Question

Let V = Cº(R) be the vector space of infinitely differentiable real valued functions on the real line. Let D: V → V be the differentiation operator, i.e. D(f(x)) = f'(x). Let Eq:V → V be the operator defined by Ea(f(x)) = eax f(x), where a is a real number. a) Show that E, is invertible with inverse E-a: b) Show that (D – a)E, = E,D and deduce that for n a positive integer, (D – a)" = E,D" Ea!! c) Using b), find a basis for null((D – a)")).

Answer 1

A Let Di V V be the differentiation openaden ie D (f(x)) = f(x) Let Ea : vor by Ea (fcx)) = earfix), A EIR la let fox) ET Now (Eat-a) (fix) - Ea (E-alf(u)) = Ea le ax f(x)) = care le or fox) = f(x) - Ea Ea = IV ( Ir be the identity element intr- and Ea Ea) (f(x)) = E-a (Ealf(x)) = E-a (eax fix)) = car at f(x) = f(x) E-a Ea. = lr. Hence EE-a = E-a Ea= tr. So Ea is inventible with inverse Ea. Hence

. an lov 0 Koo ((-ate) (Pm) = (D-a) (Ea(for) = (D-a) (ear fors) = Dlear f(x)) - a ex fix) = a ex fex) + earfix) - a efox) = ar fix) = x D ( f(x)} = Ealo (fine) = (EaD) (f(x) : (0-a) Ea = EaD. Therefore the statement is troue fora nzli Suppose the n=mxl ie statement is true fins (o-ajm - Ea on Ea mil. Now (D-ajha Pow) = (0-a) (0%-a)"( fin) = 10-a) (EXOMET

ie Now mul (D-ajh Ea - EaDr. ml. ((0-aght Ea) (f(x)) = (D-a) (D-a)"(Ea (fix)) = (D-a)( Ea D" fx))) by (1) = (D-a) (Ea (f" (x) = (0-0) | ear f"x) - a cx fix) 0 + = Ea cont ( f(x)) = Ea om +1 ( f(x)) (0-aj m+ Ea = Ea pont a) (D-ajm+ Ea = Ea pintl El Therefore the statement is true foro nam+1, mil. By principle of induction method

1 (D-a)" - Ear Ea a positive integers n. (C) Let fra) e Mall (0-ajn) then Ea Dr Ea) (fix)) = 0 =) Ea on lear fond) = 0 Eah flu cake for in a car са С -an + (-1) an} = 0 => f'x) = 4, f'om et ny, f'ch, az

Let put for me then the ausilany equation is m" - emla + .+ (-8)" an ao m = a Hence fix) = gean e, is a constant. Therefore 'Null (D-a)n = Leary Hence the basis of rull (D-ajn is 1 X L • R , ae IR