Stability of normal regions for linear homogenous functional equations.
Marek Czerni (1988)
Aequationes mathematicae
Similarity:
Displaying similar documents to “On the ...-stability of functional differential equations.”
Stability of normal regions for linear homogenous functional equations.
Remarks on stability of functional equations.
Piotr W. Cholewa (1983)
Aequationes mathematicae
Similarity:
Remarks on the stability of functional equations.
Piotr W. Cholewa (1984)
Aequationes mathematicae
Similarity:
Further results on stability of normal regionas for linear homogeneous functional equations.
M. Czerni (1995)
Aequationes mathematicae
Similarity:
Further results on stability of normal regions for linear homogeneous functional equations. (Summary).
M. Czerni (1994)
Aequationes mathematicae
Similarity:
De Rham systems and the solution of a class of functional equations.
G. Mayor, J. Torrens (1994)
Aequationes mathematicae
Similarity:
On the stability of the functional equation of the first order
Erwin Turdza (1970)
Annales Polonici Mathematici
Similarity:
Stability of General Systems of Linear Equations
V. PEREYRA (1969)
Aequationes mathematicae
Similarity:
Some recent applications of functional equations to the social and behavioral sciences. Further problems.
J. Aczél (1995)
Aequationes mathematicae
Similarity:
On the stability of a functional equation related to associativity
Claudi Alsina (1991)
Annales Polonici Mathematici
Similarity:
Stability in some rarefaction models
P. M. Peruničić (1989)
Matematički Vesnik
Similarity:
On the Normal Stability of Functional Equations
Zenon Moszner (2016)
Annales Mathematicae Silesianae
Similarity:
In the paper two types of stability and of b-stability of functional equations are distinguished.
On the inverse stability of functional equations
Zenon Moszner (2013)
Banach Center Publications
Similarity:
The inverse stability of functional equations is considered, i.e. when the function, approximating a solution of the equation, is an approximate solution of this equation.