Year 2024

• A note on the Morse homology for a class of functionals in Banach spaces involving the 2p-area functional

  Publication

  • L. Asselle
  • M. Starostka

  - NODEA-NONLINEAR DIFFERENTIAL EQUATIONS AND APPLICATIONS - Year 2024

  In this paper we show how to construct Morse homology for an explicit class of functionals involving the 2p-area functional. The natural domain of definition of such functionals is the Banach space W_0^{1,2p}(\Omega), where p > n/2 and \Omega \subet R^n is a bounded domain with sufficiently smooth boundary. As W_0^{1,2p}(\Omega) is not isomorphic to its dual space,critical points of such functionals cannot be non-degenerate...

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• The relative cup-length in local Morse cohomology

  Publication

  • T. O. Rot
  • M. Starostka
  • N. Waterstraat

  - Topological Methods in Nonlinear Analysis - Year 2024

  Local Morse cohomology associates cohomology groups to isolating neighborhoods of gradient flows of Morse functions on (generally non-compact) Riemannian manifolds M. We show that local Morse cohomology is a module over the cohomology of the isolating neighborhood, which allows us to define a cup-length relative to the cohomology of the isolating neighborhood that gives a lower bound on the number of critical points of functions...

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Year 2023

• The Arnold conjecture in $ \mathbb C\mathbb P^n $ and the Conley index

  Publication

  • L. Asselle
  • M. Izydorek
  • M. Starostka

  - DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS-SERIES B - Year 2023

  n this paper we give an alternative, purely Conley index based proof of the Arnold conjecture in CP^n asserting that a Hamiltonian diffeomorphism of CP^n endowed with the Fubini-Study metric has at least (n+1) fixed points.

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Year 2022

• On a comparison principle and the uniqueness of spectral flow

  Publication

  • M. Starostka
  • N. Waterstraat

  - MATHEMATISCHE NACHRICHTEN - Year 2022

  The spectral flow is a well-known quantity in spectral theory that measures the variation of spectra about 0 along paths of selfadjoint Fredholm operators. The aim of this work is twofold. Firstly, we consider homotopy invariance properties of the spectral flow and establish a simple formula which comprises its classical homotopy invariance and yields a comparison theorem for the spectral flow under compact perturbations. We apply...

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Year 2021

• Connected components of the space of proper gradient vector fields

  Publication

  • M. Starostka

  - Journal of Fixed Point Theory and Applications - Year 2021

  We show that there exist two proper gradient vector fields on Rn which are homotopic in the category of proper maps but not homotopic in the category of proper gradient maps.

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Year 2020

• The Palais–Smale condition for the Hamiltonian action on a mixed regularity space of loops in cotangent bundles and applications

  Publication

  • L. Asselle
  • M. Starostka

  - CALCULUS OF VARIATIONS AND PARTIAL DIFFERENTIAL EQUATIONS - Year 2020

  We show that the Hamiltonian action satisfies the Palais-Smale condition over a “mixed regular- ity” space of loops in cotangent bundles, namely the space of loops with regularity H^s, s ∈ (1/2, 1), in the baseand H^{1−s} in the fiber direction. As an application, we give a simplified proof of a theorem of Hofer-Viterbo on the existence of closed characteristic leaves for certain contact type hypersufaces in cotangent bundles.

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Year 2019

• Bernstein-type theorem for ϕ-Laplacian

  Publication

  • J. Maksymiuk
  • J. Ciesielski
  • M. Starostka

  - Fixed Point Theory and Applications - Year 2019

  In this paper we obtain a solution to the second-order boundary value problem of the form \frac{d}{dt}\varPhi'(\dot{u})=f(t,u,\dot{u}), t\in [0,1], u\colon \mathbb {R}\to \mathbb {R} with Sturm–Liouville boundary conditions, where \varPhi\colon \mathbb {R}\to \mathbb {R} is a strictly convex, differentiable function and f\colon[0,1]\times \mathbb {R}\times \mathbb {R}\to \mathbb {R} is continuous and satisfies a suitable growth...

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• The E-Cohomological Conley Index, Cup-Lengths and the Arnold Conjecture on T 2n

  Publication

  • M. Starostka
  • N. Waterstraat

  - ADVANCED NONLINEAR STUDIES - Year 2019

  We show that the E-cohomological Conley index, that was introduced by the first author recently, has a natural module structure. This yields a new cup-length and a lower bound for the number of critical points of functionals on Hilbert spaces. When applied to the setting of the Arnold conjecture, this paves the way to a short proof on tori, where it was first shown by C. Conley and E. Zehnder in 1983.

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Year 2017

• E-cohomological Conley index

  Publication

  • M. Starostka

  - Year 2017

  In this thesis we continue with developing the E-cohomological Conley index which was introduced by A.Abbondandolo. In particular, we generalize the index to non-gradient flows, we show that it an possesses additional multiplicative structure and we prove the continuation principle. Then, using continuation principle, we show how the computation of the E-cohomological Conley index can be reduced to the computation of the classical...

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• Homotopy invariance of the Conley index and local Morse homology in Hilbert spaces

  Publication

  • M. Izydorek
  • T. O. Rot
  • M. Starostka
  • M. Styborski
  • R. C. Vandervorst

  - JOURNAL OF DIFFERENTIAL EQUATIONS - Year 2017

  In this paper we introduce a new compactness condition — Property-(C) — for flows in (not necessary locally compact) metric spaces. For such flows a Conley type theory can be developed. For example (regular) index pairs always exist for Property-(C) flows and a Conley index can be defined. An important class of flows satisfying the this compactness condition are LS-flows. We apply E-cohomology to index pairs of LS-flows and obtain...

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Year 2015

• A remark on singular sets of vector bundle morphisms

  Publication

  • M. Starostka
  • N. Waterstraat

  - Central European Journal of Mathematics - Year 2015

  If characteristic classes for two vector bundles over the same base space do not coincide, then the bundles are not isomorphic. We give under rather common assumptions a lower bound on the topological dimension of the set of all points in the base over which a morphism between such bundles is not bijective. Moreover, we show that this set is topologically non-trivial.

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• Morse cohomology in a Hilbert space via the Conley index

  Publication

  • M. Starostka

  - Journal of Fixed Point Theory and Applications - Year 2015

  The main theorem of this paper states that Morse cohomology groups in a Hilbert space are isomorphic to the cohomological Conley index. It is also shown that calculating the cohomological Conley index does not require finite-dimensional approximations of the vector field. Further directions are discussed.

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Year 2012

• Seiberg-Witten invariants the topological degree and wall crossing formula

  Publication

  • M. Starostka

  - Central European Journal of Mathematics - Year 2012

  Following S. Bauer and M. Furuta we investigate finite dimensional approximations of a monopole map in the case b 1 = 0. We define a certain topological degree which is exactly equal to the Seiberg-Witten invariant. Using homotopy invariance of the topological degree a simple proof of the wall crossing formula is derived.

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