Lecture on diffusion processes on nested fractals

1. Barlow, M.T., and R.F. Bass, The construction of Brownian motion on the Sierpinski carpet, Ann. Inst. H. Poincaré, Prob. et Stat. 25(1989), 225–258.

   MathSciNet  MATH  Google Scholar 

2. Barlow, M.T., and R.F. Bass, Local times for Brownian motion on the Sierpinski carpet, to appear in Prob. Theo. Rel. Fields.

   Google Scholar 

3. Barlow, M.T., R.F. Bass, and J. D. Sherwood, Resistence and spectral dimension of Sierpinski carpets, Preprint.

   Google Scholar 

4. Barlow, M.T., and E.A. Perkins, Brownian motion on the Sierpinski gasket, Prob. Theo. Rel. Fields 79 (1988), 543–624.

   Article  MathSciNet  MATH  Google Scholar 

5. Falconer, K.J., The geometry of fractal sets, Cambridge University Press, Cambridge, 1985.

   Book  MATH  Google Scholar 

6. Feder, J., Fractals, Plenum Publishing Company, New York-London, 1988.

   Book  MATH  Google Scholar 

7. Fukushima, M., Dirichlet forms and Markov Processes, North-Holland/Kodansha, Amsterdam/Tokyo, 1980.

   MATH  Google Scholar 

8. Fukushima, M., and Shima T., On a spectral analysis for the Sierpinski gasket, Preprint.

   Google Scholar 

9. Goldstein, S., Random walks and diffusions on fractals, Percolation theory and ergodic theory of infinite particle systems (Minneapolis, Minn., 1984–85), pp. 121–129, IMA Vol. Math. Appl. 8, Springer, New York-Berlin, 1987.

   Book  Google Scholar 

10. Hattori, K., T. Hattori, and S. Kusuoka, Self-avoiding random walk on the Sierpinski gasket, Prob. Theo. Rel. Fields 84 (1990) 1–26.

    Article  MathSciNet  MATH  Google Scholar 

11. Hattori, K., T. Hattori, and H. Watanabe, Gaussian fields theories on general networks and the spectral dimensions, Progress Theo. Physics Suppl. 92 (1987), 108–143.

    Article  MathSciNet  Google Scholar 

12. Hutchinson: Fractals and self-similarity, Indiana Univ. Math. J. 30 (1981), 713–747.

    Article  MathSciNet  MATH  Google Scholar 

13. Kigami, J., A harmonic calculus on the Sirpinski spaces, Japan J. Appl. Math. 6 (1989), 259–290.

    Article  MathSciNet  MATH  Google Scholar 

14. Kusuoka, S., A diffusion process on a fractal, Probabilistic methods in Mathematical Physics, Proc. of Taniguchi International Symp. (Katata and Kyoto, 1985) ed. K. Ito and N. Ikeda, pp. 251–274, Kinokuniya, Tokyo, 1987.

    Google Scholar 

15. Kusuoka, S., Dirichlet forms on fractals and product of random matrices, Publ. RIMS Kyoto Univ. 25 (1989), 659–680.

    Article  MathSciNet  MATH  Google Scholar 

16. Linstrom, T., Brownian motion on nested fractals, Preprint.

    Google Scholar 

17. Mandelbrot, B.B., The fractal geometry of nature, W.H. Freeman and Co., San Francisco, 1983.

    MATH  Google Scholar 

18. Osada, H., Isoperimetric dimension and estimates of heat kernels of pre-Sierpinski carpet, to appear in Prob. Theo. Rel. Fields.

    Google Scholar 

19. Rammal, R., and G. Toulouse, Random walks on fractal structures and percolation clusters, J. Physique Lettres 44 (1983), L13–L22.

    Article  Google Scholar 

20. Shima T., On eigenvalue problems for the Sierpinski pre-gaskets, to appear in Japan J. Appl. Math.

    Google Scholar 

Download references