Lens space: Difference between revisions

Template:More footnotes

MOST OF WHAT USED TO BE HERE HAS BEEN MOVED TO Hamiltonian constraint of LQG.

The entry here will be rewritten to reflect the general situation that the Hamiltonian constraint arises from any theory that admits a Hamiltonian formulation and is reparametrisation-invariant, although the Hamiltonian constraint of classical general relativity will be included as an important non-trivial example. Something of note in the context of general relativity is that the Hamiltonian constraint technically refers to a linear combination spatial and time diffeomorphism constraints reflecting the reparametrizability of the theory under both spatial as well as time coordinates. However, most of the time the term `Hamiltonian constraint' is reserved for the constraint that generates time diffeomorphisms.

Simplest example: the parametrized clock and pendulum system

Parametrization

In its usual presentation, classical mechanics appears to give time a special role as an independent variable. This is unnecessary, however. Mechanics can be formulated to treat the time variable on the same footing as the other variables in an extended phase space, by parameterizing the temporal variable(s) in terms of a common, albeit unspecified parameter variable. Phase space variables being on the same footing.

Say our system comprised a pendulum executing a simple harmonic motion and a clock. Whereas the system could be described classically by a position x=x(t), with x defined as a function of time, it is also possible to describe the same system as x(${\displaystyle \tau }$) and t(${\displaystyle \tau }$ where the relation between x and t is not directly specified. Instead, x and t are determined by the parameter ${\displaystyle \tau }$, which is simply a parameter of the system, possibly having no objective meaning in its own right.

The system would be described by the position of a pendulum from the center, denoted ${\displaystyle x}$, and the reading on the clock, denoted ${\displaystyle t}$. We put these variables on the same footing by introducing a fictitious parameter ${\displaystyle \tau }$,

${\displaystyle x(\tau ),\;\;\;\;t(\tau )}$

whose `evolution' with respect to ${\displaystyle \tau }$ takes us continuously through every possible correlation between the displacement and reading on the clock. Obviously the variable ${\displaystyle \tau }$ can be replaced by any monotonic function, ${\displaystyle \tau '=f(\tau )}$. This is what makes the system reparametrisation-invariant. Note that by this reparametrisation-invariance the theory cannot predict the value of ${\displaystyle x(\tau )}$ or ${\displaystyle t(\tau )}$ for a given value of ${\displaystyle \tau }$ but only the relationship between these quantities. Dynamics is then determined by this relationship..

Dynamics of this reparametrization-invariant system

The action (physics) for the parametrized Harmonic oscillator is then

${\displaystyle S=\int d\tau {\Big [}{dx \over d\tau }p+{dt \over d\tau }p_{t}-\lambda {\Big (}p_{t}+{p^{2} \over 2m}+{1 \over 2}m\omega ^{2}x^{2}{\Big )}{\Big ]}.}$

where ${\displaystyle x}$ and ${\displaystyle t}$ are canonical coordinates and ${\displaystyle p}$ and ${\displaystyle p_{t}}$ are their conjugate momentum respectively and represent our extended phase space (we will show that we can recover the usual Newton's equations from this expression). Writing the action as

${\displaystyle S=\int d\tau {\Big [}{dx \over d\tau }p+{dt \over d\tau }p_{t}-{\mathcal {H}}(x,t;p,p_{t}){\Big ]}}$

we identify the ${\displaystyle {\mathcal {H}}}$ as

${\displaystyle {\mathcal {H}}(x,t,\lambda ;p,p_{t})=\lambda {\Big (}p_{t}+{p^{2} \over 2m}+{1 \over 2}m\omega ^{2}x^{2}{\Big )}.}$

