Some Newly Defined Sequence Spaces Using Regular Matrix of Fibonacci Numbers
The main purpose of this paper is to introduce the new sequence spaces (F), c(F) and (F) based on the newly defined regular matrix F of Fibonacci numbers. We study some basic topological and algebraic properties of these spaces. Also we investigate the relations related to these spaces. Let w be the space of all real sequences. Any vector subspace of w is called a sequence space. We shall write c, and for the sequence spaces of all convergent, null and bounded sequences. Let X, Y be two sequence spaces and A = ( ) be an infinite matrix of real numbers , where n, k N.Then, A defines a matrix mapping ( Debnath and Debnath, communicated; Malkowsky and Rakocevic, 2007) from X into Y and we denote it by A : X Y, if for every sequence x= ( ) X, the sequence Ax = { (x)+ , the A-transform of x, is in Y; where (x) = ∑ , (n N)
Some Newly Defined Sequence Spaces Using Regular Matrix of Fibonacci Numbers
The main purpose of this paper is to introduce the new sequence spaces (F), c(F) and (F) based on the newly defined regular matrix F of Fibonacci numbers. We study some basic topological and algebraic properties of these spaces. Also we investigate the relations related to these spaces. Let w be the space of all real sequences. Any vector subspace of w is called a sequence space. We shall write c, and for the sequence spaces of all convergent, null and bounded sequences. Let X, Y be two sequence spaces and A = ( ) be an infinite matrix of real numbers , where n, k N.Then, A defines a matrix mapping ( Debnath and Debnath, communicated; Malkowsky and Rakocevic, 2007) from X into Y and we denote it by A : X Y, if for every sequence x= ( ) X, the sequence Ax = { (x)+ , the A-transform of x, is in Y; where (x) = ∑ , (n N)
Keywords:
Fibonacci Number, Regular Matrix, Sequence Space,
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- Yayın Aralığı: Yılda 6 Sayı
- Başlangıç: 2015
- Yayıncı: AFYON KOCATEPE ÜNİVERSİTESİ
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