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1. PIECEWISE LINEAR DIFFERENTIAL SYSTEMS WITH AN ALGEBRAIC LINE OF SEPARATION.

Author

GASULL, ARMENGOL, TORREGROSA, JOAN, and XIANG ZHANG

Subjects

*LINEAR systems, *ALGEBRAIC curves, *CHEBYSHEV systems, *GENERATING functions, *SET functions, *LINEAR algebraic groups, *LIMIT cycles

Abstract

We study the number of limit cycles of planar piecewise linear differential systems separated by a branch of an algebraic curve. We show that for each n E N there exist piecewise linear differential systems separated by an algebraic curve of degree n having [n/2] hyperbolic limit cycles. Moreover, when n = 2, 3, we study in more detail the problem, considering a perturbation of a center and constructing examples with 4 and 5 limit cycles, respectively. These results follow by proving that the set of functions generating the first order averaged function associated to the problem is an extended complete Chebyshev system in a suitable interval. [ABSTRACT FROM AUTHOR]

Published

2020