Hamilton's equations for ${\displaystyle \lambda }$ are

${\displaystyle {\partial {\mathcal {H}} \over \partial \lambda }=0}$

which gives a constraint,

${\displaystyle C=p_{t}+{p^{2} \over 2m}+{1 \over 2}m\omega ^{2}x^{2}=0.}$

${\displaystyle C}$ is our Hamiltonian constraint! It could also be obtained from the Euler-Lagrange equation of motion, noting that the action depends on ${\displaystyle \lambda }$ but not its ${\displaystyle \tau }$ derivative. Then the extended phase space variables ${\displaystyle x}$, ${\displaystyle t}$, ${\displaystyle p}$, and ${\displaystyle p_{t}}$ are constrained to take values on this constraint-hypersurface of the extended phase space. We refer to ${\displaystyle \lambda C}$ as the `smeared' Hamiltonian constraint where ${\displaystyle \lambda }$ is an arbitrary number. The `smeared' Hamiltonain constraint tells us how an extended phase space variable (or function thereof) evolves with respect to ${\displaystyle \tau }$:

${\displaystyle {dx \over d\tau }=\{x,\lambda C\},\;\;\;\;{dp \over d\tau }=\{p,\lambda C\}\;\;\;\;\;\;{dt \over d\tau }=\{t,\lambda C\},\;\;\;\;{dp_{t} \over d\tau }=\{p_{t},\lambda C\}}$

(these are actually the other Hamilton's equations). These equations describe a flow or orbit in phase space. In general we have

${\displaystyle {dF(x,p,t,p_{t}) \over d\tau }=\{F(x,p,t,p_{t}),\lambda C\}}$

for any phase space function ${\displaystyle F}$. As the Hamiltonian constraint Poisson commutes with itself, it preserves itself and hence the constraint-hypersurface. The possible correlations between measurable quantities like ${\displaystyle x(\tau )}$ and ${\displaystyle t(\tau )}$ then correspond to `orbits' generated by the constraint within the constraint surface, each particular orbit differentiated from each other by say also measuring the value of say ${\displaystyle p(\tau )}$ along with ${\displaystyle x(\tau )}$ and ${\displaystyle t(\tau )}$ at one ${\displaystyle \tau }$-instant; after determining the particular orbit, for each measurement of ${\displaystyle t(\tau )}$ we can predict the value ${\displaystyle x(\tau )}$ will take.

Deparametrization

The other equations of Hamiltonian mechanics are

${\displaystyle {dx \over d\tau }={\partial {\mathcal {H}} \over \partial p},\;\;\;\;{dp \over d\tau }=-{\partial {\mathcal {H}} \over \partial x};\;\;\;\;\;\;{dt \over d\tau }={\partial {\mathcal {H}} \over \partial p_{t}},\;\;\;\;{dp_{t} \over d\tau }={\partial {\mathcal {H}} \over \partial t}.}$

Upon substitution of our action these give,

${\displaystyle {dx \over d\tau }=\lambda {p \over m},\;\;\;\;{dp \over d\tau }=-\lambda m\omega ^{2}x;\;\;\;\;\;\;{dt \over d\tau }=\lambda ,\;\;\;\;{dp_{t} \over d\tau }=0,}$

These represent the fundamental equations governing our system.

In the case of the parametrized clock and pendulum system we can of course recover the usual equations of motion in which ${\displaystyle t}$ is the independent variable:

Now ${\displaystyle dx/dt}$ and ${\displaystyle dp/dt}$ can be deduced by

${\displaystyle {dx \over dt}={dx \over d\tau }{\Big /}{dt \over d\tau }={\lambda p/m \over \lambda }={p \over m}}$

${\displaystyle {dp \over dt}={dp \over d\tau }{\Big /}{dt \over d\tau }={-\lambda m\omega ^{2}x \over \lambda }=-m\omega ^{2}x.}$

We recover the usual differential equation for the simple harmonic oscillator,

${\displaystyle {d^{2}x \over dt^{2}}=-m\omega ^{2}x.}$

We also have ${\displaystyle dp_{t}/d\tau =dp_{t}/d\tau {\big /}dp_{t}/d\tau =0}$ or ${\displaystyle p_{t}=Const.}$

Our Hamiltonian constraint is then easily seen as the condition of constancy of energy! Deparametrization and the identification of a time variable with respect to which everything evolves is the opposite process of parametrization. It turns out in general that not all reparametrisation-invariant systems can be deparametrized in general. General relativity being a prime physical example (here the spacetime coordinates correspond to the unphysical ${\displaystyle \tau }$ and the Hamiltonian is a linear combination of generators of spatial and time diffeomorphism constraints).

