IFT -- Information Field Theory =============================== Theoretical Background ---------------------- Information Field Theory _ [1]_ (IFT) is information theory, the logic of reasoning under uncertainty, applied to fields. A field can be any quantity defined over some space, e.g. the air temperature over Europe, the magnetic field strength in the Milky Way, or the matter density in the Universe. IFT describes how data and knowledge can be used to infer field properties. Mathematically it is a statistical field theory and exploits many of the tools developed for such. Practically, it is a framework for signal processing and image reconstruction. IFT is fully Bayesian. How else could infinitely many field degrees of freedom be constrained by finite data? There is a full toolbox of methods that can be used, like the classical approximation (= Maximum a posteriori = MAP), effective action (= Variational Bayes = VI), Feynman diagrams, renormalitation, and more. IFT reproduces many known well working algorithms. This should be reassuring. And, there were certainly previous works in a similar spirit. Anyhow, in many cases IFT provides novel rigorous ways to extract information from data. NIFTy comes with reimplemented MAP and VI estimators. It also provides a Hamiltonian Monte Carlo sampler for Fields (HMCF). .. tip:: *In-a-nutshell introductions to information field theory* can be found in [2]_, [3]_, [4]_, and [5]_, with the latter probably being the most didactically. .. [1] T.A. Enßlin et al. (2009), "Information field theory for cosmological perturbation reconstruction and nonlinear signal analysis", PhysRevD.80.105005, 09/2009; arXiv:0806.3474 _ .. [2] T.A. Enßlin (2013), "Information field theory", proceedings of MaxEnt 2012 -- the 32nd International Workshop on Bayesian Inference and Maximum Entropy Methods in Science and Engineering; AIP Conference Proceedings, Volume 1553, Issue 1, p.184; arXiv:1301.2556 _ .. [3] T.A. Enßlin (2014), "Astrophysical data analysis with information field theory", AIP Conference Proceedings, Volume 1636, Issue 1, p.49; arXiv:1405.7701 _ .. [4] Wikipedia contributors (2018), "Information field theory" _, Wikipedia, The Free Encyclopedia. .. [5] T.A. Enßlin (2019), "Information theory for fields", accepted by Annalen der Physik; arXiv:1804.03350 _ Discretized continuum --------------------- The representation of fields that are mathematically defined on a continuous space in a finite computer environment is a common necessity. The goal hereby is to preserve the continuum limit in the calculus in order to ensure a resolution independent discretization. +-----------------------------+-----------------------------+ | .. image:: images/42vs6.png | .. image:: images/42vs9.png | | :width: 100 % | :width: 100 % | +-----------------------------+-----------------------------+ Any partition of the continuous position space :math:\Omega (with volume :math:V) into a set of :math:Q disjoint, proper subsets :math:\Omega_q (with volumes :math:V_q) defines a pixelization, .. math:: \Omega &\quad=\quad \dot{\bigcup_q} \; \Omega_q \qquad \mathrm{with} \qquad q \in \{1,\dots,Q\} \subset \mathbb{N} , \\ V &\quad=\quad \int_\Omega \mathrm{d}x \quad=\quad \sum_{q=1}^Q \int_{\Omega_q} \mathrm{d}x \quad=\quad \sum_{q=1}^Q V_q . Here the number :math:Q characterizes the resolution of the pixelization and the continuum limit is described by :math:Q \rightarrow \infty and :math:V_q \rightarrow 0 for all :math:q \in \{1,\dots,Q\} simultaneously. Moreover, the above equation defines a discretization of continuous integrals, :math:\int_\Omega \mathrm{d}x \mapsto \sum_q V_q. Any valid discretization scheme for a field :math:{s} can be described by a mapping, .. math:: s(x \in \Omega_q) \quad\mapsto\quad s_q \quad=\quad \int_{\Omega_q} \mathrm{d}x \; w_q(x) \; s(x) , if the weighting function :math:w_q(x) is chosen appropriately. In order for the discretized version of the field to converge to the actual field in the continuum limit, the weighting functions need to be normalized in each subset; i.e., :math:\forall q: \int_{\Omega_q} \mathrm{d}x \; w_q(x) = 1. Choosing such a weighting function that is constant with respect to :math:x yields .. math:: s_q = \frac{\int_{\Omega_q} \mathrm{d}x \; s(x)}{\int_{\Omega_q} \mathrm{d}x} = \left< s(x) \right>_{\Omega_q} , which corresponds to a discretization of the field by spatial averaging. Another common and equally valid choice is :math:w_q(x) = \delta(x-x_q), which distinguishes