Invariant elastic constants of anisotropic solids

Zibel, Ali Cumhur


Invariant densities and mean ergodicity of Markov operators
Emelyanov, Eduard (2003-01-01)
We prove that a, Markov operator T on L-1 has an invariant density if and only if there exists a density f that satisfies lim sup(n-->infinity) parallel toT(n) f-fparallel to infinity) parallel toP(n)f - wparallel to < 2 for every density f. Corresponding results hold for strongly continuous semigroups.
Invariant reduction of partially potential branching equations and iterative methods in the problem on a bifurcation point with a symmetry
Karasözen, Bülent (2004-03-01)
Invariant subspaces of collectively compact sets of linear operators
Alpay, Safak; Misirlioglu, Tunc (Springer Science and Business Media LLC, 2008-01-01)
In this paper, we first give some invariant subspace results for collectively compact sets of operators in connection with the joint spectral radius of these sets. We then prove that any collectively compact set M in alg Gamma satisfies Berger-Wang formula, where Gamma is a complete chain of subspaces of X.
Invariant homomorphisms of nonstandard enlargements of Boolean algebras and vector lattices
Emelyanov, Eduard (1997-03-01)
Invariant Metrics and Squeezing Functions on Bounded Domains
Ökten, Ahmed Yekta; Yazıcı, Özcan; Department of Mathematics (2021-8)
In this thesis we will study the biholomorphically invariant objects called squeezing functions. They are closely releated to invariant metrics on bounded domains and describe how much a domain looks like the unit ball looking on a fixed point. In the main part of this thesis, we will give our results on squeezing functions on planar domains. In particular, our main result provides an alternative proof for the explicit formulas of squeezing functions on annuli. Also, we survey results on boundary behaviour ...
Citation Formats
A. C. Zibel, “Invariant elastic constants of anisotropic solids,” Middle East Technical University, 1988.