Your search keyword '"Field extension"' showing total 4 results

1. On a general bilinear functional equation.

Author

Bahyrycz, Anna and Sikorska, Justyna

Subjects

*FUNCTIONAL equations, *VECTOR spaces, *LINEAR equations, *ADDITIVE functions, *BILINEAR forms

Abstract

Let X, Y be linear spaces over a field K . Assume that f : X 2 → Y satisfies the general linear equation with respect to the first and with respect to the second variables, that is, for all x , x i , y , y i ∈ X and with a i , b i ∈ K \ { 0 } , A i , B i ∈ K ( i ∈ { 1 , 2 } ). It is easy to see that such a function satisfies the functional equation for all x i , y i ∈ X ( i ∈ { 1 , 2 } ), where C 1 : = A 1 B 1 , C 2 : = A 1 B 2 , C 3 : = A 2 B 1 , C 4 : = A 2 B 2 . We describe the form of solutions and study relations between (∗) and (∗ ∗) . [ABSTRACT FROM AUTHOR]

Published

2021

2. Algebraic theory of difference equations and Mahler functions

Author

Seiji Nishioka and Kumiko Nishioka

Subjects

Function field of an algebraic variety, Applied Mathematics, General Mathematics, Type (model theory), Difference algebra, Valuation ring, Algebra, Mathematics::K-Theory and Homology, Field extension, Algebraic theory, Real algebraic geometry, Discrete Mathematics and Combinatorics, Algebraic independence, Mathematics

Abstract

Algebraic independence of certain Mahler functions constructed from Rudin–Schapiro sequences and Baum–Sweet sequences is proved, using difference Riccati equations and the notion of difference field extension of valuation ring type.

Published

2012

3. On the geometry of field extensions

Author

Hans Havlicek

Subjects

Chain (algebraic topology), Field extension, Simple (abstract algebra), Transversal (combinatorics), Applied Mathematics, General Mathematics, Discrete Mathematics and Combinatorics, Geometry, Mathematics

Abstract

We investigate the spread arising from a field extension and its chains. The major tool in this paper is the concept of transversal lines of a chain which is closely related to the Cartan—Brauer—Hua theorem. Provided that one chain has a “sufficiently large” number of such lines, both this chain and the given spread permit a simple geometric description by means of collineations.

Published

1993

4. On the structure of homothetic functions

Author

Juan Carlos Candeal and Esteban Indurain

Subjects

Pure mathematics, Applied Mathematics, General Mathematics, Mathematical analysis, Homogeneous function, Structure (category theory), Function (mathematics), Extension (predicate logic), Term (logic), Homothetic transformation, symbols.namesake, Homogeneous differential equation, Field extension, symbols, Discrete Mathematics and Combinatorics, Mathematics

Abstract

“Homothetic function” is a term which refers to some extension of the concept of a homogeneous function. We study different hierarchies of generalized homogeneous functions. The main result is a general classification of those functions.

Published

1993