--- product_id: 31057282 title: "Financial Calculus: An Introduction to Derivative Pricing" price: "£60.63" currency: GBP in_stock: true reviews_count: 13 url: https://www.desertcart.co.uk/products/31057282-financial-calculus-an-introduction-to-derivative-pricing store_origin: GB region: United Kingdom --- # Comprehensive derivative pricing models Clear progression from discrete to continuous math Same-day dispatch before noon Financial Calculus: An Introduction to Derivative Pricing **Price:** £60.63 **Availability:** ✅ In Stock ## Summary > 📊 Decode Derivatives, Dominate Markets! ## Quick Answers - **What is this?** Financial Calculus: An Introduction to Derivative Pricing - **How much does it cost?** £60.63 with free shipping - **Is it available?** Yes, in stock and ready to ship - **Where can I buy it?** [www.desertcart.co.uk](https://www.desertcart.co.uk/products/31057282-financial-calculus-an-introduction-to-derivative-pricing) ## Best For - Customers looking for quality international products ## Why This Product - Free international shipping included - Worldwide delivery with tracking - 15-day hassle-free returns ## Key Features - • **Fast & Reliable Delivery:** Order before noon and get same-day dispatch—because your career can’t wait. - • **Trusted Quality & Service:** New mint condition with guaranteed packaging and hassle-free returns for peace of mind. - • **Bridge Theory and Practice:** Learn how stochastic differential equations and Black-Scholes models power real-world derivative pricing. - • **Master the Math of Markets:** From binomial trees to Brownian motion, grasp the core of financial calculus with clarity. - • **Accelerate Your Learning Curve:** Perfect intro for finance pros ready to level up with rigorous yet accessible explanations. ## Overview Financial Calculus: An Introduction to Derivative Pricing is a highly rated, rigorous yet accessible guide that covers the mathematical foundations and practical applications of derivative pricing models. It systematically explains discrete and continuous stochastic processes, including Brownian motion and the Black-Scholes equation, making it an essential resource for finance professionals and advanced students aiming to master financial mathematics. The book ships new and mint condition with fast dispatch and guaranteed packaging. ## Description Here is the first rigorous and accessible account of the mathematics behind the pricing, construction, and hedging of derivative securities. With mathematical precision and in a style tailored for market practioners, the authors describe key concepts such as martingales, change of measure, and the Heath-Jarrow-Morton model. Starting from discrete-time hedging on binary trees, the authors develop continuous-time stock models (including the Black-Scholes method). They stress practicalities including examples from stock, currency and interest rate markets, all accompanied by graphical illustrations with realistic data. The authors provide a full glossary of probabilistic and financial terms. Review: First rate guide to financial calculus! - I view this text as a complete outline or guide to the mathematics and ideas of financial calculus and derivative pricing.This is not meant disparagingly. The progression of concepts is clearly explained which is what the authors purport to do. Though discrete processes are discussed involving for instance binomial coefficients (combinations) in the beginning as examples, the real meat of the subject lies in probability applied to continuous processes. Hence knowledge of measure theoretic probability and martingales is required to rigorously complete the arguments. Brownian motion is used to model market fluctuation which stems from ideas of Bachelier. This motion has a Gaussian distribution as discovered by the eclectic genius of Einstein who had the insight to apply the heat equation in his solution. It models noise for instance in electrical engineering. Any differential equation containing this distribution term is referred to as a stochastic differential equation. A solution of it is called a diffusion. A systematic theory of these was developed by Ito with his so-called Ito calculus. The Black-Scholes equation which takes this Brownian motion fluctuation into account which ultimately lets you balance out risk is developed in the text. This equation surprisingly (or not!) is equivalent to the heat equation (there are numerous derivations of this on the web). The solution of the heat equation expressed as an integral has the Gaussian distribution as kernel or weight (Well how about that! Full circle.). As an aside this heat equation equivalence allows Black -Scholes to be solved by finite element methods with financial constraints on the boundaries if the integral proves difficult or not in closed form. The authors recommend the text Probability with Martingales (Cambridge Mathematical Textbooks) for the measure theoretic probability as well as measure theory and martingales. This goes for me too. In this text the Lebesgue integral is first developed through construction of a probability distribution on the unit interval with the use of Caratheodory's Extension Theorem (Williams proves this in an appendix) then a trivial extension to the real line. Elegant-even easier! First rate guide to financial calculus! Review: Good intro to the math and pricing models - Okay this is an intro, but you should have at least an understanding of Calculus. The purpose of this book is not to teach the fundamentals of the math, it teachs the financial pricing theorems, how they are applied to various assets and derivitives, and how to apply it to larger models. The authors provide a very clear foundation of both discrete and continous processes. From Binomial to Brownian motion, this book packs in alot of material. In the later chapters the authors cover the various derivative and asset pricing models, which really puts everything together in a context which will show you how to apply everything. There is clear instruction for the novice in finance. The only real issue I have with this book is that it does cover alot, but is not everything you will ever need to know. But it is a