Zalman Balanov
Affiliations: | Mathematical Sciences | University of Texas at Dallas, Richardson, TX, United States |
Area:
Applied MathematicsGoogle:
"Zalman Balanov"
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Publications
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| Balanov Z, Hooton E, Krawcewicz W, et al. (2021) Patterns of non-radial solutions to coupled semilinear elliptic systems on a disc Nonlinear Analysis-Theory Methods & Applications. 202: 112094 |
| Balanov Z, Muzychuk M, Wu H. (2020) On algebraic problems behind the Brouwer degree of equivariant maps Journal of Algebra. 549: 45-77 |
| Han M, Sun H, Balanov Z. (2019) Upper estimates for the number of periodic solutions to multi-dimensional systems Journal of Differential Equations. 266: 8281-8293 |
| Balanov Z, Kravetc P, Krawcewicz W, et al. (2018) Equivariant degree method for analysis of Hopf bifurcation of relative periodic solutions: Case study of a ring of oscillators Journal of Differential Equations. 265: 4530-4574 |
| Hooton E, Balanov Z, Krawcewicz W, et al. (2017) Noninvasive Stabilization of Periodic Orbits in O4-Symmetrically Coupled Systems Near a Hopf Bifurcation Point International Journal of Bifurcation and Chaos. 27: 1750087 |
| Balanov Z, Krawcewicz W, Li Z. (2015) Symmetric Hopf bifurcation in implicit neutral functional differential equations: Equivariant degree approach Journal of Fixed Point Theory and Applications. 16: 109-147 |
| Balanov Z, Krasnov Y. (2014) Complex structures in algebra, topology and differential equations Georgian Mathematical Journal. 21: 249-260 |
| Balanov Z, Krawcewicz W, Nguyen ML. (2014) Multiple solutions to symmetric boundary value problems for second order ODEs: Equivariant degree approach Nonlinear Analysis, Theory, Methods and Applications. 94: 45-64 |
| Balanov Z, Hu Q, Krawcewicz W. (2014) Global Hopf bifurcation of differential equations with threshold type state-dependent delay Journal of Differential Equations. 257: 2622-2670 |
| Balanov Z, Krawcewicz W, Li Z, et al. (2013) Multiple solutions to implicit symmetric boundary value problems for second order ordinary differential equations (ODEs): Equivariant degree approach Symmetry. 5: 287-312 |