Exit Problems for Lévy and Markov Processes with One-Sided Jumps and Related Topics
Exit problems for one-dimensional Lévy processes are easier when jumps only occur in one direction. In the last few years, this intuition became more precise: we know now that a wide variety of identities for exit problems of spectrally-negative Lévy processes may be ergonomically expressed in terms...
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| Year of Publication: | 2021 |
| Language: | English |
| Physical Description: | 1 electronic resource (218 p.) |
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| 100 | 1 | |a Avram, Florin |4 edt | |
| 245 | 1 | 0 | |a Exit Problems for Lévy and Markov Processes with One-Sided Jumps and Related Topics |
| 260 | |a Basel, Switzerland |b MDPI - Multidisciplinary Digital Publishing Institute |c 2021 | ||
| 300 | |a 1 electronic resource (218 p.) | ||
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| 520 | |a Exit problems for one-dimensional Lévy processes are easier when jumps only occur in one direction. In the last few years, this intuition became more precise: we know now that a wide variety of identities for exit problems of spectrally-negative Lévy processes may be ergonomically expressed in terms of two q-harmonic functions (or scale functions or positive martingales) W and Z. The proofs typically require not much more than the strong Markov property, which hold, in principle, for the wider class of spectrally-negative strong Markov processes. This has been established already in particular cases, such as random walks, Markov additive processes, Lévy processes with omega-state-dependent killing, and certain Lévy processes with state dependent drift, and seems to be true for general strong Markov processes, subject to technical conditions. However, computing the functions W and Z is still an open problem outside the Lévy and diffusion classes, even for the simplest risk models with state-dependent parameters (say, Ornstein–Uhlenbeck or Feller branching diffusion with phase-type jumps). | ||
| 546 | |a English | ||
| 650 | 7 | |a Research & information: general |2 bicssc | |
| 650 | 7 | |a Mathematics & science |2 bicssc | |
| 653 | |a Lévy processes | ||
| 653 | |a non-random overshoots | ||
| 653 | |a skip-free random walks | ||
| 653 | |a fluctuation theory | ||
| 653 | |a scale functions | ||
| 653 | |a capital surplus process | ||
| 653 | |a dividend payment | ||
| 653 | |a optimal control | ||
| 653 | |a capital injection constraint | ||
| 653 | |a spectrally negative Lévy processes | ||
| 653 | |a reflected Lévy processes | ||
| 653 | |a first passage | ||
| 653 | |a drawdown process | ||
| 653 | |a spectrally negative process | ||
| 653 | |a dividends | ||
| 653 | |a de Finetti valuation objective | ||
| 653 | |a variational problem | ||
| 653 | |a stochastic control | ||
| 653 | |a optimal dividends | ||
| 653 | |a Parisian ruin | ||
| 653 | |a log-convexity | ||
| 653 | |a barrier strategies | ||
| 653 | |a adjustment coefficient | ||
| 653 | |a logarithmic asymptotics | ||
| 653 | |a quadratic programming problem | ||
| 653 | |a ruin probability | ||
| 653 | |a two-dimensional Brownian motion | ||
| 653 | |a spectrally negative Lévy process | ||
| 653 | |a general tax structure | ||
| 653 | |a first crossing time | ||
| 653 | |a joint Laplace transform | ||
| 653 | |a potential measure | ||
| 653 | |a Laplace transform | ||
| 653 | |a first hitting time | ||
| 653 | |a diffusion-type process | ||
| 653 | |a running maximum and minimum processes | ||
| 653 | |a boundary-value problem | ||
| 653 | |a normal reflection | ||
| 653 | |a Sparre Andersen model | ||
| 653 | |a heavy tails | ||
| 653 | |a completely monotone distributions | ||
| 653 | |a error bounds | ||
| 653 | |a hyperexponential distribution | ||
| 653 | |a reflected Brownian motion | ||
| 653 | |a linear diffusions | ||
| 653 | |a drawdown | ||
| 653 | |a Segerdahl process | ||
| 653 | |a affine coefficients | ||
| 653 | |a spectrally negative Markov process | ||
| 653 | |a hypergeometric functions | ||
| 653 | |a capital injections | ||
| 653 | |a bankruptcy | ||
| 653 | |a reflection and absorption | ||
| 653 | |a Pollaczek–Khinchine formula | ||
| 653 | |a scale function | ||
| 653 | |a Padé approximations | ||
| 653 | |a Laguerre series | ||
| 653 | |a Tricomi–Weeks Laplace inversion | ||
| 776 | |z 3-03928-458-4 | ||
| 776 | |z 3-03928-459-2 | ||
| 700 | 1 | |a Avram, Florin |4 oth | |
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