Elliptic functional differential equations with incommensurable contractions
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Publication:4607610
DOI10.1051/mmnp/2017075zbMath1386.35066OpenAlexW2783110553MaRDI QIDQ4607610
Publication date: 14 March 2018
Published in: Mathematical Modelling of Natural Phenomena (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1051/mmnp/2017075
elliptic problemsfunctional differential equations with contracted argumentsincommensurable contractions
Boundary value problems for second-order elliptic equations (35J25) Second-order elliptic equations (35J15)
Related Items (9)
Functional-differential equations with dilation and symmetry ⋮ Method of monotone solutions for reaction-diffusion equations ⋮ Strongly elliptic differential-difference equations with mixed boundary conditions in a bounded domain ⋮ On the Dirichlet problem for an elliptic functional differential equation with affine transformations of the argument ⋮ The spectral radius of a certain parametric family of functional operators ⋮ Spectral radius formula for a parametric family of functional operators ⋮ Nonlocal problems and functional-differential equations: theoretical aspects and applications to mathematical modelling ⋮ On smooth solutions of differential-difference equations with incommensurable shifts of arguments ⋮ Elliptic functional differential equation with affine transformations
Cites Work
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- Elliptic dilation-contraction problems on manifolds with boundary. \(C^*\)-theory
- The first boundary value problem for strongly elliptic differential- difference equations
- Coerciveness of functional-differential equations
- Elliptic functional differential equations with contractions and extensions of independent variables of the unknown function
- Boundary-value problems for elliptic functional-differential equations and their applications
- A functional differential equation arising in modelling of cell growth
- One-Parameter Semigroups for Linear Evolution Equations
- Bifurcation of periodic solutions for nonlinear parabolic functional differential equations arising in optoelectronics
- The functional-differential equation $y'\left( x \right) = ay\left( {\lambda x} \right) + by\left( x \right)$
- Elliptic functional differential equations and applications
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