Your search keyword '"P. Löper"' showing total 87 results

1. From entropic transport to martingale transport, and applications to model calibration

Author

Benamou, Jean-David, Chazareix, Guillaume, and Loeper, Grégoire

Subjects

Mathematics - Optimization and Control

Abstract

We propose a discrete time formulation of the semi-martingale optimal transport problem based on multi-marginal entropic transport. This approach offers a new way to formulate and solve numerically the calibration problem proposed by [17], using a multi-marginal extension of Sinkhorn algorithm as in [6, 10, 7]. When the time step goes to zero we recover, as detailed in the companion paper [8], a continuous semi-martingale process, solution to a semi-martingale optimal transport problem, with a cost function involving the so-called 'specific entropy' , introduced in [13], see also [12] and [2].

Published

2024

2. Examining the Measurement Invariance and Validity of the e SSIS SEL Brief + Mental Health Scales-- Student Version in Austria and Germany

Author

Christopher J. Anthony, Sepideh Hassani, Susanne Schwab, Abigail P. Howe, Michayla Yost, Stephen N. Elliott, Marwin Löper, Gamze Görel, and Frank Hellmich

Abstract

The SSIS SEL Brief + Mental Health Scales (SSIS SELb+MHS) are multi-informant assessments developed in the United States to assess the social and emotional learning (SEL) competencies and emotional behavior concerns (EBCs) of school-age youth. Although there are translations of the SEL items of the SSIS SELb+MHS available in other languages, a German translation has never been completed and validated, despite the growing need for SEL and mental health assessment in German-speaking countries. To address this need, this study's primary purpose was the examination of a German translation of the assessment with a specific focus on measurement invariance and concurrent validity invariance testing with 821 3rd through 6th-grade students in Austria and Germany. Results indicated that the SELb+MHS items clustered into 2 SEL factors and 2 EBC factors. With regard to measurement invariance, the SELb+MHS functioned similarly across both Austria and Germany and full scalar invariance was achieved. Additionally, the overall pattern of concurrent validity relationships was as expected and similar across countries. Implications and future directions are discussed.

Published

2024

3. Entropic Semi-Martingale Optimal Transport

Author

Benamou, Jean-David, Chazareix, Guillaume, Hoffmann, Marc, Loeper, Grégoire, and Vialard, François-Xavier

Subjects

Mathematics - Optimization and Control, 60-08, 65K10

Abstract

Entropic Optimal Transport (EOT), also referred to as the Schr\"odinger problem, seeks to find a random processes with prescribed initial/final marginals and with minimal relative entropy with respect to a reference measure. The relative entropy forces the two measures to share the same support and only the drift of the controlled process can be adjusted, the diffusion being imposed by the reference measure. Therefore, at first sight, Semi-Martingale Optimal Transport (SMOT) problems (see [1]) seem out of the scope of applications of Entropic regularization techniques, which are otherwise very attractive from a computational point of view. However, when the process is observed only at discrete times, and become therefore a Markov chain, its relative entropy can remain finite even with variable diffusion coefficients, and discrete semi-martingales can be obtained as solutions of (multi-marginal) EOT problems.Given a (smooth) semi-martingale, the limit of the relative entropy of its time discretizations, scaled by the time step converges to the so-called ``specific relative entropy'', a convex functional of its variance process, similar to those used in SMOT.In this paper we use this observation to build an entropic time discretization of continuous SMOT problems. This allows to compute discrete approximations of solutions to continuous SMOT problems by a multi-marginal Sinkhorn algorithm, without the need of solving the non-linear Hamilton-Jacobi-Bellman pde's associated to the dual problem, as done for example in [1, 2]. We prove a convergence result of the time discrete entropic problem to the continuous time problem, we propose an implementation and provide numerical experiments supporting the theoretical convergence.

Published

2024

4. Geometric Martingale Benamou-Brenier transport and geometric Bass martingales

Author

Backhoff-Veraguas, Julio, Loeper, Gregoire, and Obloj, Jan

Subjects

Mathematics - Probability, Quantitative Finance - Mathematical Finance, 60G42, 60G44, 91G20

Abstract

We introduce and study geometric Bass martingales. Bass martingales were introduced in \cite{Ba83} and studied recently in a series of works, including \cite{BaBeHuKa20,BaBeScTs23}, where they appear as solutions to the martingale version of the Benamou-Brenier optimal transport formulation. These arithmetic, as well as our novel geometric, Bass martingales are continuous martingale on $[0,1]$ with prescribed initial and terminal distributions. An arithmetic Bass martingale is the one closest to Brownian motion: its quadratic variation is as close as possible to being linear in the averaged $L^2$ sense. Its geometric counterpart we develop here, is the one closest to a geometric Brownian motion: the quadratic variation of its logarithm is as close as possible to being linear. By analogy between Bachelier and Black-Scholes models in mathematical finance, the newly obtained geometric Bass martingales} have the potential to be of more practical importance in a number of applications. Our main contribution is to exhibit an explicit bijection between geometric Bass martingales and their arithmetic counterparts. This allows us, in particular, to translate fine properties of the latter into the new geometric setting. We obtain an explicit representation for a geometric Bass martingale for given initial and terminal marginals, we characterise it as a solution to an SDE, and we show that geometric Brownian motion is the only process which is both an arithmetic and a geometric Bass martingale. Finally, we deduce a dual formulation for our geometric martingale Benamou-Brenier problem. Our main proof is probabilistic in nature and uses a suitable change of measure, but we also provide PDE arguments relying on the dual formulation of the problem, which offer a rigorous proof under suitable regularity assumptions.

