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Q92714513 description "article scientifique publié en 2019" @default.
Q92714513 description "artículu científicu espublizáu en marzu de 2019" @default.
Q92714513 description "scientific article published on 01 March 2019" @default.
Q92714513 description "wetenschappelijk artikel" @default.
Q92714513 description "наукова стаття, опублікована 1 березня 2019" @default.
Q92714513 name "A novel method based on the pseudo-orbits to calculate the largest Lyapunov exponent from chaotic equations" @default.
Q92714513 name "A novel method based on the pseudo-orbits to calculate the largest Lyapunov exponent from chaotic equations" @default.
Q92714513 type Item @default.
Q92714513 label "A novel method based on the pseudo-orbits to calculate the largest Lyapunov exponent from chaotic equations" @default.
Q92714513 label "A novel method based on the pseudo-orbits to calculate the largest Lyapunov exponent from chaotic equations" @default.
Q92714513 prefLabel "A novel method based on the pseudo-orbits to calculate the largest Lyapunov exponent from chaotic equations" @default.
Q92714513 prefLabel "A novel method based on the pseudo-orbits to calculate the largest Lyapunov exponent from chaotic equations" @default.
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Q92714513 P1476 Q92714513-7DF1339F-A535-48B1-AD0E-AC668C7F4D55 @default.
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Q92714513 P1476 "A novel method based on the pseudo-orbits to calculate the largest Lyapunov exponent from chaotic equations" @default.
Q92714513 P2093 "Shuang Zhou" @default.
Q92714513 P2093 "Xingyuan Wang" @default.
Q92714513 P304 "033125" @default.
Q92714513 P31 Q13442814 @default.
Q92714513 P356 "10.1063/1.5087512" @default.
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Q92714513 P577 "2019-03-01T00:00:00Z" @default.
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Q92714513 P698 "30927834" @default.
Q92714513 P894 "1411.34073" @default.