Quantum computers are not yet up to the task of providing computational advantages for practical stochastic diffusion models commonly used by financial analysts. In this paper we introduce a class of stochastic processes that are both realistic in terms of mimicking financial market risks as well as more amenable to potential quantum computational advantages. The type of models we study are based on a regime switching volatility model driven by a Markov chain with observable states. The basic model features a Geometric Brownian Motion with drift and volatility parameters determined by the finite states of a Markov chain. We study algorithms to estimate credit risk and option pricing on a gate-based quantum computer. These models bring us cl...
Abstract. Quantum effects are a natural phenomenon and just like evo-lution, or immune systems, can ...
The famous least squares Monte Carlo (LSM) algorithm combines linear least square regression with Mo...
Quantum theory is used to model secondary financial markets. Contrary to stochastic descriptions, th...
Inspired by recent progress in quantum algorithms for ordinary and partial differential equations, w...
Quantum computers are expected to surpass the computational capabilities of classical computers duri...
Recently there has been increased interest on quantum algorithms and how they are applied to real li...
We introduce a quantum algorithm to compute the market risk of financial derivatives. Previous work ...
Quantum Computing commenced in 1980’s with the pioneering work of Paul Benioff (Benioff, 1980) who p...
Quantum computers have the potential to increase the solution speed for many computational problems....
The famous least squares Monte Carlo (LSM) algorithm combines linear least square regression with Mo...
A derivative is a financial security whose value is a function of underlying traded assets and marke...
49 pages, 4 figuresQuantum computers are expected to have substantial impact on the finance industry...
Pricing interest-rate financial derivatives is a major problem in finance, in which it is crucial to...
This is the final version. Available from Wiley via the DOI in this record. Data Availability Statem...
This thesis explains the challenges that arise when pricing financial derivative contracts and how ...
Abstract. Quantum effects are a natural phenomenon and just like evo-lution, or immune systems, can ...
The famous least squares Monte Carlo (LSM) algorithm combines linear least square regression with Mo...
Quantum theory is used to model secondary financial markets. Contrary to stochastic descriptions, th...
Inspired by recent progress in quantum algorithms for ordinary and partial differential equations, w...
Quantum computers are expected to surpass the computational capabilities of classical computers duri...
Recently there has been increased interest on quantum algorithms and how they are applied to real li...
We introduce a quantum algorithm to compute the market risk of financial derivatives. Previous work ...
Quantum Computing commenced in 1980’s with the pioneering work of Paul Benioff (Benioff, 1980) who p...
Quantum computers have the potential to increase the solution speed for many computational problems....
The famous least squares Monte Carlo (LSM) algorithm combines linear least square regression with Mo...
A derivative is a financial security whose value is a function of underlying traded assets and marke...
49 pages, 4 figuresQuantum computers are expected to have substantial impact on the finance industry...
Pricing interest-rate financial derivatives is a major problem in finance, in which it is crucial to...
This is the final version. Available from Wiley via the DOI in this record. Data Availability Statem...
This thesis explains the challenges that arise when pricing financial derivative contracts and how ...
Abstract. Quantum effects are a natural phenomenon and just like evo-lution, or immune systems, can ...
The famous least squares Monte Carlo (LSM) algorithm combines linear least square regression with Mo...
Quantum theory is used to model secondary financial markets. Contrary to stochastic descriptions, th...