Problem

Let L be a linear operator on a vector space V. Define Ln, n ≥ 1, recursively by L...

Let L be a linear operator on a vector space V. Define Lⁿ, n ≥ 1, recursively by

L ¹ = L

L ^k ⁺ ¹ ( v ) = L(L^k(v)) for all v ∈ V

Show that Lⁿ is a linear operator on V for each n ≥ 1.

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Solutions For Problems in Chapter 4.1

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