Published

2024

5. The Measure Preserving Martingale Sinkhorn Algorithm

Author

Joseph, Benjamin, Loeper, Gregoire, and Obloj, Jan

Subjects

Quantitative Finance - Computational Finance, Mathematics - Probability, 49Q22 (Primary)

Abstract

We contribute to the recent studies of the so-called Bass martingale. Backhoff-Veraguas et al. (2020) showed it is the solution to the martingale Benamou-Brenier (mBB) problem, i.e., among all martingales with prescribed initial and terminal distributions it is the one closest to the Brownian motion. We link it with semimartingale optimal transport and deduce an alternative way to derive the dual formulation recently obtained in Backhoff-Veraguas et al. (2023). We then consider computational methods to compute the Bass martingale. The dual formulation of the transport problem leads to an iterative scheme that mirrors to the celebrated Sinkhorn algorithm for entropic optimal transport. We call it the measure preserving martingale Sinkhorn (MPMS) algorithm. We prove that in any dimension, each step of the algorithm improves the value of the dual problem, which implies its convergence. Our MPMS algorithm is equivalent to the fixed-point method of Conze and Henry-Labordere (2021), studied in Acciaio et al. (2023), and performs very well on a range of examples, including real market data.

Published

2023

6. Joint Calibration of Local Volatility Models with Stochastic Interest Rates using Semimartingale Optimal Transport

Author

Joseph, Benjamin, Loeper, Gregoire, and Obloj, Jan

Subjects

Quantitative Finance - Mathematical Finance, Quantitative Finance - Computational Finance

Abstract

We develop and implement a non-parametric method for joint exact calibration of a local volatility model and a correlated stochastic short rate model using semimartingale optimal transport. The method relies on the duality results established in Joseph, Loeper, and Obloj, 2023 and jointly calibrates the whole equity-rate dynamics. It uses an iterative approach which starts with a parametric model and tries to stay close to it, until a perfect calibration is obtained. We demonstrate the performance of our approach on market data using European SPX options and European cap interest rate options. Finally, we compare the joint calibration approach with the sequential calibration, in which the short rate model is calibrated first and frozen.

Published

2023

7. Data-driven Multiperiod Robust Mean-Variance Optimization

Author

Hai, Xin, Loeper, Gregoire, and Nam, Kihun

Subjects

Quantitative Finance - Mathematical Finance, Mathematics - Optimization and Control, 91G10, 49M29

Abstract

We study robust mean-variance optimization in multiperiod portfolio selection by allowing the true probability measure to be inside a Wasserstein ball centered at the empirical probability measure. Given the confidence level, the radius of the Wasserstein ball is determined by the empirical data. The numerical simulations of the US stock market provide a promising result compared to other popular strategies., Comment: 37 pages

Published

2023

8. Calibration of Local Volatility Models with Stochastic Interest Rates using Optimal Transport

Author

Loeper, Gregoire, Obloj, Jan, and Joseph, Benjamin

Subjects

Quantitative Finance - Mathematical Finance, Mathematics - Optimization and Control

Abstract

We develop a non-parametric, optimal transport driven, calibration methodology for local volatility models with stochastic interest rate. The method finds a fully calibrated model which is the closest to a given reference model. We establish a general duality result which allows to solve the problem via optimising over solutions to a non-linear HJB equation. We then apply the method to a sequential calibration setup: we assume that an interest rate model is given and is calibrated to the observed term structure in the market. We then seek to calibrate a stock price local volatility model with volatility coefficient depending on time, the underlying and the short rate process, and driven by a Brownian motion which can be correlated with the randomness driving the rates process. The local volatility model is calibrated to a finite number of European options prices via a convex optimisation problem derived from the PDE formulation of semimartingale optimal transport. Our methodology is analogous to Guo, Loeper, and Wang, 2022 and Guo, Loeper, Obloj, et al., 2022a but features a novel element of solving for discounted densities, or sub-probability measures. We present numerical experiments and test the effectiveness of the proposed methodology.

Published

2023

9. Differential learning methods for solving fully nonlinear PDEs

Author

Lefebvre, William, Loeper, Grégoire, and Pham, Huyên

Subjects

Quantitative Finance - Computational Finance

Abstract

We propose machine learning methods for solving fully nonlinear partial differential equations (PDEs) with convex Hamiltonian. Our algorithms are conducted in two steps. First the PDE is rewritten in its dual stochastic control representation form, and the corresponding optimal feedback control is estimated using a neural network. Next, three different methods are presented to approximate the associated value function, i.e., the solution of the initial PDE, on the entire space-time domain of interest. The proposed deep learning algorithms rely on various loss functions obtained either from regression or pathwise versions of the martingale representation and its differential relation, and compute simultaneously the solution and its derivatives. Compared to existing methods, the addition of a differential loss function associated to the gradient, and augmented training sets with Malliavin derivatives of the forward process, yields a better estimation of the PDE's solution derivatives, in particular of the second derivative, which is usually difficult to approximate. Furthermore, we leverage our methods to design algorithms for solving families of PDEs when varying terminal condition (e.g. option payoff in the context of mathematical finance) by means of the class of DeepOnet neural networks aiming to approximate functional operators. Numerical tests illustrate the accuracy of our methods on the resolution of a fully nonlinear PDE associated to the pricing of options with linear market impact, and on the Merton portfolio selection problem., Comment: 47 pages, 18 figures

Published

2022

10. Cleaning the covariance matrix of strongly nonstationary systems with time-independent eigenvalues

Author

Bongiorno, Christian, Challet, Damien, and Loeper, Grégoire

Subjects

Statistics - Applications, Physics - Data Analysis, Statistics and Probability, Quantitative Finance - Statistical Finance

Abstract

We propose a data-driven way to reduce the noise of covariance matrices of nonstationary systems. In the case of stationary systems, asymptotic approaches were proved to converge to the optimal solutions. Such methods produce eigenvalues that are highly dependent on the inputs, as common sense would suggest. Our approach proposes instead to use a set of eigenvalues totally independent from the inputs and that encode the long-term averaging of the influence of the future on present eigenvalues. Such an influence can be the predominant factor in nonstationary systems. Using real and synthetic data, we show that our data-driven method outperforms optimal methods designed for stationary systems for the filtering of both covariance matrix and its inverse, as illustrated by financial portfolio variance minimization, which makes out method generically relevant to many problems of multivariate inference.

