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import streamlit as st |
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from datetime import date, timedelta |
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import pandas as pd |
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from plots import ( |
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beta, |
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basic_portfolio, |
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display_heat_map, |
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ER, |
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buble_interactive |
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) |
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from ef import( |
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ef_viz |
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) |
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from sharp_ratio import( |
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cumulative_return, |
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preprocess, |
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sharp_ratio_func |
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) |
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def risk_str(num): |
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if num >=5 and num <15: |
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return 'Low Risk Aversion' |
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elif num >= 15 and num <25: |
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return 'Medium Risk Aversion' |
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elif num >= 25 and num <=35: |
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return 'High Rish Aversion' |
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def load_heading(): |
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"""The function that displays the heading. |
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Provides instructions to the user |
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""" |
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with st.container(): |
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st.title('Dataminers') |
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header = st.subheader('This App performs historical portfolio analysis and future analysis ') |
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st.subheader('Please read the instructions carefully and enjoy!') |
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def get_choices(): |
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"""Prompts the dialog to get the All Choices. |
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Returns: |
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An object of choices and an object of combined dataframes. |
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""" |
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choices = {} |
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tickers = st.sidebar.text_input('Enter 4 stock symbols.', 'GOOG,A,AA,AMD') |
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weights_str = st.sidebar.text_input('Enter The Investment Quantities', '50,30,25,25') |
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investment = st.sidebar.number_input('Enter The Initial Investment', min_value=5000, max_value=25000, value=5000) |
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rf = st.sidebar.number_input('Enter The Current Rate of Risk Free Return', min_value=0.001, max_value=1.00, value=0.041) |
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A_coef = st.sidebar.slider('Enter The Coefficient of Risk Aversion', min_value=5, max_value=35, value=30, step=5) |
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st.sidebar.write('Selected:', A_coef ) |
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submitted = st.sidebar.button("Submit") |
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symbols = [] |
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reset = False |
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if submitted: |
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tickers_list = tickers.split(",") |
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weights_list = weights_str.split(",") |
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symbols.extend(tickers_list) |
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weights = [] |
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for item in weights_list: |
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weights.append(float(item)) |
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if reset: |
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tickers = st.sidebar.selectbox('Enter 11 stock symbols.', ('GOOG','D','AAP','BLK')) |
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weights_str = st.sidebar.text_input('Enter The Investment Weights', '0.3,0.3 ,0.3') |
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st.experimental_singleton.clear() |
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else: |
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choices = { |
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'symbols': symbols, |
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'weights': weights, |
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'investment': investment, |
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'risk-free-rate': rf, |
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'A-coef': A_coef |
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} |
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data = pd.read_csv('data_and_sp500.csv') |
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combined_df = data[tickers_list] |
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raw_data=pd.read_csv('us-shareprices-daily.csv', sep=';') |
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return { |
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'choices': choices, |
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'combined_df': combined_df, |
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'data': data, |
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'raw_data':raw_data |
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} |
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def run(): |
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"""The main function for running the script.""" |
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load_heading() |
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choices = get_choices() |
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if choices: |
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st.success('''** Selected Tickers **''') |
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buble_interactive(choices['data'],choices['choices']) |
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st.header('Tickers Beta') |
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""" |
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The Capital Asset Pricing Model (CAPM) utilizes a formula to enable the application to calculate |
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risk, return, and variability of return with respect to a benchmark. The application uses this |
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benchmark, currently S&P 500 annual rate of return, to calculate the return of a stock using |
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Figure 2 in Appendix A. Elements such as beta can be calculated using the formula in Appendix |
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A Figure 1. The beta variable will serve as a variable to be used for calculating the variability of |
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the stock with respect to the benchmark. This variability factor will prove useful for a variety of |
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calculations such as understanding market risk and return. If the beta is equal to 1.0, the stock |
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price is correlated with the market. When beta is smaller than 1.0, the stock is less volatile than |
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the market. If beta is greater than 1.0, the stock is more volatile than the market. |
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The CAPM model was run for 9 stocks, using 10-year daily historical data for initial test analysis. |
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With this initial analysis, beta was calculated to determine the stock’s risk by measuring the |
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price changes to the benchmark. By using CAPM model, annual expected return and portfolio |
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return is calculated. The model results can be found in Appendix A. |
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""" |
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beta(choices['data'], choices['choices']) |
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ER(choices['data'], choices['choices']) |
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st.header('CAPM Model and the Efficient Frontier') |
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""" |
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CAPM model measures systematic risks, however many of it's functions have unrealistic assumptions and rely heavily on a linear interpretation |
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of the risks vs. returns relationship. It is better to use CAPM model in conjunction with the Efficient Frontier to better |
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graphically depict volatility (a measure of investment risk) for the defined rate of return. \n |
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Below we map the linear Utility function from the CAPM economic model along with the Efficient Frontier |
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Each circle depicted above is a variation of the portfolio with the same input asset, only different weights. |
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Portfolios with higher volatilities have a yellower shade of hue, while portfolios with a higher return have a larger radius. \n |
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As you input different porfolio assets, take note of how diversification can improve a portfolio's risk versus reward profile. |
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""" |
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ef_viz(choices['data'],choices['choices']) |
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""" |
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There are in fact two components of the Efficient Frontier: the Efficient Frontier curve itself and the Minimum Variance Frontier. |
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The lower curve, which is also the Minimum Variance Frontier will contain assets in the portfolio |
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that has the lowest volatility. If our portfolio contains "safer" assets such as Governmental Bonds, the further to the right |
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of the lower curve we will see a portfolio that contains only these "safe" assets, the portfolios on |
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this curve, in theory, will have diminishing returns.\n |
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The upper curve, which is also the Efficient Frontier, contains portfolios that have marginally increasing returns as the risks |
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increases. In theory, we want to pick a portfolio on this curve, as these portfolios contain more balanced weights of assets |
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with acceptable trade-offs between risks and returns. \n |
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If an investor is more comfortable with investment risks, they can pick a portfolio on the right side of the Efficient Frontier. |
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Whereas, a conservative investor might want to pick a portfolio from the left side of the Efficient Frontier. \n |
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Take notes of the assets' Betas and how that changes the shape of the curve as well. \n |
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How does the shape of the curve change when |
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the assets are of similar Beta vs when they are all different?\n |
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Note the behavior of the curve when the portfolio contains only assets with Betas higher than 1 vs. when Betas are lower than 1.\n |
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""" |
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basic_portfolio(choices['combined_df']) |
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display_heat_map(choices['data'],choices['choices']) |
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preprocess(choices['raw_data'], choices['choices']) |
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cumulative_return(choices['raw_data'], choices['choices']) |
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sharp_ratio_func(choices['raw_data'], choices['choices']) |
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if __name__ == "__main__": |
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run() |
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