Derivative of Map of Banach algebra

Abstract

Let A be Banach algebra over commutative ring D. The map f:A→ A\ is called differentiable in the Gateaux sense, if f(x+a)-f(x)=∂ f(x) a+o(a) where the Gateaux derivative ∂ f(x) of map f is linear map of increment a and o is such continuous map that a→ 0|o(a)||a|=0 Assuming that we defined the Gateaux derivative ∂n-1 f(x) of order n-1, we define ∂n f(x)(a1... an) =∂(∂n-1 f(x)(a1... an-1)) an the Gateaux derivative of order n of map f. Since the map f(x) has all derivatives, then the map f(x) has Taylor series expansion f(x)=Σn=0∞(n!)-1∂n f(x0)(x-x0)n