Published

2021

11. On the convexity theory of generating functions

Author

Loeper, Gregoire and Trudinger, Neil S

Subjects

Mathematics - Analysis of PDEs, 35J60 (Primary) 52A99, 78A05 (secondary)

Abstract

In this paper, we extend our convexity theory for $C^2$ cost functions in optimal transportation to more general generating functions, which were originally introduced by the second author to extend the framework of optimal transportation to embrace near field geometric optics. In particular we provide an alternative geometric treatment to the previous analytic approach using differential inequalities, which also gives a different derivation of the invariance of the fundamental regularity conditions under duality. We also extend our local theory to cover the strict version of these conditions for $C^2$ cost and generating functions., Comment: Some typos corrected in previous version and comments added

Published

2021

12. Optimal transport for model calibration

Author

Guo, Ivan, Loeper, Gregoire, Obloj, Jan, and Wang, Shiyi

Subjects

Quantitative Finance - Mathematical Finance, Mathematics - Optimization and Control

Abstract

We provide a survey of recent results on model calibration by Optimal Transport. We present the general framework and then discuss the calibration of local, and local-stochastic, volatility models to European options, the joint VIX/SPX calibration problem as well as calibration to some path-dependent options. We explain the numerical algorithms and present examples both on synthetic and market data., Comment: 15 pages, 9 figures

Published

2021

13. Approximate viscosity solutions of path-dependent PDEs and Dupire's vertical differentiability

Author

Bouchard, Bruno, Loeper, Grégoire, and Tan, Xiaolu

Subjects

Mathematics - Analysis of PDEs, Mathematics - Probability

Abstract

We introduce a notion of approximate viscosity solution for a class of nonlinear path-dependent PDEs (PPDEs), including the Hamilton-Jacobi-Bellman type equations. Existence, comparaison and stability results are established under fairly general conditions. It is also consistent with smooth solutions when the dimension is less or equal to two, or the non-linearity is concave in the second order space derivative. We finally investigate the regularity (in the sense of Dupire) of the solution to the PPDE.

Published

2021

14. On Stochastic Partial Differential Equations and their applications to Derivative Pricing through a conditional Feynman-Kac formula

Author

Das, Kaustav, Guo, Ivan, and Loeper, Grégoire

Subjects

Quantitative Finance - Mathematical Finance, Mathematics - Probability, 60H15, 60H30, 91G20, 91G60, G.3

Abstract

In a multi-dimensional diffusion framework, the price of a financial derivative can be expressed as an iterated conditional expectation, where the inner conditional expectation conditions on the future of an auxiliary process that enters into the dynamics for the spot. Inspired by results from non-linear filtering theory, we show that this inner conditional expectation solves a backward SPDE (a so-called 'conditional Feynman-Kac formula'), thereby establishing a connection between SPDE and derivative pricing theory. Unlike situations considered previously in the literature, the problem at hand requires conditioning on a backward filtration generated by the noise of the auxiliary process and enlarged by its terminal value, leading us to search for a backward Brownian motion in this filtration. This adds an additional source of irregularity to the associated SPDE which must be tackled with new techniques. Moreover, through the conditional Feynman-Kac formula, we establish an alternative class of so-called mixed Monte-Carlo PDE numerical methods for pricing financial derivatives. Finally, we provide a simple demonstration of this method by pricing a European put option.

Published

2021

15. Deep Semi-Martingale Optimal Transport

Author

Guo, Ivan, Langrené, Nicolas, Loeper, Grégoire, and Ning, Wei

Subjects

Mathematics - Optimization and Control, 68T07, 49Q22, 65K99, 93E20, G.1.6, G.3, I.2.8

Abstract

We propose two deep neural network-based methods for solving semi-martingale optimal transport problems. The first method is based on a relaxation/penalization of the terminal constraint, and is solved using deep neural networks. The second method is based on the dual formulation of the problem, which we express as a saddle point problem, and is solved using adversarial networks. Both methods are mesh-free and therefore mitigate the curse of dimensionality. We test the performance and accuracy of our methods on several examples up to dimension 10. We also apply the first algorithm to a portfolio optimization problem where the goal is, given an initial wealth distribution, to find an investment strategy leading to a prescribed terminal wealth distribution.

Published

2021

16. A $C^{0,1}$-functional It\^o's formula and its applications in mathematical finance

Author

Bouchard, Bruno, Loeper, Grégoire, and Tan, Xiaolu

Subjects

Mathematics - Probability, Quantitative Finance - Mathematical Finance

Abstract

Using Dupire's notion of vertical derivative, we provide a functional (path-dependent) extension of the It\^o's formula of Gozzi and Russo (2006) that applies to C^{0,1}-functions of continuous weak Dirichlet processes. It is motivated and illustrated by its applications to the hedging or superhedging problems of path-dependent options in mathematical finance, in particular in the case of model uncertainty

Published

2021

17. Portfolio optimization with a prescribed terminal wealth distribution

Author

Guo, Ivan, Langrené, Nicolas, Loeper, Grégoire, and Ning, Wei

Subjects

Mathematics - Optimization and Control, 49Q22, 49K12, 91G80, 91G60, G.1.6, G.1.8, G.1.10

Abstract

This paper studies a portfolio allocation problem, where the goal is to prescribe the wealth distribution at the final time. We study this problem with the tools of optimal mass transport. We provide a dual formulation which we solve by a gradient descent algorithm. This involves solving an associated HJB and Fokker--Planck equation by a finite difference method. Numerical examples for various prescribed terminal distributions are given, showing that we can successfully reach attainable targets. We next consider adding consumption during the investment process, to take into account distribution that either not attainable, or sub-optimal.

