Book contents
- Frontmatter
- Contents
- Preface
- Chapter I Types of convergence
- Chapter II Martingale convergence theorems
- Chapter III Sub – and supermartingale convergence theorems
- Chapter IV Basic inequalities for adapted sequences
- Chapter V Convergence of generalized martingales in Banach spaces – the mean way
- Chapter VI General directed index sets and applications of amart theory
- Chapter VII Disadvantages of amarts. Convergence of generalized martingales in Banach spaces – the pointwise way
- Chapter VIII Convergence of generalized sub – and super – martingales in Banach lattices
- Chapter IX Closing remarks
- References
- List of notations
- Subject index
Book contents
- Frontmatter
- Contents
- Preface
- Chapter I Types of convergence
- Chapter II Martingale convergence theorems
- Chapter III Sub – and supermartingale convergence theorems
- Chapter IV Basic inequalities for adapted sequences
- Chapter V Convergence of generalized martingales in Banach spaces – the mean way
- Chapter VI General directed index sets and applications of amart theory
- Chapter VII Disadvantages of amarts. Convergence of generalized martingales in Banach spaces – the pointwise way
- Chapter VIII Convergence of generalized sub – and super – martingales in Banach lattices
- Chapter IX Closing remarks
- References
- List of notations
- Subject index
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- Stopping Time Techniques for Analysts and Probabilists , pp. v - viiiPublisher: Cambridge University PressPrint publication year: 1984