Q1 Riemann stieltjes integral "Real analysis by Walton rudin "

Transcribed Image Text:

|Tr()| dt < A(P, y) + 2e(b – a) S A(y) + 28(b – a). Since e was arbitrary, dt < A(y). This completes the proof. 138 PRINCIPLES OF MATHEMATICAL ANALYSIS EYERCISES 1. Suppose a increases on [a, b), asxo sb, a is continuous at xo, f(xo)=1, and f(x) = 0 if x xo. Prove that fe R(x) and that f da = 0. 2. Suppose f20, f is continuous on [a, b], and f(x) dx = 0. Prove that f(x) =0 for all x e [a, b). (Compare this with Exercise 1.) 3. Define three functions B1, B2, B3 as follows: B,(x) = 0 if x<0, B,(x) =1 if x>0 for j= 1, 2, 3; and B,(0) = 0, B2(0) =1, B3(0) = 1. Let ƒ be a bounded function on (-1, 1]. (a) Prove that fe R(B,) if and only if f(0+) = f(0) and that then =f(0 (b) State and prove a similar result for B2. (c) Prove that fe R(B,) if and only if f is continuous at 0. (d) If f is continuous at 0 prove that 4. If f(x) = 0 for all irrational x, f(x) = 1 for all rational x, prove that f¢ R on[a, b} for any a <b. 5. Suppose f is a bounded real function on [a, b], and f' e R on [a, b]. Does it follow that fe R? Does the answer change if we assume that f'e R? 6. Let P be the Cantor set constructed in Sec. 2.44. Let f be a bounded real function on (0, 1] which is continuous at every point outside P. Prove that fe R on [0, 1]. Hint: P can be covered by finitely many segments whose total length can be made as small as desired. Proceed as in Theorem 6.10. 7. Suppose f is a real function on (0, 1] and fe R on [c, 1] for every c>0. Define ((x) dx= lim fx) dx c+0 Je if this limit exists (and is finite). (a) If fe R on [0, 1), show that this definition of the integral agrees with the old one. (b) Construct a function f such that the above limit exists, although it fails to exist with | f| in place of f. 8. Suppose fe R on [a, b) for every b>a where a is fixed. Define ( f(x) dx= lim if this limit exists (and is finite). In that case, we say that the integral on the left converges. If it also converges after f has been replaced by f, it is said to con- verge absolutely. THE RIEMANN-STIELTJES INTEGRAL 139 Assume that f(x) 20 and that f decreases monotonically on [1, 0). Prove that