Published

2020

18. Mean-variance portfolio selection with tracking error penalization

Author

Lefebvre, William, Loeper, Gregoire, and Pham, Huyên

Subjects

Quantitative Finance - Computational Finance

Abstract

This paper studies a variation of the continuous-time mean-variance portfolio selection where a tracking-error penalization is added to the mean-variance criterion. The tracking error term penalizes the distance between the allocation controls and a reference portfolio with same wealth and fixed weights. Such consideration is motivated as follows: (i) On the one hand, it is a way to robustify the mean-variance allocation in case of misspecified parameters, by "fitting" it to a reference portfolio that can be agnostic to market parameters; (ii) On the other hand, it is a procedure to track a benchmark and improve the Sharpe ratio of the resulting portfolio by considering a mean-variance criterion in the objective function. This problem is formulated as a McKean-Vlasov control problem. We provide explicit solutions for the optimal portfolio strategy and asymptotic expansions of the portfolio strategy and efficient frontier for small values of the tracking error parameter. Finally, we compare the Sharpe ratios obtained by the standard mean-variance allocation and the penalized one for four different reference portfolios: equal-weights, minimum-variance, equal risk contributions and shrinking portfolio. This comparison is done on a simulated misspecified model, and on a backtest performed with historical data. Our results show that in most cases, the penalized portfolio outperforms in terms of Sharpe ratio both the standard mean-variance and the reference portfolio.

Published

2020

19. Weak formulation of the MTW condition and convexity properties of potentials

Author

Loeper, G. and Trudinger, N. S.

Subjects

Mathematics - Analysis of PDEs

Abstract

We simplify the geometric interpretation of the weak Ma-Trudinger-Wang condition for regularity in optimal transportation and provide a geometric proof of the global c-convexity of locally $c$-convex potentials when the cost function $c$ is only assumed twice differentiable.

Published

2020

20. Markovian approximation of the rough Bergomi model for Monte Carlo option pricing

Author

Zhu, Qinwen, Loeper, Grégoire, Chen, Wen, and Langrené, Nicolas

Subjects

Quantitative Finance - Mathematical Finance, 60H35, 65C30, 91G20, 91G60, 65C05, 62P05, G.3, I.6.1, F.2.1, G.1.2, I.6.3, G.1.10

Abstract

The recently developed rough Bergomi (rBergomi) model is a rough fractional stochastic volatility (RFSV) model which can generate more realistic term structure of at-the-money volatility skews compared with other RFSV models. However, its non-Markovianity brings mathematical and computational challenges for model calibration and simulation. To overcome these difficulties, we show that the rBergomi model can be approximated by the Bergomi model, which has the Markovian property. Our main theoretical result is to establish and describe the affine structure of the rBergomi model. We demonstrate the efficiency and accuracy of our method by implementing a Markovian approximation algorithm based on a hybrid scheme., Comment: 20 pages, 3 figures

Published

2020

21. Structural and optical properties of silicon nanocrystals embedded in silicon carbide

Author

Weiss, C., Schnabel, M., Reichert, A., Löper, P., and Janz, S.

Subjects

Physics - Applied Physics, Condensed Matter - Materials Science

Abstract

The outstanding demonstration of quantum confinement in Si nanocrystals (Si NC) in a SiC matrix requires the fabrication of Si NC with a narrow size distribution. It is understood without controversy that this fabrication is a difficult exercise and that a multilayer (ML) structure is suitable for such fabrication only in a narrow parameter range. This parameter range is sought by varying both the stoichiometric SiC barrier thickness and the Si-rich SiC well thickness between 3 and 9 nm and comparing them to single layers (SL). The samples processed for this investigation were deposited by plasma-enhanced chemical vapor deposition (PECVD) and subsequently subjected to thermal annealing at 1000-1100${\deg}$C for crystal formation. Bulk information about the entire sample area and depth were obtained by structural and optical characterization methods: information about the mean Si NC size was determined from grazing incidence X-ray diffraction (GIXRD) measurements. Fourier-transform infrared spectroscopy (FTIR) was applied to gain insight into the structure of the Si-C network, and spectrophotometry measurements were performed to investigate the absorption coefficient and to estimate the bandgap $E_{04}$. All measurements showed that the influence of the ML structure on the Si NC size, on the Si-C network and on the absorption properties is subordinate to the influence of the overall Si content in the samples, which we identified as the key parameter for the structural and optical properties. We attribute this behavior to interdiffusion of the barrier and well layers. Because the produced Si NC are within the target size range of 2-4 nm for all layer thickness variations, we propose to use the Si content to adjust the Si NC size in future experiments.

Published

2020

22. Joint Modelling and Calibration of SPX and VIX by Optimal Transport

Author

Guo, Ivan, Loeper, Gregoire, Obloj, Jan, and Wang, Shiyi

Subjects

Quantitative Finance - Mathematical Finance, Mathematics - Optimization and Control, Quantitative Finance - Computational Finance

Abstract

This paper addresses the joint calibration problem of SPX options and VIX options or futures. We show that the problem can be formulated as a semimartingale optimal transport problem under a finite number of discrete constraints, in the spirit of [arXiv:1906.06478]. We introduce a PDE formulation along with its dual counterpart. The solution, a calibrated diffusion process, can be represented via the solutions of Hamilton-Jacobi-Bellman equations arising from the dual formulation. The method is tested on both simulated data and market data. Numerical examples show that the model can be accurately calibrated to SPX options, VIX options and VIX futures simultaneously.