great intro which will enable you to move onto the advanced books on the subject. ## Features - New - Mint Condition - Dispatch same day for order received before 12 noon - Guaranteed packaging - No quibbles returns ## Technical Specifications | Specification | Value | |---------------|-------| | Best Sellers Rank | #1,102,475 in Books ( See Top 100 in Books ) #507 in Statistics (Books) #694 in Calculus (Books) #1,049 in Probability & Statistics (Books) | | Customer Reviews | 4.3 out of 5 stars 66 Reviews | ## Images ![Financial Calculus: An Introduction to Derivative Pricing - Image 1](https://m.media-amazon.com/images/I/71fgEyYjRkL.jpg) ## Customer Reviews ### ⭐⭐⭐⭐⭐ First rate guide to financial calculus! *by P***K on January 29, 2016* I view this text as a complete outline or guide to the mathematics and ideas of financial calculus and derivative pricing.This is not meant disparagingly. The progression of concepts is clearly explained which is what the authors purport to do. Though discrete processes are discussed involving for instance binomial coefficients (combinations) in the beginning as examples, the real meat of the subject lies in probability applied to continuous processes. Hence knowledge of measure theoretic probability and martingales is required to rigorously complete the arguments. Brownian motion is used to model market fluctuation which stems from ideas of Bachelier. This motion has a Gaussian distribution as discovered by the eclectic genius of Einstein who had the insight to apply the heat equation in his solution. It models noise for instance in electrical engineering. Any differential equation containing this distribution term is referred to as a stochastic differential equation. A solution of it is called a diffusion. A systematic theory of these was developed by Ito with his so-called Ito calculus. The Black-Scholes equation which takes this Brownian motion fluctuation into account which ultimately lets you balance out risk is developed in the text. This equation surprisingly (or not!) is equivalent to the heat equation (there are numerous derivations of this on the web). The solution of the heat equation expressed as an integral has the Gaussian distribution as kernel or weight (Well how about that! Full circle.). As an aside this heat equation equivalence allows Black -Scholes to be solved by finite element methods with financial constraints on the boundaries if the integral proves difficult or not in closed form. The authors recommend the text Probability with Martingales (Cambridge Mathematical Textbooks) for the measure theoretic probability as well as measure theory and martingales. This goes for me too. In this text the Lebesgue integral is first developed through construction of a probability distribution on the unit interval with the use of Caratheodory's Extension Theorem (Williams proves this in an appendix) then a trivial extension to the real line. Elegant-even easier! First rate guide to financial calculus! ### ⭐⭐⭐⭐ Good intro to the math and pricing models *by M***C on February 6, 2012* Okay this is an intro, but you should have at least an understanding of Calculus. The purpose of this book is not to teach the fundamentals of the math, it teachs the financial pricing theorems, how they are applied to various assets and derivitives, and how to apply it to larger models. The authors provide a very clear foundation of both discrete and continous processes. From Binomial to Brownian motion, this book packs in alot of material. In the later chapters the authors cover the various derivative and asset pricing models, which really puts everything together in a context which will show you how to apply everything. There is clear instruction for the novice in finance. The only real issue I have with this book is that it does cover alot, but is not everything you will ever need to know. But it is a great intro which will enable you to move onto the advanced books on the subject. ### ⭐⭐⭐⭐⭐ Excellent introduction *by A***R on November 7, 2007* I think this is one of the best introductions to mathematical finance around. Unfortunately, the book was out of print when I taught the subject, so I never got to test it as a textbook. In particular I really like chapter 2, where the authors introduce the key concepts in discrete time binomial processes. This allow them to introduce deep concepts like information and filtration in an understandable manner, while few students really understand measurability. (If you think that is a trivial idea from stochastic analysis, you may want to go for another textbook.) The binomial representation theorem is almost trivial, but show what the general version, the martingale representation theorem is all about, and why it is so useful. Similarly, the Cameron Martin Girsanov is heavy stuff in continuous time, but the idea is simple for binomial processes. I guess a lot of students will understand what the theorem i all about for the first time when they se the binomial version. The book then goes on to generalize all these ideas to continuous time and space, but with somewhat less mathematical formalism than many other books. ## Frequently Bought Together - Financial Calculus: An Introduction to Derivative Pricing - Options, Futures, and Other Derivatives, Global Edition - Stochastic Calculus for Finance I: The Binomial Asset Pricing Model (Springer Finance) --- ## Why Shop on Desertcart? - 🛒 **Trusted by 1.3+ Million Shoppers** — Serving international shoppers since 2016 - 🌍 **Shop Globally** — Access 737+ million products across 21 categories - 💰 **No Hidden Fees** — All customs, duties, and taxes included in the price - 🔄 **15-Day Free Returns** — Hassle-free returns (30 days for PRO members) - 🔒 **Secure Payments** — Trusted payment options with buyer protection - ⭐ **TrustPilot Rated 4.5/5** — Based on 8,000+ happy customer reviews **Shop now:** [https://www.desertcart.co.uk/products/31057282-financial-calculus-an-introduction-to-derivative-pricing](https://www.desertcart.co.uk/products/31057282-financial-calculus-an-introduction-to-derivative-pricing) --- *Product available on Desertcart United Kingdom* *Store origin: GB* *Last updated: 2026-06-03*