MULTI-PERIOD MEANâVARIANCE PORTFOLIO OPTIMIZATION BASED ON MONTE-CARLO SIMULATION
Mean-variance optimization or usually known as the Markowitz portfolio model was a cornerstone of modern portfolio theory. This model helped investors create mathematically optimal portfolios. Generally, the Markowitz portfolio model provided investors with an optimal portfolio for a single time...
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id-itb.:743482023-07-10T15:42:59ZMULTI-PERIOD MEANâVARIANCE PORTFOLIO OPTIMIZATION BASED ON MONTE-CARLO SIMULATION Naufal Daffa Andarwan, Muhammad Indonesia Final Project Portfolio optimization, multi-period, forward method, pre-commitment method, multi-stage strategy method, Kurish-Kuhn-Tucker (KKT) method, Monte- Carlo simulation. INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/74348 Mean-variance optimization or usually known as the Markowitz portfolio model was a cornerstone of modern portfolio theory. This model helped investors create mathematically optimal portfolios. Generally, the Markowitz portfolio model provided investors with an optimal portfolio for a single time period. In this final project, we would extend this model to multiple periods, allowing investors to perform asset re-balancing more than once. The writer would explore portfolio optimization cases with and without constraints. The multi-period problem in this final project was modeled with multi-stage strategy developed by (Cong, 2016), with the addition of the Karush-Kuhn-Tucker (KKT) method for constrained cases. The portfolio optimization cases considered were unconstrained and bounded leverage constrained cases. The numerical simulation would l be performed using the Monte Carlo method. The results obtained for the unconstrained and non-periodic contribution optimization problems were consistent with the pre-commitment analytic solution demonstrating the equivalence of the two methods. For the constrained and with periodic contribution cases, the additional Kurish-Kuhn-Tucker method was consistent with the benchmark result in Cong and Oosterle (2016). The highest efficient frontier was achieved in the unconstrained and then bounded leverage cases. text |
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Mean-variance optimization or usually known as the Markowitz portfolio model
was a cornerstone of modern portfolio theory. This model helped investors create
mathematically optimal portfolios. Generally, the Markowitz portfolio model
provided investors with an optimal portfolio for a single time period. In this
final project, we would extend this model to multiple periods, allowing investors
to perform asset re-balancing more than once. The writer would explore portfolio
optimization cases with and without constraints. The multi-period problem in this
final project was modeled with multi-stage strategy developed by (Cong, 2016), with
the addition of the Karush-Kuhn-Tucker (KKT) method for constrained cases. The
portfolio optimization cases considered were unconstrained and bounded leverage
constrained cases. The numerical simulation would l be performed using the Monte
Carlo method. The results obtained for the unconstrained and non-periodic contribution
optimization problems were consistent with the pre-commitment analytic
solution demonstrating the equivalence of the two methods. For the constrained
and with periodic contribution cases, the additional Kurish-Kuhn-Tucker method
was consistent with the benchmark result in Cong and Oosterle (2016). The highest
efficient frontier was achieved in the unconstrained and then bounded leverage
cases. |
| format |
Final Project |
| author |
Naufal Daffa Andarwan, Muhammad |
| spellingShingle |
Naufal Daffa Andarwan, Muhammad MULTI-PERIOD MEANâVARIANCE PORTFOLIO OPTIMIZATION BASED ON MONTE-CARLO SIMULATION |
| author_facet |
Naufal Daffa Andarwan, Muhammad |
| author_sort |
Naufal Daffa Andarwan, Muhammad |
| title |
MULTI-PERIOD MEANâVARIANCE PORTFOLIO OPTIMIZATION BASED ON MONTE-CARLO SIMULATION |
| title_short |
MULTI-PERIOD MEANâVARIANCE PORTFOLIO OPTIMIZATION BASED ON MONTE-CARLO SIMULATION |
| title_full |
MULTI-PERIOD MEANâVARIANCE PORTFOLIO OPTIMIZATION BASED ON MONTE-CARLO SIMULATION |
| title_fullStr |
MULTI-PERIOD MEANâVARIANCE PORTFOLIO OPTIMIZATION BASED ON MONTE-CARLO SIMULATION |
| title_full_unstemmed |
MULTI-PERIOD MEANâVARIANCE PORTFOLIO OPTIMIZATION BASED ON MONTE-CARLO SIMULATION |
| title_sort |
multi-period meanâvariance portfolio optimization based on monte-carlo simulation |
| url |
https://digilib.itb.ac.id/gdl/view/74348 |
| _version_ |
1822279869987291136 |