38,843 research outputs found
What are we learning from the relative orientation between density structures and the magnetic field in molecular clouds?
We investigate the conditions of ideal magnetohydrodynamic (MHD) turbulence
responsible for the relative orientation between density structures,
characterized by their gradient, , and the magnetic field,
, in molecular clouds (MCs). For that purpose, we construct an
expression for the time evolution of the angle, , between
and based on the transport equations of MHD
turbulence. Using this expression, we find that the configuration where
and are mostly parallel, , and where
and are mostly perpendicular, ,
constitute attractors, that is, the system tends to evolve towards either of
these configurations and they are more represented than others. This fact would
explain the predominant alignment or anti-alignment between column density,
, structures and the projected magnetic field orientation,
, reported in observations. Additionally, we find that
departures from the configurations are related to convergent
flows, quantified by the divergence of the velocity field,
, in the presence of a relatively strong magnetic
field. This would explain the observed change in relative orientation between
-structures and towards MCs, from mostly parallel at low
to mostly perpendicular at the highest , as the result of the
gravitational collapse and/or convergence of flows. Finally, we show that the
density threshold that marks the observed change in relative orientation
towards MCs, from and being mostly parallel at low
to mostly perpendicular at the highest , is related to the magnetic field
strength and constitutes a crucial piece of information for determining the
role of the magnetic field in the dynamics of MCs.Comment: 10 pages, 8 figures. Submitted to A&
On cyclic numbers and an extension of Midy's theorem
In this note we consider fractions of the form 1/m and their floating-point
representation in various arithmetic bases. For instance, what is 1/7 in base
2005? And, what about 1/4? We give a simple algorithm to answer these
questions. In addition, we discuss an extension of Midy's theorem whose proof
relies on elementary modular arithmetic.Comment: 6 pages, aimed at undergraduate student
A coalitional procedure leading to a family of bankruptcy rules
We provide a general coalitional procedure that characterizes a family of rules for bankruptcy problems inspired by the Talmud.bankruptcy, coalitions, claims, Talmud.
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