# Fractal Geometry and Dynamical Systems in Pure and Applied Mathematics I: Fractals in Pure Mathematics

###### David Carfi et al., editors
Publisher:
American Mathematical Society
Publication Date:
2013
Number of Pages:
399
Format:
Paperback
Series:
Contemporary Mathematics 600
Price:
123.00
ISBN:
9780821891476
Category:
Proceedings
We do not plan to review this book.
• Q.-R. Deng, K.-S. Lau, and S.-M. Ngai -- Separation conditions for iterated function systems with overlaps
• D. Essouabri and B. Lichtin -- k-point configurations of discrete self-similar sets
• H. Herichi and M. L. Lapidus -- Fractal complex dimensions, Riemann hypothesis and invertibility of the spectral operator
• N. Kajino -- Analysis and geometry of the measurable Riemannian structure on the Sierpiński gasket
• S. Kombrink -- A survey on Minkowski measurability of self-similar and self-conformal fractals in Rd
• M. L. Lapidus, L. Hùng, and M. van Frankenhuijsen -- Minkowski measurability and exact fractal tube formulas for p-adic self-similar strings
• M. L. Lapidus, E. P. J. Pearse, and S. Winter -- Minkowski measurability results for self-similar tilings and fractals with monophase generators
• R. de Santiago, M. L. Lapidus, S. A. Roby, and J. A. Rock -- Multifractal analysis via scaling zeta functions and recursive structure of lattice strings
• M. L. Lapidus, J. A. Rock, and D. Žubrinić -- Box-counting fractal strings, zeta functions, and equivalent forms of Minkowski dimension
• E. Mihailescu and M. Urbański -- Hausdorff dimension of the limit set of countable conformal iterated function systems with overlaps
• L. Olsen -- Multifractal tubes: Multifractal zeta-functions, multifractal Steiner formulas and explicit formulas
• C. Spicer, R. S. Strichartz, and E. Totari -- Laplacians on Julia sets III: Cubic Julia sets and formal matings
• H. Rao, H.-J. Ruan, and Y. Wang -- Lipschitz equivalence of self-similar sets: Algebraic and geometric properties
• M. van Frankenhuijsen -- Riemann zeros in arithmetic progression
• M. Zähle -- Curvature measures of fractal sets