Risk Budgeting Allocation for Dynamic Risk Measures

References

• Acerbi C, Szekely B (2014) Back-testing Expected Shortfall. Risk 27(11):76–81.Google Scholar
• Anis HT, Kwon RH (2022) Cardinality-constrained risk parity portfolios. Eur. J. Oper. Res. 302(1):392–402.Crossref, Google Scholar
• Asness CS, Frazzini A, Pedersen LH (2012) Leverage aversion and risk parity. Financial Anal. J. 68(1):47–59.Crossref, Google Scholar
• Bai X, Scheinberg K, Tutuncu R (2016) Least-squares approach to risk parity in portfolio selection. Quant. Finance 16(3):357–376.Crossref, Google Scholar
• Bellini F, Cesarone F, Colombo C, Tardella F (2021) Risk parity with expectiles. Eur. J. Oper. Res. 291(3):1149–1163.Crossref, Google Scholar
• Bielecki TR, Chen T, Cialenco I (2022) Risk-sensitive Markov decision problems under model uncertainty: Finite time horizon case. Yin G, Zariphopoulou T, eds. Stochastic Analysis, Filtering, and Stochastic Optimization: A Commemorative Volume to Honor Mark HA Davis’s Contributions (Springer, Cham, Switzerland), 33–52.Crossref, Google Scholar
• Bielecki TR, Cialenco I, Liu H (2024) Time consistency of dynamic risk measures and dynamic performance measures generated by distortion functions. Stochastic Models, ePub ahead of print May 21, https://doi.org/10.1080/15326349.2024.2353045.Crossref, Google Scholar
• Bielecki TR, Cialenco I, Pitera M (2018) A unified approach to time consistency of dynamic risk measures and dynamic performance measures in discrete time. Math. Oper. Res. 43(1):204–221.Link, Google Scholar
• Billera LJ, Heath DC (1982) Allocation of shared costs: A set of axioms yielding a unique procedure. Math. Oper. Res. 7(1):32–39.Link, Google Scholar
• Björk T, Khapko M, Murgoci A (2021) Time-Inconsistent Control Theory with Finance Applications, Springer Finance, vol. 732 (Springer, Cham, Switzerland).Crossref, Google Scholar
• Bruder B, Kostyuchyk N, Roncalli T (2016) Risk parity portfolios with skewness risk: An application to factor investing and alternative risk premia. Preprint, submitted September 23, http://dx.doi.org/10.2139/ssrn.2813384.Google Scholar
• Chaves D, Hsu J, Li F, Shakernia O (2011) Risk parity portfolio vs. other asset allocation heuristic portfolios. J. Investing 20(1):108–118.Crossref, Google Scholar
• Cheridito P, Delbaen F, Kupper M (2006) Dynamic monetary risk measures for bounded discrete-time processes. Electronic J. Probab. 11:27–106.Crossref, Google Scholar
• Cherny AS (2009) Capital allocation and risk contribution with discrete-time coherent risk. Math. Finance 19(1):13–40.Crossref, Google Scholar
• Choueifaty Y, Coignard Y (2008) Toward maximum diversification. J. Portfolio Management 35(1):40–51.Crossref, Google Scholar
• Coache A, Jaimungal S (2023) Reinforcement learning with dynamic convex risk measures. Math. Finance 34(2):557–587.Crossref, Google Scholar
• Coache A, Jaimungal S, Cartea Á (2023) Conditionally elicitable dynamic risk measures for deep reinforcement learning. SIAM J. Financial Math. 14(4):1249–1289.Crossref, Google Scholar
• da Costa BFP, Pesenti SM, Targino R (2023) Risk budgeting portfolios from simulations. Eur. J. Oper. Res. 311(3):1040–1056.Crossref, Google Scholar
• Denault M (2001) Coherent allocation of risk capital. J. Risk 4:1–34.Crossref, Google Scholar
• Dhaene J, Kukush A, Linders D, Tang Q (2012) Remarks on quantiles and distortion risk measures. Eur. Actuarial J. 2:319–328.Crossref, Google Scholar
• Fissler T, Pesenti SM (2023) Sensitivity measures based on scoring functions. Eur. J. Oper. Res. 307(3):1408–1423.Crossref, Google Scholar
• Fissler T, Ziegel JF (2016) Higher order elicitability and Osband’s principle. Ann. Statist. 44:1680–1707.Crossref, Google Scholar
• Fujita Y, Nagarajan P, Kataoka T, Ishikawa T (2021) Chainerrl: A deep reinforcement learning library. J. Machine Learn. Res. 22(1):3557–3570.Google Scholar
• Gneiting T (2011) Making and evaluating point forecasts. J. Amer. Statist. Assoc. 106(494):746–762.Crossref, Google Scholar
• Gneiting T, Raftery AE (2007) Strictly proper scoring rules, prediction, and estimation. J. Amer. Statist. Assoc. 102(477):359–378.Crossref, Google Scholar
• Goodfellow I, Bengio Y, Courville A (2016) Deep Learning (MIT Press, Cambridge, MA).Google Scholar
• Haugh MB, Iyengar G, Song I (2017) A generalized risk budgeting approach to portfolio construction. J. Comput. Finance 21(2):29–60.Google Scholar
• Inoue A (2003) On the worst conditional expectation. J. Math. Anal. Appl. 286(1):237–247.Crossref, Google Scholar
