Correlation Between Convex Finance and STEPN
Can any of the company-specific risk be diversified away by investing in both Convex Finance and STEPN at the same time? Although using a correlation coefficient on its own may not help to predict future stock returns, this module helps to understand the diversifiable risk of combining Convex Finance and STEPN into the same portfolio, which is an essential part of the fundamental portfolio management process.
By analyzing existing cross correlation between Convex Finance and STEPN, you can compare the effects of market volatilities on Convex Finance and STEPN and check how they will diversify away market risk if combined in the same portfolio for a given time horizon. You can also utilize pair trading strategies of matching a long position in Convex Finance with a short position of STEPN. Check out your portfolio center. Please also check ongoing floating volatility patterns of Convex Finance and STEPN.
Diversification Opportunities for Convex Finance and STEPN
0.88 | Correlation Coefficient |
Very poor diversification
The 3 months correlation between Convex and STEPN is 0.88. Overlapping area represents the amount of risk that can be diversified away by holding Convex Finance and STEPN in the same portfolio, assuming nothing else is changed. The correlation between historical prices or returns on STEPN and Convex Finance is a relative statistical measure of the degree to which these equity instruments tend to move together. The correlation coefficient measures the extent to which returns on Convex Finance are associated (or correlated) with STEPN. Values of the correlation coefficient range from -1 to +1, where. The correlation of zero (0) is possible when the price movement of STEPN has no effect on the direction of Convex Finance i.e., Convex Finance and STEPN go up and down completely randomly.
Pair Corralation between Convex Finance and STEPN
Assuming the 90 days trading horizon Convex Finance is expected to generate 1.04 times more return on investment than STEPN. However, Convex Finance is 1.04 times more volatile than STEPN. It trades about 0.21 of its potential returns per unit of risk. STEPN is currently generating about 0.17 per unit of risk. If you would invest 198.00 in Convex Finance on September 4, 2024 and sell it today you would earn a total of 283.00 from holding Convex Finance or generate 142.93% return on investment over 90 days.
Time Period | 3 Months [change] |
Direction | Moves Together |
Strength | Strong |
Accuracy | 100.0% |
Values | Daily Returns |
Convex Finance vs. STEPN
Performance |
Timeline |
Convex Finance |
STEPN |
Convex Finance and STEPN Volatility Contrast
Predicted Return Density |
Returns |
Pair Trading with Convex Finance and STEPN
The main advantage of trading using opposite Convex Finance and STEPN positions is that it hedges away some unsystematic risk. Because of two separate transactions, even if Convex Finance position performs unexpectedly, STEPN can make up some of the losses. Pair trading also minimizes risk from directional movements in the market. For example, if an entire industry or sector drops because of unexpected headlines, the short position in STEPN will offset losses from the drop in STEPN's long position.Convex Finance vs. XRP | Convex Finance vs. Solana | Convex Finance vs. Staked Ether | Convex Finance vs. Toncoin |
Check out your portfolio center.Note that this page's information should be used as a complementary analysis to find the right mix of equity instruments to add to your existing portfolios or create a brand new portfolio. You can also try the Headlines Timeline module to stay connected to all market stories and filter out noise. Drill down to analyze hype elasticity.
Other Complementary Tools
Portfolio Analyzer Portfolio analysis module that provides access to portfolio diagnostics and optimization engine | |
Idea Breakdown Analyze constituents of all Macroaxis ideas. Macroaxis investment ideas are predefined, sector-focused investing themes | |
Correlation Analysis Reduce portfolio risk simply by holding instruments which are not perfectly correlated | |
Fundamentals Comparison Compare fundamentals across multiple equities to find investing opportunities | |
Price Exposure Probability Analyze equity upside and downside potential for a given time horizon across multiple markets |