Published

2020

23. Robust utility maximization under model uncertainty via a penalization approach

Author

Guo, Ivan, Langrené, Nicolas, Loeper, Grégoire, and Ning, Wei

Subjects

Mathematics - Optimization and Control, 91G80, 49N90, 49K35, 49K20, 49L20, 49L25, G.3, G.1.6, G.1.8

Abstract

This paper addresses the problem of utility maximization under uncertain parameters. In contrast with the classical approach, where the parameters of the model evolve freely within a given range, we constrain them via a penalty function. We show that this robust optimization process can be interpreted as a two-player zero-sum stochastic differential game. We prove that the value function satisfies the Dynamic Programming Principle and that it is the unique viscosity solution of an associated Hamilton-Jacobi-Bellman-Isaacs equation. We test this robust algorithm on real market data. The results show that robust portfolios generally have higher expected utilities and are more stable under strong market downturns. To solve for the value function, we derive an analytical solution in the logarithmic utility case and obtain accurate numerical approximations in the general case by three methods: finite difference method, Monte Carlo simulation, and Generative Adversarial Networks., Comment: 25 figures

Published

2019

24. Calibration of Local-Stochastic Volatility Models by Optimal Transport

Author

Guo, Ivan, Loeper, Gregoire, and Wang, Shiyi

Subjects

Quantitative Finance - Mathematical Finance, Mathematics - Optimization and Control

Abstract

In this paper, we study a semi-martingale optimal transport problem and its application to the calibration of Local-Stochastic Volatility (LSV) models. Rather than considering the classical constraints on marginal distributions at initial and final time, we optimise our cost function given the prices of a finite number of European options. We formulate the problem as a convex optimisation problem, for which we provide a PDE formulation along with its dual counterpart. Then we solve numerically the dual problem, which involves a fully non-linear Hamilton-Jacobi-Bellman equation. The method is tested by calibrating a Heston-like LSV model with simulated data and foreign exchange market data.

Published

2019

25. Optimal FX Hedge Tenor with Liquidity Risk

Author

Zhang, Rongju, Aarons, Mark, and Loeper, Gregoire

Subjects

Quantitative Finance - Risk Management

Abstract

We develop an optimal currency hedging strategy for fund managers who own foreign assets to choose the hedge tenors that maximize their FX carry returns within a liquidity risk constraint. The strategy assumes that the offshore assets are fully hedged with FX forwards. The chosen liquidity risk metric is Cash Flow at Risk (CFaR). The strategy involves time-dispersing the total nominal hedge value into future time buckets to maximize (minimize) the expected FX carry benefit (cost), given the constraint that the CFaRs in all the future time buckets do not breach a predetermined liquidity budget. We demonstrate the methodology via an illustrative example where shorter-dated forwards are assumed to deliver higher carry trade returns (motivated by the historical experience where AUD is the domestic currency and USD is the foreign currency). We also introduce a tenor-ranking method which is useful when this assumption fails. We show by Monte Carlo simulation and by backtesting that our hedging strategy successfully operates within the liquidity budget. We provide practical insights on when and why fund managers should choose short-dated or long-dated tenors.

Published

2019

26. Interior second derivative estimates for nonlinear diffusions

Author

Loeper, Gregoire and Quiros, Fernando

Subjects

Mathematics - Analysis of PDEs

Abstract

By an extension of of some estimates due to Crandall and Pierre and Di Benedetto we derive consequences for fully nonlinear parabolic equations of the form $\dt v + F(t,x,D^2v)=0$, where $F$ can be both singular and degenerate elliptic and also non-homogeneous. Such equations appear in the theory of option pricing with market impact.

Published

2018

27. Path Dependent Optimal Transport and Model Calibration on Exotic Derivatives

Author

Guo, Ivan and Loeper, Gregoire

Subjects

Mathematics - Probability, Mathematics - Optimization and Control, Quantitative Finance - Mathematical Finance

Abstract

In this paper, we introduce and develop the theory of semimartingale optimal transport in a path dependent setting. Instead of the classical constraints on marginal distributions, we consider a general framework of path dependent constraints. Duality results are established, representing the solution in terms of path dependent partial differential equations (PPDEs). Moreover, we provide a dimension reduction result based on the new notion of "semifiltrations", which identifies appropriate Markovian state variables based on the constraints and the cost function. Our technique is then applied to the exact calibration of volatility models to the prices of general path dependent derivatives.

Published

2018

28. Optimal transport with discrete long range mean field interactions

Author

Liu, Jiakun and Loeper, Grégoire

Subjects

Mathematics - Analysis of PDEs, Mathematical Physics

Abstract

We study an optimal transport problem where, at some intermediate time, the mass is accelerated by either an external force field, or self-interacting. We obtain regularity of the velocity potential, intermediate density, and optimal transport map, under conditions on the interaction potential that are related to the so-called Ma-Trudinger-Wang condition from optimal transport.

Published

2018

29. Second order stochastic target problems with generalized market impact

Author

Bouchard, Bruno, Loeper, Grégoire, Soner, Halil Mete, and Zhou, Chao

Subjects

Mathematics - Probability

Abstract

We extend the study of [7, 18] to stochastic target problems with general market impacts. Namely, we consider a general abstract model which can be associated to a fully nonlinear parabolic equation. Unlike [7, 18], the equation is not concave and the regularization/verification approach of [7] can not be applied. We also relax the gamma constraint of [7]. In place, we need to generalize the a priori estimates of [18] and exhibit smooth solutions from the classical parabolic equations theory. Up to an additional approximating argument, this allows us to show that the super-hedging price solves the parabolic equation and that a perfect hedging strategy can be constructed when the coefficients are smooth enough. This representation leads to a general dual formulation. We finally provide an asymptotic expansion around a model without impact.