Reason why we could deparametrize here

The underlining reason why we could deparametrize (aside from the fact that we already know it was an artificial reparametrization in the first place) is the mathematical form of the constraint, namely,

${\displaystyle C=p_{t}+C'(x,p)}$.

Substitute the Hamiltonian constraint into the original action we obtain

${\displaystyle S=\int d\tau {\Big [}{dx \over d\tau }p+{dt \over d\tau }p_{t}-\lambda (p_{t}+C'(x,p)){\Big ]}}$

${\displaystyle =\int d\tau {\Big [}{dx \over d\tau }p-{dt \over d\tau }C'(x,p){\Big ]}}$

${\displaystyle =\int dt{\Big [}{dx \over dt}p-{p^{2} \over 2m}+{1 \over 2}m\omega ^{2}x^{2}{\Big ]}}$

which is the standard action for the harmonic oscillator. General relativity is an example of a physical theory where the Hamiltonian constraint isn't of the right general mathematical form in general, and so cannot be deparametrized in general.

Hamiltonian of classical general relativity

In the ADM formulation of General relativity one splits spacetime into spatial slices and time, the basic variables are taken to be the induced metric, ${\displaystyle q_{ab}(x)}$, on the spatial slice (the metric induced on the spatial slice by the spacetime metric), and its conjugate momentum variable related to the extrinsic curvature, ${\displaystyle K^{ab}(x)}$, (this tells us how the spatial slice curves with respect to spacetime and is a measure of how the induced metric evolves in time).^[1] These are the metric canonical coordinates.

Dynamics such as time-evolutions of fields are controlled by the Hamiltonian constraint.

The identity of the Hamiltonian constraint is a major open question in quantum gravity, as is extracting of physical observables from any such specific constraint.

In 1986 Abhay Ashtekar introduced a new set of canonical variables, Ashtekar variables to represent an unusual way of rewriting the metric canonical variables on the three-dimensional spatial slices in terms of a SU(2) gauge field and its complementary variable.^[2] The Hamiltonian was much simplified in this reformulation. This led to the loop representation of quantum general relativity^[3] and in turn loop quantum gravity.

Within the loop quantum gravity representation Thiemann was able formulate a mathematically rigorous operator as a proposal as such a constraint.^[4] Although this operator defines a complete and consistent quantum theory, doubts have been raised as to the physical reality of this theory due to inconsistencies with classical general relativity (the quantum constraint algebra closes, but it is not isomorphic to the classical constraint algebra of GR, which is seen as circumstantial evidence of inconsistencies definitely not a proof of inconsistencies), and so variants have been proposed.

Metric formulation

The idea was to quantize the canonical variables ${\displaystyle q_{ab}}$ and ${\displaystyle \pi ^{ab}={\sqrt {q}}(K^{ab}-q^{ab}K_{c}^{c})}$, making them into operators acting on wavefunctions on the space of 3-metrics, and then to quantize the Hamiltonian (and other constraints). However, this program soon became regarded as dauntingly difficult for various reasons, one being the non-polynomial nature of the Hamiltonian constraint:

${\displaystyle H={\sqrt {det(q)}}(K_{ab}K^{ab}-(K_{a}^{a})^{2}-\;^{3}R)}$

where ${\displaystyle \;^{3}R}$ is the scalar curvature of the three metric ${\displaystyle q_{ab}(x)}$. Being a non-polynomial expression in the canonical variables and their derivatives it is very difficult to promote to a quantum operator.

