Q2B 2020 | BBVA Quantum-Ready journey, towards a Corporate Quantum Mindset
Quantum Credit Journey: Building an Internal Quantum Mindset
Introduction to Quantum Credit Journey
- The speaker introduces the topic of their quantum credit journey, emphasizing the collaboration between the research team and other departments to foster an internal quantum mindset.
- Initial focus was on understanding quantum computing's potential, with a scouting phase that assessed state-of-the-art technologies.
Discovery Phase and Problem Identification
- After determining a high probability (70-80%) for impactful outcomes from quantum computing within three years, they moved into the discovery phase.
- Formation of a dedicated research team began, focusing on identifying key problems to solve while considering their impact on profit and loss (P&L).
Collaboration and Integration
- The organization is now in phase three of its quantum journey, aiming to understand end-to-end processes for implementing solutions in production.
- A collaborative structure was established, referred to as an "onion" or "molecule" model, integrating various business units and engineering teams.
Agnostic Approach to Hardware
- Emphasis on being agnostic regarding hardware choices due to uncertainty about future winners in technology; focus remains on software and models instead.
- Partnerships with research centers aim at exploring new financial applications using quantum models without bias towards specific backends.
Understanding Exponential Problems in Finance
Introduction by Scholastico Sanchez
- Scholastico Sanchez introduces himself as a mathematician who transitioned into finance following significant market events like the bankruptcy of Long-Term Capital Management.
Key Questions Addressed
- Three critical questions guide their research:
- What problem are we dealing with?
- How do we currently address these problems?
- What capabilities can we develop in quantum computing?
Focus on Exponential Problems
- Discussion revolves around exponential problems in finance, specifically referencing MP-hard problems related to pricing options under varying market conditions.
Market Dynamics Explained
- Explanation of how price movements affect volatility; practitioners recognize that rising prices typically correlate with declining volatility and vice versa.
Quantum Computing: Understanding Its Advantages
Introduction to Quantum Computing
- The speaker discusses the limitations of classical computing when faced with complex calculations involving numerous factors, emphasizing that quantum computing can handle these challenges more efficiently.
- Key properties of quantum computing are introduced: superposition and entanglement, which allow for advanced mathematical manipulations through tensor products of vector spaces.
Applications in Business Lines
- The organization has explored various business lines including asset management and corporate investment banking, identifying high-volume problems suitable for quantum solutions.
- A scientific deductive method is applied in three phases: data collection, hypothesis formulation (quantum advantage in optimization and Monte Carlo simulations), and proof of concept development.
Proof of Concept in Optimization
- Six proofs of concept have been completed focusing on optimization and Monte Carlo simulations, filtering over 10 identified problems based on feasibility and impact.
- One example discussed is dynamic portfolio optimization, which considers maximizing returns while minimizing risks, transaction costs, and fees across a large dataset.
Results from Portfolio Optimization
- A significant achievement includes optimizing a portfolio with 52 assets over eight years of daily data using quantum methods, yielding impressive results compared to classical computing standards.
- The results indicate a Sharpe ratio of 12 for one optimized portfolio, suggesting substantial potential returns against minimal risk tolerance.
Further Developments in Corporate Investment Banking
- Another proof of concept focuses on valuing financial products with credit value adjustments (CVA), developed collaboratively with Zapata Computing.
- This project addresses the complexities involved in pricing derivatives that depend on underlying financial assets like currencies or bonds.
Challenges in Financial Product Valuation
- The valuation process must consider counterparty risks post the 2008 crisis; this has led to increased regulatory scrutiny regarding CVA adjustments.
- Calculating CVA involves high-dimensional integration challenges typically difficult for classical computers but manageable through Monte Carlo methods.
Utilizing Monte Carlo Methods
- Monte Carlo methods are highlighted as essential computational algorithms that utilize random sampling for numerical estimations necessary for financial product evaluations.
- These methods face scaling issues related to accuracy due to fundamental limitations imposed by the central limit theorem affecting classical algorithms.
Quantum Computing and Monte Carlo Methods
Quantum Computing as a Solution
- Quantum computing presents an alternative to enhance the classical cost of scaling in Monte Carlo methods, particularly through quantum amplitude estimation.
- A classical algorithm requiring n steps for parameter estimation can be executed by a quantum algorithm in O(sqrtn) steps, demonstrating a near quadratic speedup over classical algorithms for specific problems.
Implications of Speedup
- For large values of n , such as billions, the difference between n and O(sqrtn) becomes significant, leading to substantial reductions in time and resource requirements for business applications.
Current Limitations
- Despite the potential advantages, current quantum devices are not suitable for near-term applications due to their inability to run deep circuits effectively.
Collaborative Efforts and Research Goals
- The partnership with Apata Computing aims to explore quantum techniques like quantum amplitude estimation and engineered liquid function techniques for credit value adjustment (CVA).
- The primary objective is to assess whether these techniques can provide advantages using noisy quantum devices while evaluating necessary hardware and computational resources.
Future Directions
- Positive experiences from this research have led to ongoing work on a paper that will detail results related to CVA estimates and analyze quantum speedup concerning noise and error parameters.