Published

2018

30. Local Volatility Calibration by Optimal Transport

Author

Guo, Ivan, Loeper, Grégoire, and Wang, Shiyi

Subjects

Quantitative Finance - Mathematical Finance

Abstract

The calibration of volatility models from observable option prices is a fundamental problem in quantitative finance. The most common approach among industry practitioners is based on the celebrated Dupire's formula [6], which requires the knowledge of vanilla option prices for a continuum of strikes and maturities that can only be obtained via some form of price interpolation. In this paper, we propose a new local volatility calibration technique using the theory of optimal transport. We formulate a time continuous martingale optimal transport problem, which seeks a martingale diffusion process that matches the known densities of an asset price at two different dates, while minimizing a chosen cost function. Inspired by the seminal work of Benamou and Brenier [1], we formulate the problem as a convex optimization problem, derive its dual formulation, and solve it numerically via an augmented Lagrangian method and the alternative direction method of multipliers (ADMM) algorithm. The solution effectively reconstructs the dynamic of the asset price between the two dates by recovering the optimal local volatility function, without requiring any time interpolation of the option prices.

Published

2017

31. Pricing Bounds for VIX Derivatives via Least Squares Monte Carlo

Author

Guo, Ivan and Loeper, Gregoire

Subjects

Quantitative Finance - Computational Finance, Quantitative Finance - Mathematical Finance

Abstract

Derivatives on the Chicago Board Options Exchange volatility index (VIX) have gained significant popularity over the last decade. The pricing of VIX derivatives involves evaluating the square root of the expected realised variance which cannot be computed by direct Monte Carlo methods. Least squares Monte Carlo methods can be used but the sign of the error is difficult to determine. In this paper, we propose new model independent upper and lower pricing bounds for VIX derivatives. In particular, we first present a general stochastic duality result on payoffs involving concave functions. This is then applied to VIX derivatives along with minor adjustments to handle issues caused by the square root function. The upper bound involves the evaluation of a variance swap, while the lower bound involves estimating a martingale increment corresponding to its hedging portfolio. Both can be achieved simultaneously using a single linear least square regression. Numerical results show that the method works very well for VIX futures, calls and puts under a wide range of parameter choices.

Published

2016

32. Robustness of mathematical models and technical analysis strategies

Author

Ayed, Ahmed Bel Hadj, Loeper, Grégoire, and Abergel, Frédéric

Subjects

Quantitative Finance - Portfolio Management, Quantitative Finance - Mathematical Finance, Quantitative Finance - Trading and Market Microstructure

Abstract

The aim of this paper is to compare the performances of the optimal strategy under parameters mis-specification and of a technical analysis trading strategy. The setting we consider is that of a stochastic asset price model where the trend follows an unobservable Ornstein-Uhlenbeck process. For both strategies, we provide the asymptotic expectation of the logarithmic return as a function of the model parameters. Finally, numerical examples find that an investment strategy using the cross moving averages rule is more robust than the optimal strategy under parameters mis-specification.

Published

2016

33. Hedging of covered options with linear market impact and gamma constraint

Author

Bouchard, B, Loeper, G, and Zou, Y

Subjects

Mathematics - Probability, Quantitative Finance - Computational Finance

Abstract

Within a financial model with linear price impact, we study the problem of hedging a covered European option under gamma constraint. Using stochastic target and partial differential equation smoothing techniques, we prove that the super-replication price is the viscosity solution of a fully non-linear parabolic equation. As a by-product, we show how $\epsilon$-optimal strategies can be constructed. Finally, a numerical resolution scheme is proposed.

Published

2015

34. Performance analysis of the optimal strategy under partial information

Author

Ayed, Ahmed Bel Hadj, Loeper, Grégoire, Aoud, Sofiene El, and Abergel, Frédéric

Subjects

Quantitative Finance - Portfolio Management, Quantitative Finance - Mathematical Finance, Quantitative Finance - Trading and Market Microstructure

Abstract

The question addressed in this paper is the performance of the optimal strategy, and the impact of partial information. The setting we consider is that of a stochastic asset price model where the trend follows an unobservable Ornstein-Uhlenbeck process. We focus on the optimal strategy with a logarithmic utility function under full or partial information. For both cases, we provide the asymptotic expectation and variance of the logarithmic return as functions of the signal-to-noise ratio and of the trend mean reversion speed. Finally, we compare the asymptotic Sharpe ratios of these strategies in order to quantify the loss of performance due to partial information.

Published

2015

35. Forecasting trends with asset prices

Author

Ayed, Ahmed Bel Hadj, Loeper, Grégoire, and Abergel, Frédéric

Subjects

Quantitative Finance - Statistical Finance, Quantitative Finance - Portfolio Management, Statistics - Applications

Abstract

In this paper, we consider a stochastic asset price model where the trend is an unobservable Ornstein Uhlenbeck process. We first review some classical results from Kalman filtering. Expectedly, the choice of the parameters is crucial to put it into practice. For this purpose, we obtain the likelihood in closed form, and provide two on-line computations of this function. Then, we investigate the asymptotic behaviour of statistical estimators. Finally, we quantify the effect of a bad calibration with the continuous time mis-specified Kalman filter. Numerical examples illustrate the difficulty of trend forecasting in financial time series., Comment: 26 pages, 11 figures

Published

2015

36. Almost-sure hedging with permanent price impact

Author

Bouchard, B., Loeper, G., and Zou, Y.

Subjects

Quantitative Finance - Pricing of Securities, Mathematics - Probability, Quantitative Finance - Trading and Market Microstructure, 91G20, 93E20, 49L20

Abstract

We consider a financial model with permanent price impact. Continuous time trading dynamics are derived as the limit of discrete rebalancing policies. We then study the problem of super-hedging a European option. Our main result is the derivation of a quasi-linear pricing equation. It holds in the sense of viscosity solutions. When it admits a smooth solution, it provides a perfect hedging strategy.