Expression using Ashtekar variables

The configuration variables of Ashtekar's variables behave like an ${\displaystyle SU(2)}$ gauge field or connection ${\displaystyle A_{a}^{i}}$. Its cononically conjugate momentum is ${\displaystyle {\tilde {E}}_{i}^{a}}$ is the desitized "electric" field or triad (densitized as ${\displaystyle {\tilde {E}}_{i}^{a}={\sqrt {det(q)}}E_{i}^{a}}$). What do these variables have to do with gravity? The densitized triads can be used to reconstruct the spatial metric via

${\displaystyle det(q)q^{ab}={\tilde {E}}_{i}^{a}{\tilde {E}}_{j}^{b}\delta ^{ij}}$.

The densitized triads are not unique, and in fact one can perform a local in space rotation with respect to the internal indices ${\displaystyle i}$. This is actually the origin of the ${\displaystyle SU(2)}$ gauge invariance. The connection can be use to reconstruct the extrinsic curvature. The relation is given by

${\displaystyle A_{a}^{i}=\Gamma _{a}^{i}-iK_{a}^{i}}$

where ${\displaystyle \Gamma _{a}^{i}}$ is related to the spin connection, ${\displaystyle \Gamma _{a\;\;i}^{\;\;j}}$, by ${\displaystyle \Gamma _{a}^{i}=\Gamma _{ajk}\epsilon ^{jki}}$ and ${\displaystyle K_{a}^{i}=K_{ab}{\tilde {E}}^{ai}/{\sqrt {det(q)}}}$.

In terms of Ashtekar variables the classical expression of the constraint is given by,

${\displaystyle H={\epsilon _{ijk}F_{ab}^{k}{\tilde {E}}_{i}^{a}{\tilde {E}}_{j}^{b} \over {\sqrt {det(q)}}}}$.

where ${\displaystyle F_{ab}^{k}}$ field strength tensor of the gauge field ${\displaystyle A_{a}^{i}}$ . Due to the factor ${\displaystyle 1/{\sqrt {det(q)}}}$ this in non-polynomial in the Ashtekar's variables. Since we impose the condition

${\displaystyle H=0}$,

we could consider the densitized Hamiltonian instead,

${\displaystyle {\tilde {H}}={\sqrt {det(q)}}H=\epsilon _{ijk}F_{ab}^{k}{\tilde {E}}_{i}^{a}{\tilde {E}}_{j}^{b}=0}$.

This Hamiltonian is now polynomial the Ashtekar's variables. This development raised new hopes for the canonical quantum gravity programme.^[5] Although Ashtekar variables had the virtue of simplifying the Hamiltonian, it has the problem that the variables become complex. When one quantizes the theory it is a difficult task ensure that one recovers real general relativity as opposed to complex general relativity. Also there were also serious difficulties promoting the densitized Hamiltonian to a quantum operator.

A way of addressing the problem of reality conditions was noting that if we took the signature to be ${\displaystyle (+,+,+,+)}$, that is Euclidean instead of Lorentzian, then one can retain the simple form of the Hamiltonian for but for real variables. One can then define what is called a generalized Wick rotation to recover the Lorentzian theory.^[6] Generalized as it is a Wick transformation in phase space and has nothing to do with analytical continuation of the time parameter ${\displaystyle t}$.

Expression for real formulation of Ashtekar variables

Thomas Thiemann was able to address both the above problems.^[4] He used the real connection

${\displaystyle A_{a}^{i}=\Gamma _{a}^{i}+\beta K_{a}^{i}}$

In real Ashtekar variables the full Hamiltonian is

${\displaystyle H=-\zeta {\epsilon _{ijk}F_{ab}^{k}{\tilde {E}}_{i}^{a}{\tilde {E}}_{j}^{b} \over {\sqrt {det(q)}}}+2{\zeta \beta ^{2}-1 \over \beta ^{2}}{({\tilde {E}}_{i}^{a}{\tilde {E}}_{j}^{b}-{\tilde {E}}_{j}^{a}{\tilde {E}}_{i}^{b}) \over {\sqrt {det(q)}}}(A_{a}^{i}-\Gamma _{a}^{i})(A_{b}^{j}-\Gamma _{b}^{j})=H_{E}+H'}$.

