Transition Density Estimates for Diffusion Processes on Post Critically Finite Self‐Similar Fractals

The framework of post critically finite (p.c.f) self‐similar fractals was introduced to capture the idea of a finitely ramified fractal, that is, a connected fractal set where any component can be disconnected by the removal of a finite number of points. These ramification points provide a sequence of graphs which approximate the fractal and allow a Laplace operator to be constructed as a suitable limit of discrete graph Laplacians. In this paper we obtain estimates on the heat kernel associated with the Laplacian on the fractal which are best possible up to constants. These are short time estimates for the Laplacian with respect to a natural measure and expressed in terms of an effective resistance metric. Previous results on fractals with spatial symmetry have obtained heat kernel estimates of a non‐Gaussian form but which are of Aronson type. By considering a range of examples which are not spatially symmetric, we show that uniform Aronson type estimates do not hold in general on fractals. 1991 Mathematics Subject Classification: 60J60, 60J25, 28A80, 31C25.

[1]  B. Hambly,et al.  Heat Kernel Estimates and Homogenization for Asymptotically Lower Dimensional Processes on Some Nested Fractals , 1998 .

[2]  Jun Kigami,et al.  Localized Eigenfunctions of the Laplacian on p.c.f. Self‐Similar Sets , 1997 .

[3]  B. Hambly Brownian motion on a random recursive Sierpinski gasket , 1997 .

[4]  T. Shima On eigenvalue problems for Laplacians on P.C.F. self-similar sets , 1996 .

[5]  Jun Kigami Harmonic Calculus on Limits of Networks and Its Application to Dendrites , 1995 .

[6]  B. Hambly,et al.  Transition density estimates for Brownian motion on affine nested fractals , 1994 .

[7]  Jun Kigami Effective resistances for harmonic structures on p.c.f. self-similar sets , 1994, Mathematical Proceedings of the Cambridge Philosophical Society.

[8]  Jun Kigami,et al.  Weyl's problem for the spectral distribution of Laplacians on P.C.F. self-similar fractals , 1993 .

[9]  V. Metz How many diffusions exist on the Vicsek snowflake? , 1993 .

[10]  T. Kumagai Estimates of transition densities for Brownian motion on nested fractals , 1993 .

[11]  Jun Kigami,et al.  Harmonic calculus on p.c.f. self-similar sets , 1993 .

[12]  Richard F. Bass,et al.  Transition densities for Brownian motion on the Sierpinski carpet , 1992 .

[13]  A. Grigor’yan THE HEAT EQUATION ON NONCOMPACT RIEMANNIAN MANIFOLDS , 1992 .

[14]  R. Bass,et al.  On the resistance of the Sierpiński carpet , 1990, Proceedings of the Royal Society of London. Series A: Mathematical and Physical Sciences.

[15]  T. Hattori,et al.  Gaussian Field Theories on General Networks and the Spectral Dimensions , 1987 .

[16]  Martin T. Barlow,et al.  Diffusions on fractals , 1998 .

[17]  C. Sabot Existence and uniqueness of diffusions on finitely ramified self-similar fractals , 1997 .

[18]  M. Barlow,et al.  Transition density estimates for Brownian motion on scale irregular Sierpinski gaskets , 1997 .

[19]  J. Quastel Diffusion in Disordered Media , 1996 .

[20]  T. Kumagai Regularity, closedness and spectral dimensions of the Dirichlet forms on P.C.F. self-similar sets , 1993 .

[21]  L. Saloff-Coste,et al.  A note on Poincaré, Sobolev, and Harnack inequalities , 1992 .

[22]  Richard F. Bass,et al.  The construction of brownian motion on the Sierpinski carpet , 1989 .