Published

2015

37. The Role of Primary School Teachers' Attitudes and Self-Efficacy Beliefs for Everyday Practices in Inclusive Classrooms -- A Study on the Verification of the 'Theory of Planned Behaviour'

Author

Hellmich, Frank, Löper, Marwin F., and Görel, Gamze

Abstract

Within the framework of implementing inclusive education in primary schools, various questions arise concerning the role of teachers' personal resources in their everyday practices in heterogeneous classrooms. Teachers' professional personalities as well as their intentions concerning inclusive teaching are considered to be important prerequisites for successful learning environments. Therefore, we examined the relevance of primary school teachers' personal resources, such as their attitudes towards inclusion and their perceived collective self-efficacy beliefs concerning inclusive teaching, in terms of their everyday practices in heterogeneous classrooms on the basis of the 'Theory of Planned Behaviour'. We investigated N = 290 primary school teachers' everyday practices according to their attitudes towards inclusion, their collective self-efficacy beliefs concerning inclusive education, their perceptions of school management's expectations and their intentions regarding inclusive education. The results of our study indicate that primary school teachers' everyday practices in heterogeneous classrooms are significantly predicted by their intentions regarding the implementation of inclusive education and by their attitudes towards inclusive education but not by their collective self-efficacy beliefs or by their perceptions of school management's expectations. Specifically, the effect of teachers' attitudes on their everyday practices in heterogeneous classrooms is significantly mediated by their intentions regarding the implementation of inclusive education.

Published

2019

38. Regularity of optimal maps on the sphere: the quadratic cost and the reflector antenna

Author

Loeper, Gregoire

Subjects

Mathematics - Analysis of PDEs

Abstract

Building on the results of Ma, Trudinger and Wang \cite{MTW}, and of the author \cite{L5}, we study two problems of optimal transportation on the sphere: the first corresponds to the cost function $d^2(x,y)$, where $d(\cdot,\cdot)$ is the Riemannian distance of the round sphere; the second corresponds to the cost function $-\log|x-y|$, it is known as the reflector antenna problem. We show that in both cases, the {\em cost-sectional curvature} is uniformly positive, and establish the geometrical properties so that the results of \cite{L5} and \cite{MTW} can apply: global smooth solutions exist for arbitrary smooth positive data and optimal maps are H\"older continuous under weak assumptions on the data., Comment: arXiv admin note: text overlap with arXiv:math/0504137

Published

2013

39. Option pricing with linear market impact and non-linear Black and Scholes equations

Author

Loeper, Gregoire

Subjects

Quantitative Finance - Pricing of Securities, Mathematics - Analysis of PDEs

Abstract

We consider a model of linear market impact, and address the problem of replicating a contingent claim in this framework. We derive a non-linear Black-Scholes Equation that provides an exact replication strategy. This equation is fully non-linear and singular, but we show that it is well posed, and we prove existence of smooth solutions for a large class of final payoffs, both for constant and local volatility. To obtain regularity of the solutions, we develop an original method based on Legendre transforms. The close connections with the problem of hedging with it gamma constraints studied by Cheridito, Soner and Touzi and with the problem of hedging under it liquidity costs are discussed. We also derive a modified Black-Scholes formula valid for asymptotically small impact parameter, and finally provide numerical simulations as an illustration.

Published

2013

40. Modeling upconversion of erbium doped microcrystals based on experimentally determined Einstein coefficients

Author

Fischer, S., Steinkemper, H., Löper, P., Hermle, M., and Goldschmidt, J. C.

Subjects

Physics - Optics

Abstract

Upconversion of infrared photons is a promising possibility to enhance solar cell efficiency by producing electricity from otherwise unused sub-band-gap photons. We present a rate equation model, and the relevant processes, in order to describe upconversion of near-infrared photons. The model considers stimulated and spontaneous processes, multi-phonon relaxation and energy transfer between neighboring ions. The input parameters for the model are experimentally determined for the material system \beta-NaEr0.2Y0.8F4. The determination of the transition probabilities, also known as the Einstein coefficients, is in the focus of the parameterization. The influence of multi-phonon relaxation and energy transfer on the upconversion are evaluated and discussed in detail. Since upconversion is a non-linear process, the irradiance dependence of the simulations is investigated and compared to experimental data of quantum efficiency measurements. The results are very promising and indicate that upconversion is physically reasonably described by the rate equations. Therefore, the presented model will be the basis for further simulations concerning various applications of upconversion, such as in combination with plasmon resonances in metal nanoparticles., Comment: 29 pages, 13 figures

Published

2011

41. Electric turbulence in a plasma subject to a strong magnetic field

Author

Loeper, G. and Vasseur, A.

Subjects

Mathematics - Analysis of PDEs

Abstract

We consider in this paper a plasma subject to a strong deterministic magnetic field and we investigate the effect on this plasma of a stochastic electric field. We show that the limit behavior, which corresponds to the transfer of energy from the electric wave to the particles (Landau phenomena), is described by a Spherical Harmonics Expansion (SHE) model.

Published

2005

42. Uniqueness of the solution to the Vlasov-Poisson system with bounded density

Author

Loeper, G.

Subjects

Mathematics - Analysis of PDEs

Abstract

In this note, we show uniqueness of weak solutions to the Vlasov-Poisson system on the only condition that the macroscopic density $\rho$ defined by $\rho(t,x) = \int_{\Rd} f(t,x,\xi)d\xi$ is bounded in $\Linf$. Our proof is based on optimal transportation.

Published

2005

43. A fully non-linear version of the Euler incompressible equations: the semi-geostrophic system

Author

Loeper, G.

Subjects

Mathematics - Analysis of PDEs

Abstract

This work gathers new results concerning the semi-geostrophic equations: existence and stability of measure valued solutions, existence and uniqueness of solutions under certain continuity conditions for the density, convergence to the incompressible Euler equations. Meanwhile, a general technique to prove uniqueness of sufficiently smooth solutions to non-linearly coupled system is introduced, using optimal transportation.

