Utvidet returrett til 31. januar 2025

Fixed Point Theory and Its Related Topics II

av TBD
Om Fixed Point Theory and Its Related Topics II

Fixed point theory arose from the Banach contraction principle and has been studied for a long time. Its application mostly relies on the existence of solutions to mathematical problems that are formulated from economics and engineering. After the existence of solutions is guaranteed, the numerical methodology will be established to obtain the approximated solution. Fixed points of function depend heavily on the considered spaces that are defined using the intuitive axioms. In particular, variant metrics spaces are proposed, like a partial metric space, b-metric space, fuzzy metric space and probabilistic metric space, etc. Different spaces will result in different types of fixed point theorems. In other words, there are a lot of different types of fixed point theorems in the literature. Therefore, this Special Issue welcomes survey articles. Articles that unify the different types of fixed point theorems are also very welcome. The topics of this Special Issue include the following: Fixed point theorems in metric space Fixed point theorems in fuzzy metric space Fixed point theorems in probabilistic metric space Fixed point theorems of set-valued functions in various spaces The existence of solutions in game theory The existence of solutions for equilibrium problems The existence of solutions of differential equations The existence of solutions of integral equations Numerical methods for obtaining the approximated fixed points

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  • Språk:
  • Engelsk
  • ISBN:
  • 9783036521732
  • Bindende:
  • Hardback
  • Sider:
  • 182
  • Utgitt:
  • 11. oktober 2021
  • Dimensjoner:
  • 170x244x16 mm.
  • Vekt:
  • 594 g.
  • BLACK NOVEMBER
  Gratis frakt
Leveringstid: 2-4 uker
Forventet levering: 27. desember 2024
Utvidet returrett til 31. januar 2025

Beskrivelse av Fixed Point Theory and Its Related Topics II

Fixed point theory arose from the Banach contraction principle and has been studied for a long time. Its application mostly relies on the existence of solutions to mathematical problems that are formulated from economics and engineering. After the existence of solutions is guaranteed, the numerical methodology will be established to obtain the approximated solution. Fixed points of function depend heavily on the considered spaces that are defined using the intuitive axioms. In particular, variant metrics spaces are proposed, like a partial metric space, b-metric space, fuzzy metric space and probabilistic metric space, etc. Different spaces will result in different types of fixed point theorems. In other words, there are a lot of different types of fixed point theorems in the literature. Therefore, this Special Issue welcomes survey articles. Articles that unify the different types of fixed point theorems are also very welcome. The topics of this Special Issue include the following:

Fixed point theorems in metric space
Fixed point theorems in fuzzy metric space
Fixed point theorems in probabilistic metric space
Fixed point theorems of set-valued functions in various spaces
The existence of solutions in game theory
The existence of solutions for equilibrium problems
The existence of solutions of differential equations
The existence of solutions of integral equations
Numerical methods for obtaining the approximated fixed points

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