Exact(2)
Let (X, d) be a matric space.
If, in Definition 1.1 we consider ψ(t) = αt, for each t ∈ ℝ+, where α ∈ [0,1), then we get the usual contraction mapping with coefficient α. Proposition 1.2. [1] Let (X, d) be a matric space and f: X→X be a mapping.
Similar(58)
"It's a magic space".
It's a fun space.
"It's a living space".
"There's a narrow space.
It's a sensational space.
"It's a tighter space.
It's a fascinating space.
"It's a social space.
It's a tight space.
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