construct an example of sequence of functions that the family of such function is uniformly bounded...

(fn) is a sequence of entire functions, which converges uniformly to an entire function f on...

(fn) is a sequence of entire functions, which converges uniformly to an entire function f on every compact subset K of C, and f is not identically zero. prove that if fn only have real roots, then f only has real roots too.

Suppose (an) is an increasing sequence of real numbers. Show, if (an) has a bounded subsequence,...

Suppose (an) is an increasing sequence of real numbers. Show, if (an) has a bounded subsequence, then (an) converges; and (an) diverges to infinity if and only if (an) has an unbounded subsequence.

Complex Analysis Give a sequence of real functions differentiable on an interval which converges uniformly to...

Complex Analysis Give a sequence of real functions differentiable on an interval which converges uniformly to a nondifferentiable function.

show that a sequence of measurable functions (fn) converges in measure if and only if every...

show that a sequence of measurable functions (fn) converges in measure if and only if every subsequence of (fn) has subsequence that converges in measure

If a bounded sequence is the sum of a monotone increasing and a monotone decreasing sequence...

If a bounded sequence is the sum of a monotone increasing and a monotone decreasing sequence (xn = yn + zn where {yn} is monotone increasing and { zn} is monotone decreasing) does it follow that the sequence converges? What if {yn} and {zn} are bounded?

Let f be a bounded measurable function on E. Show that there are sequences of simple...

Let f be a bounded measurable function on E. Show that there are sequences of simple functions on E, {(pn) and {cn}, such that {(pn} is increasing and {cn} is decreasing and each of these sequences converges to f uniformly on E.

Prove Corollary 4.22: A set of real numbers E is closed and bounded if and only...

Prove Corollary 4.22: A set of real numbers E is closed and bounded if and only if every infinite subset of E has a point of accumulation that belongs to E. Use Theorem 4.21: [Bolzano-Weierstrass Property] A set of real numbers is closed and bounded if and only if every sequence of points chosen from the set has a subsequence that converges to a point that belongs to E. Must use Theorem 4.21 to prove Corollary 4.22 and there should...

Real analysis conception If the sequence of function fn is continuous, does that means its subsequence...

Real analysis conception If the sequence of function fn is continuous, does that means its subsequence fnk is also continuous? if the sequence of function gn is equicontinuous , does that mean the subsequence gnk is equicontinuous?

Find an example of a sequence, {xn}, that does not converge, but has a convergent subsequence....

Find an example of a sequence, {xn}, that does not converge, but has a convergent subsequence. Explain why {xn} (the divergent sequence) must have an infinite number of convergent subsequences.

Suppose A is bounded and not compact. Prove that there is a function that is continuous...

Suppose A is bounded and not compact. Prove that there is a function that is continuous on A, but not uniformly continuous. Give an example of a set that is not compact, but every function continuous on that set is uniformly continuous.