some position :math:x_q \in \Omega_q, and evaluates the continuous field at this position, .. math:: s_q \quad=\quad \int_{\Omega_q} \mathrm{d}x \; \delta(x-x_q) \; s(x) \quad=\quad s(x_q) . In practice, one often makes use of the spatially averaged pixel position, :math:x_q = \left< x \right>_{\Omega_q}. If the resolution is high enough to resolve all features of the signal field :math:{s}, both of these discretization schemes approximate each other, :math:\left< s(x) \right>_{\Omega_q} \approx s(\left< x \right>_{\Omega_q}), since they approximate the continuum limit by construction. (The approximation of :math:\left< s(x) \right>_{\Omega_q} \approx s(x_q \in \Omega_q) marks a resolution threshold beyond which further refinement of the discretization reveals no new features; i.e., no new information content of the field :math:{s}.) All operations involving position integrals can be normalized in accordance with the above definitions. For example, the scalar product between two fields :math:{s} and :math:{u} is defined as .. math:: {s}^\dagger {u} \quad=\quad \int_\Omega \mathrm{d}x \; s^*(x) \; u(x) \quad\approx\quad \sum_{q=1}^Q V_q^{\phantom{*}} \; s_q^* \; u_q^{\phantom{*}} , where :math:\dagger denotes adjunction and :math:* complex conjugation. Since the above approximation becomes an equality in the continuum limit, the scalar product is independent of the pixelization scheme and resolution, if the latter is sufficiently high. The above line of argumentation analogously applies to the discretization of operators. For a linear operator :math:{A} acting on some field :math:{s} as :math:{A} {s} = \int_\Omega \mathrm{d}y \; A(x,y) \; s(y), a matrix representation discretized with constant weighting functions is given by .. math:: A(x \in \Omega_p, y \in \Omega_q) \quad\mapsto\quad A_{pq} \quad=\quad \frac{\iint_{\Omega_p \Omega_q} \mathrm{d}x \, \mathrm{d}y \; A(x,y)}{\iint_{\Omega_p \Omega_q} \mathrm{d}x \, \mathrm{d}y} \quad=\quad \big< \big< A(x,y) \big>_{\Omega_p} \big>_{\Omega_q} . The proper discretization of spaces, fields, and operators, as well as the normalization of position integrals, is essential for the conservation of the continuum limit. Their consistent implementation in NIFTY allows a pixelization independent coding of algorithms. Free Theory & Implicit Operators -------------------------------- A free IFT appears when the signal field :math:{s} and the noise :math:{n} of the data :math:{d} are independent, zero-centered Gaussian processes of kown covariances :math:{S} and :math:{N}, respectively, .. math:: \mathcal{P}(s,n) = \mathcal{G}(s,S)\,\mathcal{G}(n,N), and the measurement equation is linear in both signal and noise, .. math:: d= R\, s + n, with :math:{R} the measurement response, which maps the continous signal field into the discrete data space. This is called a free theory, as the information Hamiltonian associate professor .. math:: \mathcal{H}(d,s)= -\log \mathcal{P}(d,s)= \frac{1}{2} s^\dagger S^{-1} s + \frac{1}{2} (d-R\,s)^\dagger N^{-1} (d-R\,s) + \mathrm{const} is only of quadratic order in :math:{s}, which leads to a linear relation between the data and the posterior mean field. In this case, the posterior is .. math:: \mathcal{P}(s|d) = \mathcal{G}(s-m,D) with .. math:: m = D\, j the posterior mean field, .. math:: D = \left( S^{-1} + R^\dagger N^{-1} R\right)^{-1} the posterior covariance operator, and .. math:: j = R^\dagger N^{-1} d the information source. The operation in :math:{d= D\,R^\dagger N^{-1} d} is also called the generalized Wiener filter. NIFTy permits to define the involved operators :math:{R}, :math:{R^\dagger}, :math:{S}, and :math:{N} implicitely, as routines that can be applied to vectors, but which do not require the explicit storage of the matrix elements of the operators. Some of these operators are diagonal in harmonic (Fourier) basis, and therefore only require the specification of a (power) spectrum and :math:{S= F\,\widehat{P_s} F^\dagger}. Here :math:{F = \mathrm{HarmonicTransformOperator}}, :math:{\widehat{P_s} = \mathrm{DiagonalOperator}(P_s)}, and :math:{P_s(k)} is the power spectrum of the process that generated :math:{s} as a function of the (absolute value of the) harmonic (Fourier) space koordinate :math:{k}. For those, NIFTy can easily also provide inverse operators, as :math:{S^{-1}= F\,\widehat{\frac{1}{P_s}} F^\dagger} in case :math:{F} is unitary, :math:{F^\dagger=F^{-1}}. These implicit operators can be combined into new operators, e.g. to :math:{D^{-1} = S^{-1} + R^\dagger N^{-1} R}, as well as their inverses, e.g. :math:{D = \left( D^{-1} \right)^{-1}}. The invocation of an inverse operator applied to a vector might trigger the execution of a numerical linear algebra solver. Thus, when NIFTy calculates :math:{m = D\, j} it actually solves :math:{D^{-1} m = j} for :math:{m} behind the scenes. The advantage of implicit operators to explicit matrices is the reduced memory requirements. The reconstruction of only a Megapixel image would otherwithe require the storage and processing of matrices with sizes of several Terrabytes. Larger images could not be dealt with due to the quadratic memory requirements of explicit operator representations. The demo codes demos/getting_started_1.py and demos/Wiener_Filter.ipynb illustrate this. Generative Models ----------------- For more sophisticated measurement situations, involving non-linear measuremnts, unknown covariances, calibration constants and the like, it is recommended to formulate those as generative models for which NIFTy provides powerful inference algorithms. In a generative model, all known or unknown quantities are described as the results of generative processes, which start with simple probability distributions, like the uniform, the i.i.d. Gaussian, or the delta distribution. Let us rewrite the above free theory as a generative model: .. math:: s = A\,\xi with :math:{A} the amplitude operator such that it generates signal field realizations with the correct covariance :math:{S=A\,A^\dagger} when being applied to a white Gaussian field :math:{\xi} with :math:{\mathcal{P}(\xi)= \mathcal{G}(\xi, 1)}. The joint information Hamiltonian for the whitened signal field :math:{\xi} reads: .. math:: \mathcal{H}(d,\xi)= -\log \mathcal{P}(d,s)= \frac{1}{2} \xi^\dagger \xi + \frac{1}{2} (d-R\,A\,\xi)^\dagger N^{-1} (d-R\,A\,\xi) + \mathrm{const}. NIFTy takes advantage of this formulation in several ways: 1) All prior degrees of freedom have unit covariance which improves the condition number of operators which need to be inverted. 2) The amplitude operator can be regarded as part of the response, :math:{R'=R\,A}. In general, more sophisticated responses can be constructed out of the composition of simpler operators. 3) The response can be non-linear, e.g. :math:{R'(s)=R \exp(A\,\xi)}, see demos/getting_started_2.py. 4) The amplitude operator can be made dependent on unknowns as well, e.g. :math:A=A(\tau)= F\, \widehat{e^\tau} represents an amplitude operator with a positive definite, unknown spectrum defined in Fourier domain. The amplitude field :math:{\tau} would get its own amplitude operator, with a cepstrum (spectrum of a log spectrum) defined in quefrency space (harmonic space of a logarithmically binned harmonic space) to regularize its degrees of freedom by imposing some (user-defined level of) spectral smoothness. 5) NIFTy can calculate the gradient of the information Hamiltonian and the Fischer information metric with respect to all unknown parameters, here :math:{\xi} and :math:{\tau}, by automatic differentiation. The gradients are used for MAP and HMCF estimates, and the Fischer matrix is required in addition to the gradient by Metric Gaussian Variational Inference (MGVI), which is available in NIFTy as well. MGVI is an implicit operator extension of Automatic Differentiation Variational Inference (ADVI). The reconstruction of a non-Gaussian signal with unknown covarinance from a non-trivial (tomographic) response is demonstrated in demos/getting_started_3.py. Here, the uncertainty of the field and the power spectrum of its generating process are probed via posterior samples provided by the MGVI algorithm. +----------------------------------------------------+ | **Output of tomography demo getting_started_3.py** | +----------------------------------------------------+ | .. image:: images/getting_started_3_setup.png | | | +----------------------------------------------------+ | Non-Gaussian signal field, | | data backprojected into the image domain, power | | spectrum of underlying Gausssian process. | +----------------------------------------------------+ | .. image:: images/getting_started_3_results.png | | | +----------------------------------------------------+ | Posterior mean field signal | | reconstruction, its uncertainty, and the power | | spectrum of the process for different posterior | | samples in comparison to the correct one (thick | | orange line). | +----------------------------------------------------+