Let ?(?) be convex in ??. Fix ?2, . . . , ?? and consider the...

About convex function: Please show that f(x) = 1/2·xTQx+aTx is a convex function if and only...

About convex function: Please show that f(x) = 1/2·xTQx+aTx is a convex function if and only if Q is positive semi-definite.

Prove that (Orbit-Stabilizer Theorem). Let G act on a finite set X and fix an x...

Prove that (Orbit-Stabilizer Theorem). Let G act on a finite set X and fix an x ∈ X. Then |Orb(x)| = [G : Gx] (the index of Gx).

Show that every increasing convex function of a convex function is convex.

Show that every increasing convex function of a convex function is convex.

Fix a positive real number c, and let S = (−c, c) ⊆ R. Consider the...

Fix a positive real number c, and let S = (−c, c) ⊆ R. Consider the formula x ∗ y :=(x + y)/(1 + xy/c^2). (a)Show that this formula gives a well-defined binary operation on S (I think it is equivalent to say that show the domain of x*y is in (-c,c), but i dont know how to prove that) (b)this operation makes (S, ∗) into an abelian group. (I have already solved this, you can just ignore) (c)Explain why...

Given two convex functions ( f(x) and g(x) ) and two parameters α and β satisfying...

Given two convex functions ( f(x) and g(x) ) and two parameters α and β satisfying α+β=1. (a) The function αf(x)+βg(x) is convex (b) The function αf(x)-βg(x) is convex (c) The function αf(x)-βg(x) is convex when g(x) is linear (d) None of the above statements is correct

let's fix a positive integer n. for a nonnegative integer k, let ak be the number...

let's fix a positive integer n. for a nonnegative integer k, let ak be the number of ways to distribute k indistinguishable balls into n distinguishable bins so that an even number of balls are placed in each bin (allowing empty bins). The generating function for sequence ak is given as 1/F(x). Find F(x).

About convex function: (1) Please show that f(x) = ax2 + bx + c is a...

About convex function: (1) Please show that f(x) = ax2 + bx + c is a convex function if and only if a ≥ 0. (2) Please show that f(x) = 1/2·xTQx+aTx is a convex function if and only if Q is positive semi-definite.

Let L = span{(2,1)} + {(4,0)}, and let S be the set of convex linear combinations...

Let L = span{(2,1)} + {(4,0)}, and let S be the set of convex linear combinations of (2,1) and (4,2). For vector v = (1,0), find (a) projLv (b) projSv

Explain and define. Explain and define the difference between a convex set, a convex function, and...

Explain and define. Explain and define the difference between a convex set, a convex function, and a convex preference. How should the utility function be if the preferences are convex?

Let there be two goods; coco puffs and grits. Assume that the preferences satisfy basic axioms...

Let there be two goods; coco puffs and grits. Assume that the preferences satisfy basic axioms and assumptions and they can be represented by the utility function u(x1,x2)= x1x2. Consider two bundles X= (1,20) and Y=(10,2). Which one do you prefer? Use bundles X and Y to illustrate that these tastes are in fact convex. What is the MRS at bundles X and Y respectively? Now consider tastes that are instead defined by the function u(x1,x2) = x1^2 + x2^2...