University of Hyderabad (UoH) 2008 Ph.D Maths , Entrance , (Mathematics/Applied Mathematics) - Question Paper

University of Hyderabad,

Entrance Examination, 2008 Ph.D. (Mathematics/Applied Mathematics)

Hall Ticket No.

_ Answer Part A by circling the

Time: 2 hours    Max. Marks: 75 ^{correct letter in the arr}a^{y below;}

Part A: 25 Marks Part B: 50 Marks	1	a	b	c	d
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Instructions 1.    Calculators are not allowed. 2.    Part A carries 25 marks. Each correct answer carries 1 mark and each wrong answer carries minus one third mark. So do not gamble. If you want to change any answer, cross out the old one and circle the new one. Over written answers will be ignored. 3.    Part B carries 50 marks. Instructions for answering Part B are given at the beginning of Part B. 4.    Do not detach any pages from this answer book. It contains 15 pages in addition to this top page. Pages 14 and 15 are for rough work.	4	a	b	c	d
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1.    Let f : R R be a function given by f (x) = min(1, x,x³). Then

(a)    f is continuous but not differentiable on R.

(b)    f is continuous and differentiable on R.

(c)    f is not continuous but differentiable on R.

(d)    f is neither continuous nor differentiable on R.

2.    Let G be an infinite cyclic group. If f is an automorphism of G, then

(a)    fⁿ = Id_G for any n E N.

(b)    f² = Id_G.

^(c)    f = ^IdG.

(d)    there exists an n E N such that f (x) = xⁿ, for all x E G.

3.    Let G be a group of order 10 . Then

(a)    G is an abelian group.

(b)    G is a cyclic group.

(c)    there is a normal proper subgroup.

(d)    there is a subgroup of order 5 which is not normal.

4.    For each a E I, let X_a be a non-empty topological space such that the product space JX_a is locally compact. Then

(a)    X_a must be compact except for finitely many a.

(b)    X_a must be a singleton except for finitely many a.

(c)    each X_a must be compact.

(d)    the indexing set I must be countable.

5.    Let f : R R be a function. Then the set {x E R : f is continuous at x} is always

6.    Let A = R x R and B = Q x Q. Two distinct points in A \ B can be joined together within A \ B

(a)    always by a line segment.

(b)    always by a smooth path.

(c)    not always by a smooth path but always by a continuous path.

(d)    cannot be joined together always by a continuous path.

7.    Let G be a group of order 255. Then

(a)    the number of Sylow - 3 subgroups cannot be more than 1.

(b)    the number of Sylow - 11 subgroups is at least 1.

(c)    the number of Sylow - 3 subgroups is 1 or 85.

(d)    the number of Sylow - 5 subgroups is 51.

0 0-1

(b) \X 1\ < 1.

(d) \X 1\ < 2.

10.    For the ordinary differential equation sin(x)y"(x) + y'(x) + y(x) = 0,

(a)    every point is an ordinary point.

(b)    every point is a singular point.

(c)    x = nn is a regular singular point.

(d)    x = nn is an irregular singular point.

11.    If in a group, an element a has order 65, then the order of a²⁵ is

(a) 5.    (b) 12.    (c) 13.    (d) 65.

12.    The number of subfields of F₂27 (distinct from F₂27 itself) is

(a) 1.    (b) 2.    (c) 3.    (d) 4.

13.    The number of Jordan canonical forms for a 5 x 5 matrix with minimal polynomial (x 2)²(x 3) is

(a) 1.    (b) 2.    (c) 3.    (d) 4.

14.    The number of degrees of freedom of a rigid cube moving in space is

(a) 1.    (b) 3.    (c) 5.    (d) 6.

15.    Let A C R be a measurable set. Then

(a)    If A is dense then the Lebesgue measure of A is positive.

(b)    If the Lebesgue measure of A is zero then A is nowhere dense.

(c)    If the Lebesgue measure of A is positive then A contains a nontrivial interval.

(d)    All of (a), (b), (c) are false.

16.    The equation u_xx + x²u_yy = 0 is

(a)    elliptic.

(b)    elliptic everywhere except on x = 0 axis.

(c)    hyperbolic.

(d)    hyperbolic everywhere except on x = 0 axis.

17.    The solution of the Laplace equation in spherical polar co-ordinates (r,9,$) is

(a) log(r).    (b) r.    (c) 1/r.    (d) r and 1/r.

18.    A particle moves in a circular orbit in a force field F(r) = K/r², (K > 0). If K decreases to half its original value then the particle's orbit

(a) is unchanged.    (b) becomes parabolic.

(c) becomes elliptic.    (d) becomes hyperbolic.

