part 2 real analysis Problem 2. Let p be a real number such that 1 < p < ∞ and let q be its conjugate.(i.e.+¹=1).P 91. Let f LP(R). Consider the operator T defined by(Tf)(x) = == f*f(t)dtShow that the operator T is well defined for all x > 0, and the function Tf iscontinuous on ]0,00[ and satisfies|(Tƒ)(x) < x¯||ƒ||p,2. If f, g € LP(R), then|(Tf)(x) - (Tg)(x)| ≤x|fg|₁x>0.3. Let g be a continuous function with compact support in 10, ∞o[. Set G(x)Sg(t)dt.(a) Show that G is of class C¹(R) and that 0 ≤ G(x) < ||9||.+00(b) Deduce that lim (G(x)) = 0 and that fo (G(x)) dx < +∞o.(c) Show that√xG¹(x) (G(x))³-¹ dx + √ (G(x))³ dx = = √ [9(2)| (G(x))³-¹ dx.(d) Deduce thatP = ¹ [~ (G(x))" dx = * \9(2)| (G(x))³-¹ dr.P(e) Use Hölder inequality to deduce that||G||||||, and Tg||p²|||||pp-1p-14. Recall that the space of continuous function with compact support is dense inLP(R). Use the previous parts and apply Fatou's lemma to deduce the Hardyinequality:||Tf|p<_P_||f||p-

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2. If f,g LP(R), then |(Tƒ)(x) − (Tg)(x)| ≤ x¯||ƒ-9||p₁Vx>0.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter4: Polynomial And Rational Functions

Section4.3: Zeros Of Polynomials

Problem 4E

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Question

part 2 real analysis

Problem 2. Let p be a real number such that 1 < p < ∞ and let q be its conjugate.
(i.e.+¹=1).
P 9
1. Let f LP(R). Consider the operator T defined by
(Tf)(x) = == f*f(t)dt
Show that the operator T is well defined for all x > 0, and the function Tf is
continuous on ]0,00[ and satisfies
|(Tƒ)(x) < x¯||ƒ||p,
2. If f, g € LP(R), then
|(Tf)(x) - (Tg)(x)| ≤x|fg|₁x>0.
3. Let g be a continuous function with compact support in 10, ∞o[. Set G(x)
Sg(t)dt.
(a) Show that G is of class C¹(R) and that 0 ≤ G(x) < ||9||.
+00
(b) Deduce that lim (G(x)) = 0 and that fo (G(x)) dx < +∞o.
(c) Show that
√xG¹(x) (G(x))³-¹ dx + √ (G(x))³ dx = = √ [9(2)| (G(x))³-¹ dx.
(d) Deduce that
P = ¹ [~ (G(x))" dx = * \9(2)| (G(x))³-¹ dr.
P
(e) Use Hölder inequality to deduce that
||G||||||, and Tg||p²|||||p
p-1
p-1
4. Recall that the space of continuous function with compact support is dense in
LP(R). Use the previous parts and apply Fatou's lemma to deduce the Hardy
inequality:
||Tf|p<_P_||f||p-

Branch of mathematical analysis that studies real numbers, sequences, and series of real numbers and real functions. The concepts of real analysis underpin calculus and its application to it. It also includes limits, convergence, continuity, and measure theory.

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