where the constant ${\displaystyle \beta }$ is the Barbero-Immirzi parameter.^[7] The constant ${\displaystyle \zeta }$ is -1 for Lorentzian signature and +1 for Euclidean signature. The ${\displaystyle \Gamma _{a}^{i}}$ have a complicated relationship with the desitized triads and causes serious problems upon quantization. Ashtekar variables can be seen as choosing ${\displaystyle \beta =i}$ to make the second more complicated term was made to vanish (the first term is denoted ${\displaystyle H_{E}}$ because for the Euclidean theory this term remains for the real choice of ${\displaystyle \beta =\pm 1}$). Also we still have the problem of the ${\displaystyle 1/{\sqrt {det(q)}}}$ factor.

Thiemann was able to make it work for real ${\displaystyle \beta }$. First he could simplify the troublesome ${\displaystyle 1/{\sqrt {det(q)}}}$ by using the identity

${\displaystyle \{A_{c}^{k},V\}={\epsilon _{abc}\epsilon ^{ijk}{\tilde {E}}_{i}^{a}{\tilde {E}}_{j}^{b} \over {\sqrt {det(q)}}}}$

where ${\displaystyle V}$ is the volume,

${\displaystyle V=\int d^{3}x{\sqrt {det(q)}}={1 \over 6}\int d^{3}x{\sqrt {|{\tilde {E}}_{i}^{a}{\tilde {E}}_{j}^{b}{\tilde {E}}_{k}^{c}\epsilon ^{ijk}\epsilon _{abc}|}}}$.

The first term of the Hamiltonian constraint becomes

${\displaystyle H_{E}=\{A_{c}^{k},V\}F_{ab}^{k}{\tilde {\epsilon }}^{abc}}$

upon using Thiemann's identity. This Poisson bracket is replaced by a commutator upon quantization. It turns out that a similar trick can be used to teat the second term. Why are the ${\displaystyle \Gamma _{a}^{i}}$ given by the densitized triads ${\displaystyle {\tilde {E}}_{i}^{a}}$? It actually come about from the Gauss Law

${\displaystyle D_{a}{\tilde {E}}_{i}^{a}=0}$.

We can solve this in much the same way as the Levi-Civita connection can be calculated from the equation ${\displaystyle \nabla _{c}g_{ab}=0}$; by rotating the various indices and then adding and subtracting them. The result is complicated and non-linear. To circumvent the problems introduced by this complicated relationship Thiemann first defines the Gauss gauge invariant quantity

${\displaystyle K=\int d^{3}xK_{a}^{i}{\tilde {E}}_{i}^{a}}$

where ${\displaystyle K_{a}^{i}=K_{ab}{\tilde {E}}^{ai}/{\sqrt {det(q)}}}$, and notes that

${\displaystyle K_{a}^{i}=\{A_{a}^{i},K\}}$.

We are then able to write

${\displaystyle A_{a}^{i}-\Gamma _{a}^{i}=\beta K_{a}^{i}=\beta \{A_{a}^{i},K\}}$

and as such find an expression in terms of the configuration variable ${\displaystyle A_{a}^{i}}$ and ${\displaystyle K}$. We obtain for the second term of the Hamiltonian

${\displaystyle H'=\epsilon ^{abc}\epsilon _{ijk}\{A_{a}^{i},K\}\{A_{b}^{j},K\}\{A_{c}^{k},V\}}$.

Why is it easier to quantize ${\displaystyle K}$? This is because it can be rewritten in terms of quantities that we already know how to quantize. Specifically ${\displaystyle K}$ can be rewritten as

${\displaystyle K=-\{V,\int d^{3}xH_{E}\}}$

where we have used that the integrated densitized trace of the extrinsic curvature is the``time derivative of the volume".

Coupling to matter

External links

• Overview by Carlo Rovelli
• Thiemann's paper in Physics Letters
• Good information on LQG

References

43 year old Petroleum Engineer Harry from Deep River, usually spends time with hobbies and interests like renting movies, property developers in singapore new condominium and vehicle racing. Constantly enjoys going to destinations like Camino Real de Tierra Adentro.