19.    Let T : X Y be a linear map between normed spaces over C. Then the minimum requirement ensuring the continuity of T is

(a)X is finite dimensional.    (b)X and Y are finite dimensional.

(c) Y = C.    (d) Y is finite dimensional.

20.    Let H be a Hilbert space. Which of the following is true?

(a)    H is always separable.

(b)    If H has an orthogonal Schauder basis, then H is separable.

(c)    If H is separable, then H is locally compact.

(d)    If H has a countable Hamel basis, then H is finite dimensional.

21.    For each n E N, let f_n : [0,1] [0,1] be a continuous function and let f : [0,1] [0.1] be defined as f (x) = lim sup f_n(x). Then

(a)    f is continuous and measurable.

(b)    f is continuous but need not be measurable.

(c)    f is measurable but need not be continuous.

(d)    f need not be either continuous or measurable.

22.    Let f,g : C C be holomorphic and let A = {x E R : f (x) = g(x)} . The minimum requirement for the equality f = g is

(a) A is uncountable.    (b) A has a positive Lebesgue measure.

(c) A contains a nontrivial interval.    (d) A = R.

23.    The critical point of the system x'(t) = y + x², y'(t) = x is

(a) a stable center.    (b) unstable.

(c) an asymptotically stable node.    (d) an asymptotically stable spiral.

24.    An example of a subset of N which intersects every set of form {a + nd : n E N},

a,d E N, is

(a) {2k : k E N}.    (b) {k² : k E N}.

(c) {k + k! : k E N}.    (d) {k + k² : k E N}.

p 2n

25.    The characteristic number of the integral equation 0(x) XI sin(x) sin(t)0(t) dt = 0

J 0

^(a) *-. ^{(b) (c) 2n}. 2-.

n    2n

1. Let f be a map from R to R such that f (a + b) = f (a)f (b). If f = 0 and it is continuous at 0 then show that there exists a nonzero c E R such that f (x) = c^x for all x E R.

2. Give an entire function whose image omits only the value 2n. Also find a Mobius map whose only fixed point is 2n.

3. Let f (z) = z⁶5z⁵+2z⁴+1 and K = {z E C : \z 2i\ < 1} . Show that min {\f (z)\ : z E K} is attained at some point on the boundary of K.

4. Let f : W R³ be a linear transformation given by f (Aii + X₂v₂) = (Ai, X₂, 0) where W is the space generated by the vectors v₁ = (1,1, 1) and v₂ = (1, 1,1). Describe how you would extend f to R³ so that the determinant of f is 1. Define such an extended f.

5. Consider the Banach space ₁ of all complex sequences {a_n} such that \&n\ < ro

n=1

with the norm \\ {a_n} \\₁ = \a_n\. Let {A_n} be a sequence of complex numbers such

n=1

that {A_na_n} G ₁ for all {a_n} G ₁. Define T : _{1 1} by T ({a_n}) = {A_na_n}. If T is a bounded linear operator on ₁ then show that {A_n} is bounded. In this case what will be the value of \ \T\\?

th

6. Determine the smallest m such that the field with 5^m elements has a primitive 12^th root of 1.

7. Let A = {a E R | aa² + ba + c =0 for some integers a, b, c}. Then prove that A is a countably infinite set.

8. Let R^N be the set of all sequences of real numbers. Two members (a_n) and (b_n) are said to be asymptotic if limsup(|a_n b_n|) = 0; they are said to be proximal if

liminf(|a_n b_n|) = 0. Prove that asymptoticity is an equivalence relation on R^N where

n<x>

as proximality is not. Give an example of a proximal pair that is not asymptotic.

9. Define a topology T on R by declaring a subset U C R to be open if U = 0 or 0 E U. Describe all finite subsets of R which are dense in (R, T). Give a basis of (R, T) each of whose element is a finite set.

10. Let f : R R be a differentiable function with a bounded derivative. Define

fn(x) = f (x + ). Show that f_n converges uniformly on R to f.

V n

11. Let f_n (x) = xⁿ for 0 < x < 1. Find the pointwise limit f of the sequence {f_n}. Prove that lim / f_n(x) dx = f (x) dx. Is the convergence uniform?

n

'0    Jo

12. Find the extremal of the functional J[y] = I ( x + 2y + ) dx, y(0) = 0, y(1) = 0.

Also test for extrema.

13. Construct the Greens function for the boundary value problem y" + y = 0 subject to the boundary conditions y(0) + y'(n) = 0, y'(0) y(n) = 0.

14. Find the complete integral of p²q² + x²y² = x²q²(x² + y²).

p2n

15. Solve the integral equation 0(x) A \x t\ sin(x)0(t) dt = x.

Rough Work

Attachment: university-of-hyderabad--uoh--2008-ph-d-maths-41653-1.pdf

Earning:   Approval pending.