14,820 research outputs found
Faint blue objects on the Hubble Deep Field North & South as possible nearby old halo white dwarfs
Using data derived from the deepest and finest angular resolution images of
the universe yet acquired by astronomers at optical wavelengths using the
Hubble Space Telescope (HST) in two postage-stamp sections of the sky (Williams
et al. 1996a,b), plus simple geometrical and scaling arguments, we demonstrate
that the faint blue population of point-source objects detected on those two
fields (M\'endez et al. 1996) could actually be ancient halo white dwarfs at
distances closer than about 2 kpc from the Sun. This finding has profound
implications, as the mass density of the detected objects would account for
about half of the missing dark matter in the Milky-Way (Bahcall and Soneira
1980), thus solving one of the most controversial issues of modern astrophysics
(Trimble 1987, Ashman 1992). The existence of these faint blue objects points
to a very large mass locked into ancient halo white dwarfs. Our estimate
indicates that they could account for as much as half of the dark matter in our
Galaxy, confirming the suggestions of the MACHO microlensing experiment (Alcock
et al. 1997). Because of the importance of this discovery, deep follow-up
observations with HST within the next two years would be needed to determine
more accurately the kinematics (tangential motions) for these faint blue old
white dwarfs.Comment: Accepted for publication on The Astrophysical Journal, Part 1. 8
pages (AAS Latex macros V4.0), 1 B&W postscript figure, 2 color postscript
figure
Semismall perturbations, semi-intrinsic ultracontractivity, and integral representations of nonnegative solutions for parabolic equations
We consider nonnegative solutions of a parabolic equation in a cylinder D
\timesI, where is a noncompact domain of a Riemannian manifold and with or . Under the assumption [SSP]
(i.e., the constant function 1 is a semismall perturbation of the associated
elliptic operator on ), we establish an integral representation theorem of
nonnegative solutions: In the case , any nonnegative solution is
represented uniquely by an integral on , where is the Martin boundary of for the
elliptic operator; and in the case , any nonnegative solution is
represented uniquely by the sum of an integral on and a constant multiple of a particular solution. We also show
that [SSP] implies the condition [SIU] (i.e., the associated heat kernel is
semi-intrinsically ultracontractive).Comment: 35 page
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Non-Abelian Monopoles as the Origin of Dark Matter
We suggest that dark matter may be partially constituted by a dilute 't
Hooft-Polyakov monopoles gas. We reach this conclusion by using the
Georgi-Glashow model coupled to a dual kinetic mixing term where is the electromagnetic field and the 't Hooft tensor.
We show that these monopoles carry both (Maxwell) electric and (Georgi-Glashow)
magnetic charges and the electric charge quantization condition is modified in
terms of a dimensionless real parameter. This parameter could be determined
from milli-charged particle experiments.Comment: 5 pp, no figure
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