8 resultados para largest finite-time Lyapunov exponent
em Bulgarian Digital Mathematics Library at IMI-BAS
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2000 Mathematics Subject Classification: 60H30, 35K55, 35K57, 35B35.
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We present some results on the formation of singularities for C^1 - solutions of the quasi-linear N × N strictly hyperbolic system Ut + A(U )Ux = 0 in [0, +∞) × Rx . Under certain weak non-linearity conditions (weaker than genuine non-linearity), we prove that the first order derivative of the solution blows-up in finite time.
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∗The author was partially supported by Alexander von Humboldt Foundation and the Contract MM-516 with the Bulgarian Ministry of Education, Science and Thechnology.
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MSC 2010: 34A08, 34A37, 49N70
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Mathematics Subject Classification 2010: 26A33, 33E12, 35S10, 45K05.
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∗The first author was partially supported by MURST of Italy; the second author was par- tially supported by RFFI grant 99-01-00233.
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* This research was supported by a grant from the Greek Ministry of Industry and Technology.
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We consider the problems of finding two optimal triangulations of a convex polygon: MaxMin area and MinMax area. These are the triangulations that maximize the area of the smallest area triangle in a triangulation, and respectively minimize the area of the largest area triangle in a triangulation, over all possible triangulations. The problem was originally solved by Klincsek by dynamic programming in cubic time [2]. Later, Keil and Vassilev devised an algorithm that runs in O(n^2 log n) time [1]. In this paper we describe new geometric findings on the structure of MaxMin and MinMax Area triangulations of convex polygons in two dimensions and their algorithmic implications. We improve the algorithm’s running time to quadratic for large classes of convex polygons. We also present experimental results on MaxMin area triangulation.
