Key signature: Dmajor
Submitted on June 11th 2008 by ceolachan.
This tune has been added to 23 tunebooks.
Also known as Single.
Recordings of a tune by this name:
X: 1
T: A Quantum Singularity
M: 6/8
L: 1/8
R: jig
K: Dmaj
|: F |\
A2 d dcB | A2 F D2 E | F2 D A2 F | G2 E E2 F |
G2 e edc | BAG E2 F | G2 E BAG | F2 D D2 :|
e |\
f2 d dAF | f2 d d2 e | fed cBA | G2 E E2 f |
g2 e ecA | g2 e e2 f | g>fe dcB | AB/A/G FGA |
f2 d d2 e | fd/d/d d2 e | fed cBA | G2 E E3 |
gbg f/g/af | ege d2 A | cc/B/A GFE | F2 D- D2 |]
composed by Captain Picard?
# Posted on June 12th 2008 by swisspiper
No, surely Data, or if it's an older tune, Spock.
# Posted on June 12th 2008 by Will Harmon
..--..
.----. - . - . .----.
# Posted on June 12th 2008 by ceolachan
+ another of these:
Discussion: The Phrost is All Over - - - 4 bar second endings...
# Posted on February 3rd 2005 by ceolachan
http://www.thesession.org/discussions/display.php/5739
# Posted on June 12th 2008 by ceolachan
dah dit dah dit
# Posted on June 12th 2008 by ceolachan
Here is a simple explanation
A quasiregular spacetime is a spacetime with a classical quasiregular singularity, the mildest form of true singularity. The definition of Horowitz and Marolf, for a quantum-mechanically singular spacetime is one in which the spatial-derivative operator in the Klein-Gordon equation for a massive scalar field is not essentially self-adjoint. In such a quantum-mechanically singular spacetime, the time evolution of a quantum test particle is not uniquely determined. Horowitz and Marolf showed that a two-dimensional spacetime with a classical conical singularity (i.e., a two-dimensional quasiregular singularity) is also quantum-mechanically singular. Here we show that an idealized cosmic string spacetime, a four-dimensional spacetime with conical singularity is, as expected, quantum-mechanically singular. We consider also an unusual Tod spacetime, which is geodesically complete but nevertheless classically singular, since it contains an incomplete curve of bounded acceleration. The Tod spacetime is therefore an even milder singular spacetime classically than a conical spacetime, because it is geodesically complete. We show that the Tod spacetime is nevertheless still quantum-mechanically singular, since the appropriate operator is not essentially self-adjoint.
Fairly self-explanatory.
# Posted on June 15th 2008 by dafydd
Yeah, that's what I was trying to say. Thanks old friend...
# Posted on June 15th 2008 by ceolachan
The quantum singularity seems to be placed somewhere in Galicia - maybe at cabo fisterra, the end of the world?
# Posted on June 16th 2008 by swisspiper
~ or the beginning, or both in the one moment?
# Posted on June 16th 2008 by ceolachan