eBook - ePub
Listed Volatility and Variance Derivatives
A Python-based Guide
Yves Hilpisch
This is a test
- English
- ePUB (handyfreundlich)
- Über iOS und Android verfügbar
eBook - ePub
Listed Volatility and Variance Derivatives
A Python-based Guide
Yves Hilpisch
Angaben zum Buch
Buchvorschau
Inhaltsverzeichnis
Quellenangaben
Über dieses Buch
Leverage Python for expert-level volatility and variance derivative trading
Listed Volatility and Variance Derivatives is a comprehensive treatment of all aspects of these increasingly popular derivatives products, and has the distinction of being both the first to cover European volatility and variance products provided by Eurex and the first to offer Python code for implementing comprehensive quantitative analyses of these financial products. For those who want to get started right away, the book is accompanied by a dedicated Web page and a Github repository that includes all the code from the book for easy replication and use, as well as a hosted version of all the code for immediate execution.
Python is fast making inroads into financial modelling and derivatives analytics, and recent developments allow Python to be as fast as pure C++ or C while consisting generally of only 10% of the code lines associated with the compiled languages. This complete guide offers rare insight into the use of Python to undertake complex quantitative analyses of listed volatility and variance derivatives.
- Learn how to use Python for data and financial analysis, and reproduce stylised facts on volatility and variance markets
- Gain an understanding of the fundamental techniques of modelling volatility and variance and the model-free replication of variance
- Familiarise yourself with micro structure elements of the markets for listed volatility and variance derivatives
- Reproduce all results and graphics with IPython/Jupyter Notebooks and Python codes that accompany the book
Listed Volatility and Variance Derivatives is the complete guide to Python-based quantitative analysis of these Eurex derivatives products.
Häufig gestellte Fragen
Wie kann ich mein Abo kündigen?
Gehe einfach zum Kontobereich in den Einstellungen und klicke auf „Abo kündigen“ – ganz einfach. Nachdem du gekündigt hast, bleibt deine Mitgliedschaft für den verbleibenden Abozeitraum, den du bereits bezahlt hast, aktiv. Mehr Informationen hier.
(Wie) Kann ich Bücher herunterladen?
Derzeit stehen all unsere auf Mobilgeräte reagierenden ePub-Bücher zum Download über die App zur Verfügung. Die meisten unserer PDFs stehen ebenfalls zum Download bereit; wir arbeiten daran, auch die übrigen PDFs zum Download anzubieten, bei denen dies aktuell noch nicht möglich ist. Weitere Informationen hier.
Welcher Unterschied besteht bei den Preisen zwischen den Aboplänen?
Mit beiden Aboplänen erhältst du vollen Zugang zur Bibliothek und allen Funktionen von Perlego. Die einzigen Unterschiede bestehen im Preis und dem Abozeitraum: Mit dem Jahresabo sparst du auf 12 Monate gerechnet im Vergleich zum Monatsabo rund 30 %.
Was ist Perlego?
Wir sind ein Online-Abodienst für Lehrbücher, bei dem du für weniger als den Preis eines einzelnen Buches pro Monat Zugang zu einer ganzen Online-Bibliothek erhältst. Mit über 1 Million Büchern zu über 1.000 verschiedenen Themen haben wir bestimmt alles, was du brauchst! Weitere Informationen hier.
Unterstützt Perlego Text-zu-Sprache?
Achte auf das Symbol zum Vorlesen in deinem nächsten Buch, um zu sehen, ob du es dir auch anhören kannst. Bei diesem Tool wird dir Text laut vorgelesen, wobei der Text beim Vorlesen auch grafisch hervorgehoben wird. Du kannst das Vorlesen jederzeit anhalten, beschleunigen und verlangsamen. Weitere Informationen hier.
Ist Listed Volatility and Variance Derivatives als Online-PDF/ePub verfügbar?
Ja, du hast Zugang zu Listed Volatility and Variance Derivatives von Yves Hilpisch im PDF- und/oder ePub-Format sowie zu anderen beliebten Büchern aus Business & Finanza. Aus unserem Katalog stehen dir über 1 Million Bücher zur Verfügung.
Part One
Introduction to Volatility and Variance
CHAPTER 1
Derivatives, Volatility and Variance
The first chapter provides some background information for the rest of the book. It mainly covers concepts and notions of importance for later chapters. In particular, it shows how the delta hedging of options is connected with variance swaps and futures. It also discusses different notions of volatility and variance, the history of traded volatility and variance derivatives as well as why Python is a good choice for the analysis of such instruments.
1.1 Option Pricing and Hedging
In the Black-Scholes-Merton (1973) benchmark model for option pricing, uncertainty with regard to the single underlying risk factor S (stock price, index level, etc.) is driven by a geometric Brownian motion with stochastic differential equation (SDE)
Throughout we may think of the risk factor as being a stock index paying no dividends. St is then the level of the index at time t, μ the constant drift, σ the instantaneous volatility and Zt is a standard Brownian motion. In a risk-neutral setting, the drift μ is replaced by the (constant) risk-less short rate r
In addition to the index which is assumed to be directly tradable, there is also a risk-less bond B available for trading. It satisfies the differential equation
In this model, it is possible to derive a closed pricing formula for a vanilla European call option C maturing at some future date T with payoff max [ST − K, 0], K being the fixed strike price. It is
where
The price of a vanilla European put option P with payoff max [K − ST, 0] is determined by put-call parity as
There are multiple ways to derive this famous Black-Scholes-Merton formula. One way relies on the construction of a portfolio comprised of the index and the risk-less bond that perfectly replicates the option payoff at maturity. To avoid risk-less arbitrage, the value of the option must equal the payoff of the replicating portfolio. Another method relies on calculating the risk-neutral expectation of the option payoff at maturity and discounting it back to the present by the risk-neutral short rate. For detailed explanations of these approaches refer, for example, to Björk (2009).
Yet another way, which we want to look at in a bit more detail, is to perfectly hedge the risk resulting from an option (e.g. from the point of view of a seller of the option) by dynamically trading the index and the risk-less bond. This approach is usually called delta hedging (see Sinclair (2008), ch. 1). The delta of a European call option is given by the first partial derivative of the pricing...
Inhaltsverzeichnis
- Cover
- Title Page
- Copyright
- Dedication
- Preface
- Part One: Introduction to Volatility and Variance
- Part Two: Listed Volatility Derivatives
- Part Three: Listed Variance Derivatives
- Part Four: DX Analytics
- Bibliography
- Index
- EULA
Zitierstile für Listed Volatility and Variance Derivatives
APA 6 Citation
Hilpisch, Y. (2016). Listed Volatility and Variance Derivatives (1st ed.). Wiley. Retrieved from https://www.perlego.com/book/996445/listed-volatility-and-variance-derivatives-a-pythonbased-guide-pdf (Original work published 2016)
Chicago Citation
Hilpisch, Yves. (2016) 2016. Listed Volatility and Variance Derivatives. 1st ed. Wiley. https://www.perlego.com/book/996445/listed-volatility-and-variance-derivatives-a-pythonbased-guide-pdf.
Harvard Citation
Hilpisch, Y. (2016) Listed Volatility and Variance Derivatives. 1st edn. Wiley. Available at: https://www.perlego.com/book/996445/listed-volatility-and-variance-derivatives-a-pythonbased-guide-pdf (Accessed: 14 October 2022).
MLA 7 Citation
Hilpisch, Yves. Listed Volatility and Variance Derivatives. 1st ed. Wiley, 2016. Web. 14 Oct. 2022.