MATH 11158 : Optimization Methods in Finance

2025-04-03 Admin 写评论

Hello, if you have any need, please feel free to consult us, this is my wechat: wx91due

MATH 11158 : Optimization Methods in Finance
Assignment 2

Due: 14 April, 2025, 4pm

Question 1 (Sortino ratio, (10 marks) ). Consider a portfolio selection problem where feasible portfolios are required to belong to a compact convex set X ⊂ R n. Furthermore, the portfolios are also required to achieve an expected return of at least the target return rate R. Let ST R∗ denote the maximum Sortino ratio of all such portfolios.

Show how you can compute a lower bound on ST R∗ by solving a convex optimization problem. Clearly justify why the problem you are solving is convex.

Question 2 ( (10 marks) ). Suppose that the asset returns vector r ∈ R n + follows a discrete distribution with its values in N scenarios given by {r(ω1), r(ω2), . . . , r(ωN )} whose probabilities are p1, p2, . . . , pN . Let R > 0 and β ∈ (0, 1) be given parameters.

For the questions below, your formulations should be in a tractable form so that they can be

input to some optimization solver and you cannot use any parameters other than those given above.
1. Formulate the constraint that the probability that the portfolio return is greater than R is at least β. (5 marks)

2. Formulate the problem of finding the optimal portfolio that minimises the probability that the portfolio return is less than or equal to R.

Hint: You may find useful the fact from optimization that minimising any function f(x) is equivalent to adding a new variable t and minimising t subject to the constraint that f(x) ≤ t.

Question 3 (Semidefinite relaxations, (20 marks) ). Consider the 4th question from Tutorial 4. All else being the same, modify the requirement that instead of investing in at least 4 securities you must now invest in at most 4 securities.

1. Provide 3 semidefinite relaxations of this problem. (6 marks)
2. Solve the above SDPs and compare their bounds for different target returns. (4 marks)
3. Devise a heuristic method that uses any of the semidefinite solutions to obtain a feasible portfolio. (5 marks)
4. Apply your heuristic to the three SDPs and compare the portfolios that you get. (5 marks)

Question 4 ( (15 marks) ). Consider the Markowtiz tradeoff model with risk-aversion δ > 0,

Here, Σ is a given covariance matrix, but the mean returns µ is an uncertain parameter.

1. Assume X = {x: P i xi = 1}. Prove that f(µ) is a convex quadratic function. (8 marks) Hint : You might find useful the Lagrange method of multipliers that we used while analysing the global minimum variance portfolio in Markowitz theory.
2. Let U denote the uncertainty set for µ. Formulate the robust optimization version of the above model with arbitrary X. (2 marks)
3. Assume U is a finite set given by U = {µ 1 , µ2 , . . . , µk}. Prove that computing the optimal value of the robust model is maximising a concave function over X, and hence a convex optimization problem if X is convex. (5 marks)

Question 5 (Portfolio computations, (15 marks) ). TBD on Tuesday 1st April at noon.

发表评论

电子邮件地址不会被公开。 必填项已用*标注