• Ji R, Lejeune MA (2018) Risk-budgeting multi-portfolio optimization with portfolio and marginal risk constraints. Ann. Oper. Res. 262(2):547–578.Crossref, Google Scholar
• Jurczenko E, Teiletche J (2019) Expected Shortfall asset allocation: A multi-dimensional risk-budgeting framework. J. Alternative Investments 22(2):7–22.Crossref, Google Scholar
• Kalkbrener M (2005) An axiomatic approach to capital allocation. Math. Finance 15(3):425–437.Crossref, Google Scholar
• Kromer E, Overbeck L (2014) Representation of BSDE-based dynamic risk measures and dynamic capital allocations. Internat. J. Theoret. Appl. Finance 17(05):1450032.Crossref, Google Scholar
• Kromer E, Overbeck L (2017) Differentiability of BSVIEs and dynamic capital allocations. Internat. J. Theoret. Appl. Finance 20(07):1750047.Crossref, Google Scholar
• Kusuoka S (2001) On law invariant coherent risk measures. Kusuoka S, Maruyama T, eds. Advances in Mathematical Economics, vol. 3 (Springer, Tokyo), 83–95.Crossref, Google Scholar
• Lassance N, DeMiguel V, Vrins F (2022) Optimal portfolio diversification via independent component analysis. Oper. Res. 70(1):55–72.Link, Google Scholar
• Lee W (2011) Risk-based asset allocation: A new answer to an old question? J. Portfolio Management 37(4):11–28.Crossref, Google Scholar
• Maillard S, Roncalli T, Teïletche J (2010) On the properties of equally weighted risk contribution portfolios. J. Portfolio Management 36(4):60–70.Crossref, Google Scholar
• Mastrogiacomo E, Rosazza-Gianin E (2024) Dynamic capital allocation rules via BSDEs: An axiomatic approach. Ann. Oper. Res. 336:749–772.Crossref, Google Scholar
• Meucci A, Santangelo A, Deguest R (2015) Risk budgeting and diversification based on optimized uncorrelated factors. Risks 11(29):70–75.Google Scholar
• Mirman LJ, Tauman Y (1982) Demand compatible equitable cost sharing prices. Math. Oper. Res. 7(1):40–56.Link, Google Scholar
• Mnih V, Kavukcuoglu K, Silver D, Rusu AA, Veness J, Bellemare MG, Graves A, et al. (2015) Human-level control through deep reinforcement learning. Nature 518(7540):529–533.Crossref, Google Scholar
• Moresco MR, Mailhot M, Pesenti SM (2024) Uncertainty propagation and dynamic robust risk measures. Math. Oper. Res., ePub ahead of print August 9, https://doi.org/10.1287/moor.2023.0267.Link, Google Scholar
• Pesenti SM, Millossovich P, Tsanakas A (2021) Cascade sensitivity measures. Risk Anal. 41(12):2392–2414.Crossref, Google Scholar
• Qian E (2005) Risk parity portfolios: Efficient portfolios through true diversification. White paper, Panagora Asset Management, Boston.Google Scholar
• Qian E (2011) Risk parity and diversification. J. Investing 20(1):119–127.Crossref, Google Scholar
• Rockafellar RT (2015) Convex Analysis (Princeton University Press, Princeton, NJ).Google Scholar
• Roncalli T (2013) Introduction to Risk Parity and Budgeting (Chapman & Hall, Boca Raton, FL).Google Scholar
• Roncalli T, Weisang G (2016) Risk parity portfolios with risk factors. Quant. Finance 16(3):377–388.Crossref, Google Scholar
• Rüschendorf L (2013) Mathematical Risk Analysis: Dependence, Risk Bounds, Optimal Allocations and Portfolios, Springer Series in Operations Research and Financial Engineering (ORFE) (Springer, Heidelberg, Germany).Crossref, Google Scholar
• Ruszczyński A (2010) Risk-averse dynamic programming for Markov decision processes. Math. Programming 125(2):235–261.Crossref, Google Scholar
• Schilling K, Bauer D, Christiansen MC, Kling A (2020) Decomposing dynamic risks into risk components. Management Sci. 66(12):5738–5756.Link, Google Scholar
• Shapiro A, Dentcheva D, Ruszczynski A (2021) Lectures on Stochastic Programming: Modeling and Theory, MOS-SIAM Series on Optimization (SIAM, Philadelphia).Crossref, Google Scholar
• Tasche D (1999) Risk contributions and performance measurement. Report of the Lehrstuhl für mathematische Statistik, TU München, Munich, Germany.Google Scholar
• Tsanakas A (2004) Dynamic capital allocation with distortion risk measures. Insurance Math. Econom. 35(2):223–243.Crossref, Google Scholar
• Tsanakas A (2009) To split or not to split: Capital allocation with convex risk measures. Insurance Math. Econom. 44(2):268–277.Crossref, Google Scholar
• Tsanakas A, Barnett C (2003) Risk capital allocation and cooperative pricing of insurance liabilities. Insurance Math. Econom. 33(2):239–254.Crossref, Google Scholar
• Tsanakas A, Millossovich P (2016) Sensitivity analysis using risk measures. Risk Anal. 36(1):30–48.Crossref, Google Scholar