillatory integrals.
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Higher order fundamental forms of a surface and their applications to wave propagation and generalized derivatives
Ricardo Estrada,R. P. Kanwal +1 more
TL;DR: In this article, a general theory of moving and deforming wave fronts is presented by first defining and discussing the higher order fundamental forms for such a surface, which are then used to find the general formula for the jump of the Nth order differential of generalized functions which are discontinuous across this surface.
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