Constructive Matrix Theory
نویسنده
چکیده
We extend the technique of constructive expansions to compute the connected functions of matrix models in a uniform way as the size of the matrix increases. This provides the main missing ingredient for a non-perturbative construction of the φ 4 field theory on the Moyal four dimensional space.
منابع مشابه
Constructive Tensor Field Theory
We provide an up-to-date review of the recent constructive program for field theories of the vector, matrix and tensor type, focusing not on the models themselves but on the mathematical tools used.
متن کاملar X iv : h ep - l at / 9 91 20 08 v 1 4 D ec 1 99 9 Introducing Dynamical Triangulations to the Type IIB Superstrings
In order to consider non-perturbative effects of superstrings, we try to apply dynamical triangulations to the type IIB superstrings. The discretized action is constructed from the type IIB matrix model proposed as a constructive definition of superstring theory. The action has the local N=2 supersymmetry explicitly, and has no extra fermionic degrees of freedom. We evaluate the partition funct...
متن کاملDevelopment and Validation of a Parenting Styles Scale based on Glasser\'s Choice Theory
The present study set out to develop and validate a parenting styles questionnaire based on Glasser’s choice theory. The design of this quantitative research was correlational. The statistical population of the study was comprised of all parents of 7- to 18-year-old students in District 6 of Tehran in 2018. The drawn sample (N= 360) was selected by random multi-stage cluster sampling method. At...
متن کاملPhenomenology of love: The Destructive and Constructive Nature of Love
Love, this eminent humane experience, has been explored not only by writers and poets, but also by philosophers, psychologists and even experimental scientists. This paper aims to discuss a novel aspect in phenomenology of love, as the concept of destructive and constructive nature of love, which is to the best of our knowledge, presented for the first time. The fundamental idea of this paper w...
متن کاملOn Algebraic Simplifications of Linear Functional Systems
In this paper, we show how to conjointly use module theory and constructive homological algebra to obtain general conditions for a matrix R of functional operators (e.g., differential/shift/time-delay operators) to be equivalent to a block-triangular or block-diagonal matrix R (i.e., conditions for the existence of unimodular matrices V and W satisfying that R = V R W ). These results allow us ...
متن کامل