The geometry of special relativity dray pdf download - accept
The Geometry of Special Relativity (Tevian Dray)_slides
THE GEOMETRY OFSPECIAL RELATIVITY
Tevian Dray
Oregon State University
I: Circle Geometry
II: Hyperbola Geometry
III: Special Relativity
IV: What Next?
CIRCLE GEOMETRY
.1 (cos , sin )
r = arclength
4
53
cos =4
5= tan =
3
4
WHICH GEOMETRY?
Euclidean
ds2 = dx2 + dy2
y
B
A
y
x
x
4
53
tan = 34
B = (cos , sin )
A = ( sin , cos )
Trigonometry!
Return
MEASUREMENTS
Width:
1
1
1
cos
1
cos
Apparent width > 1
Slope:y
x
y
x
y
x
m 6= m1 + m2
HYPERBOLA GEOMETRY
.1
(cosh , sinh )
x2 y2 = 1
r = arclength
ds2 = |dx2 dy2|
cosh =1
2
(
e + e)
sinh =1
2
(
e e)
HYPERBOLIC TRIANGLE TRIG
d cosh
d sinhd
4
5
3
tanh = 3/5
5
4
3
tanh = 4/5
RIGHT TRIANGLES
B
y y
A
x
x
right angles are not angles!
WHICH GEOMETRY?
signature
(+ + ...+) Euclidean( + ...+) Minkowskian
ds2 = c2 dt2 + dx2ct
A
B
ct
x
x
4
5
3
tanh = 35
B = (cosh , sinh )
Special Relativity!
Compare
SPECIAL RELATIVITY
ct
A
B
ct
x
x
v
c= tanh
tanh( + ) =tanh + tanh
1 + tanh tanh=
uc +
vc
1 + uvc2
Einstein addition formula!
Compare
LENGTH CONTRACTION
x
ctct
x
= cosh
x
ctct
x
=
cosh
TIME DILATION
x
ctct
x
COSMIC RAYS
(Taylor & Wheeler, 1st edition, Ex. 42, p. 89.)
Consider -mesons produced by the collision of cosmic rays with gas nuclei inthe atmosphere 60 kilometers above the surface of the earth, which then movevertically downward at nearly the speed of light. The half-life before -mesonsdecay into other particles is 1.5 microseconds (1.5 106 s). Assuming it doesnt decay, how long would it take a -meson to reach the
surface of the earth?60 km
3 108 ms= 200 s
Assuming there were no time dilation, about what fraction of the mesonsreaches the earth?
200 s3
2s per half-life
=400
3half-lives
In actual fact, roughly 18
of the mesons would reach the earth! How fast arethey going?
COSMIC RAYS
400
3half-lives
3 half-lives=
400
9
9400
v
c= tanh =
4002 92
400 .99974684
COSMIC RAYS
(60 km)(1000 mkm
)
(4.5 106 s)(3 108 ms )=
400
9
400
9
v
c= tanh =
4004002 + 92
.99974697
TWIN PARADOX
One twin travels 24 light-years to star X at speed 2425c; her twin brother stays
home. When the traveling twin gets to star X, she immediately turns around,
and returns at the same speed. How long does each twin think the trip took?
24
25 7
cosh =25
7
7
q
q =7
cosh =
49
2549/25
7
24
25
Straight path takes longest!
SUMMARY
Lorentz transformations are hyperbolic rotations Beautifully treated in Taylor & Wheeler, 1st ed Removed from Taylor & Wheeler, 2nd edition Not currently covered in existing texts
http://www.math.oregonstate.edu/~tevian/geometry
WHICH GEOMETRY?
signature flat curved
(+ + ...+) Euclidean Riemannian( + ...+) Minkowskian
ds2 = r2(d2 + sin2 d2)
Tidal forces!
WHICH GEOMETRY?
signature flat curved
(+ + ...+) Euclidean Riemannian( + ...+) Minkowskian Lorentzian
General Relativity!
ds2 = dt2 + a(t) dx2Cosmology!
(c = 1)ds2 =
(
1 2mr)
dt2 +dr2
(
1 2mr)
+ r2(
d2 + sin2 d2)
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THE GEOMETRY OFSPECIAL RELATIVITY
Tevian Dray
Oregon State University
http://www.math.oregonstate.edu/~tevian/geometry
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