Published

2005

44. A geometric approximation to the Euler equations: the Vlasov-Monge-Ampere system

Author

Brenier, Yann and Loeper, Gregoire

Subjects

Mathematics - Analysis of PDEs, Mathematical Physics

Abstract

This paper studies the Vlasov-Monge-Ampere system (VMA), a fully non-linear version of the Vlasov-Poisson system (VP) where the (real) Monge-Ampere equation substitutes for the usual Poisson equation. This system can be derived as a geometric approximation of the Euler equations of incompressible fluid mechanics in the spirit of Arnold and Ebin. Global existence of weak solutions and local existence of smooth solutions are obtained. Links between the VMA system, the VP system and the Euler equations are established through rigorous asymptotic analysis.

Published

2005

45. On the regularity of maps solutions of optimal transportation problems

Author

Loeper, G.

Subjects

Mathematics - Analysis of PDEs

Abstract

We give a necessary and sufficient condition on the cost function so that the map solution of Monge's optimal transportation problem is continuous for arbitrary smooth positive data. This condition was first introduced by Ma, Trudinger and Wang \cite{MTW, TW} for a priori estimates of the corresponding Monge-Amp\`ere equation. It is expressed by a so-called {\em cost-sectional curvature} being non-negative. We show that when the cost function is the squared distance of a Riemannian manifold, the cost-sectional curvature yields the sectional curvature. As a consequence, if the manifold does not have non-negative sectional curvature everywhere, the optimal transport map {\em can not be continuous} for arbitrary smooth positive data. The non-negativity of the cost-sectional curvature is shown to be equivalent to the connectedness of the contact set between any cost-convex function (the proper generalization of a convex function) and any of its supporting functions. When the cost-sectional curvature is uniformly positive, we obtain that optimal maps are continuous or H\"older continuous under quite weak assumptions on the data, compared to what is needed in the Euclidean case. This case includes the reflector antenna problem and the squared Riemannian distance on the sphere.

Published

2005

46. Contractive metrics for scalar conservation laws

Author

Bolley, F., Brenier, Y., and Loeper, G.

Subjects

Mathematics - Analysis of PDEs

Abstract

We consider nondecreasing entropy solutions to 1-d scalar conservation laws and show that the spatial derivatives of such solutions satisfy a contraction property with respect to the Wasserstein distance of any order. This result extends the L^1-contraction property shown by Kruzkov.

Published

2005

47. Quasi-neutral limit of the Euler-Poisson and Euler-Monge-Amp\`ere systems

Author

Loeper, Grégoire

Subjects

Mathematics - Analysis of PDEs, Mathematical Physics

Abstract

This paper studies the pressureless Euler-Poisson system and its fully non-linear counterpart, the Euler-Monge-Amp\`ere system, where the fully non-linear Monge-Amp\`ere equation substitutes for the linear Poisson equation. While the first is a model of plasma physics, the second is derived as a geometric approximation to the Euler incompressible equations. Using energy estimates, convergence of both systems to the Euler incompressible equations is proved.

Published

2005

48. The Inverse Problem for the Euler-Poisson system in Cosmology

Author

Loeper, G.

Subjects

Mathematics - Analysis of PDEs, Mathematical Physics, 35F20: 35J65

Abstract

The motion of a continuum of matter subject to gravitational interaction is classically described by the Euler-Poisson system. Prescribing the density of matter at initial and final times, we are able to obtain weak solutions for this equation by minimizing the action of the Lagrangian which is a convex functional. Then we see that such minimizing solutions are consistent with smooth solutions of the Euler-Poisson system and enjoy some special regularity properties. Meanwhile some intersting links with with Hamilton-Jacobi equations are found., Comment: 40 pages

Published

2003

49. On the regularity of the polar factorization for time dependent maps

Author

Loeper, G.

Subjects

Mathematics - Analysis of PDEs, 35j65

Abstract

We consider the polar factorization of vector valued mappings introduced by Y. Brenier. In the case of a family of mappings depending on a parameter. We investigate the regularity with respect to this parameter of the terms of the polar factorization by constructing some a priori bounds. To do so, we consider the linearization of the associated Monge-Ampere equation which we view as a conservation law., Comment: 17 pages

Published

2003

50. Reconstruction of the early Universe as a convex optimization problem

Author

Brenier, Y., Frisch, U., Henon, M., Loeper, G., Matarrese, S., Mohayaee, R., and Sobolevskii, A.

Subjects

Astrophysics, Condensed Matter, Mathematical Physics, Mathematics - Optimization and Control, Nonlinear Sciences - Pattern Formation and Solitons

Abstract

We show that the deterministic past history of the Universe can be uniquely reconstructed from the knowledge of the present mass density field, the latter being inferred from the 3D distribution of luminous matter, assumed to be tracing the distribution of dark matter up to a known bias. Reconstruction ceases to be unique below those scales -- a few Mpc -- where multi-streaming becomes significant. Above 6 Mpc/h we propose and implement an effective Monge-Ampere-Kantorovich method of unique reconstruction. At such scales the Zel'dovich approximation is well satisfied and reconstruction becomes an instance of optimal mass transportation, a problem which goes back to Monge (1781). After discretization into N point masses one obtains an assignment problem that can be handled by effective algorithms with not more than cubic time complexity in N and reasonable CPU time requirements. Testing against N-body cosmological simulations gives over 60% of exactly reconstructed points. We apply several interrelated tools from optimization theory that were not used in cosmological reconstruction before, such as the Monge-Ampere equation, its relation to the mass transportation problem, the Kantorovich duality and the auction algorithm for optimal assignment. Self-contained discussion of relevant notions and techniques is provided., Comment: 26 pages, 14 figures; accepted to MNRAS. Version 2: numerous minour clarifications in the text, additional material on the history of the Monge-Ampere equation, improved description of the auction algorithm, updated bibliography. Version 3: several misprints corrected

Published

2003