Ruihan GuoSchool of Mathematics and Statistics, Zhengzhou UniversityYinhua XiaSchool of Mathematical Sciences, University of Science and Technology of ChinaYan XuSchool of Mathematical Sciences, University of Science and Technology of China
Numerical Analysis and Scientific Computingmathscidoc:1703.25002
Niels ArleyInstitute of Theoretical Physics of the University of Copenhagen, Copenhagen, The NetherlandVibeke BorchseniusInstitute of Theoretical Physics of the University of Copenhagen, Copenhagen, The Netherland
Kendall D G. Stochastic Processes and Population Growth[C]., 1977: 465-468.
2
Richard D Gill · Soren Johansen. A Survey of Product-Integration with a View Toward Application in Survival Analysis. 1990.
3
Silverman E, Kot M. Rate Estimation for a Simple Movement Model[J]. Bulletin of Mathematical Biology, 2000, 62(2): 351-375.
4
Goodman L A. The probabilities of extinction for birth-and-death processes that are age-dependent or phase-dependent[J]. Biometrika, 1967, 54(3): 579-596.
5
Lucas Jodar. Explicit solutions for second order operator differential equations with two boundary-value conditions. II. 1992.
6
Darbha S, Rajagopal K R. Aggregation of a class of interconnected, linear dynamical systems[J]. Systems \u0026 Control Letters, 2001, 43(5): 387-401.
7
Jodar L. Explicit expressions for Sturm-Liouville operator problems[J]. Proceedings of The Edinburgh Mathematical Society, 1987, 30(02): 301-309.
8
Drake J M, Shapiro J, Griffen B D, et al. Experimental demonstration of a two-phase population extinction hazard[J]. Journal of the Royal Society Interface, 2011, 8(63): 1472-1479.
9
Arley N. On the general birth-and-death-with-immigration stochastic process[J]. Scandinavian Actuarial Journal, 2011: 175-182.
10
Darbha S, Rajagopal K R. Aggregation of a class of linear, interconnected dynamical systems[C]. american control conference, 1999: 1496-1501.
Alexander Borichev · Ha Kan Hedenmalm. Harmonic functions of maximal growth: invertibility and cyclicity in Bergman spaces. 1997.
3
Bell S R, Boas H P. Regularity of the Bergman projection and duality of holomorphic function spaces[J]. Mathematische Annalen, 1984, 267(4): 473-478.
4
Korenblum B. Cyclic elements in some spaces of analytic functions[J]. Bulletin of the American Mathematical Society, 1981, 5(3): 317-318.
5
Shields A L. Cyclic Vectors in Banach Spaces of Analytic Functions[C]., 1985: 315-349.
6
Leon Brown · Boris Korenblum. Cyclic vectors in. 1988.
7
Korenblum B. A generalization of two classical convergence tests for Fourier series, and some new Banach spaces of functions[J]. Bulletin of the American Mathematical Society, 1983, 9(2): 215-218.
8
Korenblum B. On a class of Banach spaces of functions associated with the notion of entropy[J]. Transactions of the American Mathematical Society, 1985, 290(2): 527-553.
9
S N Melikhov. (DFS)-spaces of holomorphic functions invariant under differentiation. 2004.
10
Khoi L H, Thomas P. Weakly sufficient sets for A−∞(D)[J]. Publicacions Matematiques, 1998, 42(2): 435-448.
Stochastic proofs of the Beurling projection theorem and the Hall projection theorem for harmonic measure are given. Some$d$-dimensional versions (for all$d$>1) which follow from this