128,973 research outputs found
Threefold extremal contractions of types (IC) and (IIB)
Let be a germ of a threefold with terminal singularities along an
irreducible reduced complete curve with a contraction
such that and is ample. Assume that contains
a point of type (IC) or (IIB). We complete the classification of such germs in
terms of a general member containing .Comment: 22 pages, LaTe
Power series expansions of modular forms and their interpolation properties
Let x be a CM point on a modular or Shimura curve and p a prime of good
reduction, split in the CM field K. We define an expansion of an holomorphic
modular form f in the p-adic neighborhood of x and show that the expansion
coefficients give information on the p-adic ring of definition of f. Also, we
show that letting x vary in its Galois orbit, the expansions coefficients allow
to construct a p-adic measure whose moments squared are essentially the values
at the centre of symmetry of L-functions of the automorphic representation
attached to f based-changed to K and twisted by a suitable family of
Grossencharakters for K.Comment: 45 pages. In this new version of the paper the restriction on the
weight in the expansion principle in the quaternionic case has been removed.
Also, the formula linking the square of the moment to the special value of
the L-function has been greatly simplified and made much more explici
Mathematical Properties of Pump-Leak Models of Cell Volume Control and Electrolyte Balance
Homeostatic control of cell volume and intracellular electrolyte content is a
fundamental problem in physiology and is central to the functioning of
epithelial systems. These physiological processes are modeled using pump-leak
models, a system of differential algebraic equations that describes the balance
of ions and water flowing across the cell membrane. Despite their widespread
use, very little is known about their mathematical properties. Here, we
establish analytical results on the existence and stability of steady states
for a general class of pump-leak models. We treat two cases. When the ion
channel currents have a linear current-voltage relationship, we show that there
is at most one steady state, and that the steady state is globally
asymptotically stable. If there are no steady states, the cell volume tends to
infinity with time. When minimal assumptions are placed on the properties of
ion channel currents, we show that there is an asymptotically stable steady
state so long as the pump current is not too large. The key analytical tool is
a free energy relation satisfied by a general class of pump-leak models, which
can be used as a Lyapunov function to study stability
Mixing property and pseudo random sequences
We will give a summary about the relations between the spectra of the
Perron--Frobenius operator and pseudo random sequences for 1-dimensional cases.Comment: Published at http://dx.doi.org/10.1214/074921706000000211 in the IMS
Lecture Notes--Monograph Series
(http://www.imstat.org/publications/lecnotes.htm) by the Institute of
Mathematical Statistics (http://www.imstat.org
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