Nilakshi Goswami scite author profile

For two real Banach algebras $\mathbb{A}_1$ and $\mathbb{A}_2$, let $K_p$ be the projective cone in $\mathbb{A}_1\otimes_\gamma \mathbb{A}_2$. Using this we define a cone norm on the algebraic tensor product of two vector spaces over the Banach algebra $\mathbb{A}_1\otimes_\gamma \mathbb{A}_2$ and discuss some properties. We derive some fixed point theorems in this projective cone normed tensor product space over Banach algebra with a suitable example. For two self mappings $S$ and $T$ on a cone Banach space over Banach algebra, the stability of the iteration scheme $x_{2n+1}=Sx_{2n}$, $x_{2n+2}=Tx_{2n+1},\;n=0,1,2,...$ converging to the common fixed point of $S$ and $T$ is also discussed here.

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Some Fixed Point Theorems on the Sum and Product of Operators in Tensor Product Spaces

Das¹,

Goswami²

2016

Int. J. of Pure and Appl. Math.

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mapping on P ⊗Q. Using T1 and T2 we define a self mapping T on X ⊗γ Y . Different conditions under which T + T S + S has a fixed point in P ⊗ Q are established here. Analogous results are also established taking the pair (T1, T2) as (k, k / ) contraction mappings. Again considering X ⊗γ Y as a reflexive Banach space. We derive the conditions for 1 m (T + ST + S), m > 2, m ∈ N, for having a fixed point in P ⊗ Q. Some iteration schemes converging to a fixed point of T + ST + S in P ⊗ Q are also presented here.

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Nilakshi Goswami

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