Transition probability density functions (TPDFs) are fundamental to computational finance, including option pricing and hedging. Advancing recent work in deep learning, we develop novel neural TPDF generators through solving backward Kolmogorov equations in parametric space for cumulative probability functions. The generators are ultra-fast, very accurate and can be trained for any asset model described by stochastic differential equations. These are "single solve", so they do not require retraining when parameters of the stochastic model are changed (e.g. recalibration of volatility). Once trained, the neural TDPF generators can be transferred to less powerful computers where they can be used for e.g. option pricing at speeds as fast as if...
We discuss a novel strategy for training neural networks using sequential Monte Carlo algorithms and...
Nowadays many financial derivatives, such as American or Bermudan options, are of early exercise typ...
We propose an accurate data-driven numerical scheme to solve stochastic differential equations (SDEs...
Transition probability density functions (TPDFs) are fundamental to computational finance, including...
In this research, we consider neural network-algorithms for option pricing. We use the Black-Scholes...
We study neural network approximation of the solution to boundary value problem for Black-Scholes-Me...
We develop an unsupervised deep learning method to solve the barrier options under the Bergomi model...
This paper proposes a new approach to pricing European options using deep learning techniques under ...
to appear in Machine Learning And Data Sciences For Financial Markets: A Guide To Contemporary Pract...
There is a growing number of applications of machine learning and deep learning in quantitative and ...
Machine learning and deep learning have realized incredible success in areas such as computer vision...
39 pages, 14 figuresInternational audienceThis paper presents several numerical applications of deep...
Models trained under assumptions in the complete market usually don't take effect in the incomplete ...
In this work we apply Recursive Neural Networks in finance, namely we use Recursive Neural Networks ...
This paper gives an overview of the research that has been conducted regarding neural networks in op...
We discuss a novel strategy for training neural networks using sequential Monte Carlo algorithms and...
Nowadays many financial derivatives, such as American or Bermudan options, are of early exercise typ...
We propose an accurate data-driven numerical scheme to solve stochastic differential equations (SDEs...
Transition probability density functions (TPDFs) are fundamental to computational finance, including...
In this research, we consider neural network-algorithms for option pricing. We use the Black-Scholes...
We study neural network approximation of the solution to boundary value problem for Black-Scholes-Me...
We develop an unsupervised deep learning method to solve the barrier options under the Bergomi model...
This paper proposes a new approach to pricing European options using deep learning techniques under ...
to appear in Machine Learning And Data Sciences For Financial Markets: A Guide To Contemporary Pract...
There is a growing number of applications of machine learning and deep learning in quantitative and ...
Machine learning and deep learning have realized incredible success in areas such as computer vision...
39 pages, 14 figuresInternational audienceThis paper presents several numerical applications of deep...
Models trained under assumptions in the complete market usually don't take effect in the incomplete ...
In this work we apply Recursive Neural Networks in finance, namely we use Recursive Neural Networks ...
This paper gives an overview of the research that has been conducted regarding neural networks in op...
We discuss a novel strategy for training neural networks using sequential Monte Carlo algorithms and...
Nowadays many financial derivatives, such as American or Bermudan options, are of early exercise typ...
We propose an accurate data-driven numerical scheme to solve stochastic differential equations (SDEs...