Add to ORKGWe study linearization of lattice gauge theory. Linearized theory approximates lattice gauge theory in the same manner as the loop O(n)-model approximates the spin O(n)-model. Under mild assumptions, we show that the expectation of an observable in linearized Abelian gauge theory coincides with the expectation in the Ising model with random edge-weights. We find a similar relation between Yang-Mills theory and 4-state Potts model. For the latter, we introduce a new observable.Comment: 10 pages, 2 figure
In recent years nonlinear problems have several methods to be solved and utilize a well-known analyt...
In this proceeding contribution we discuss how to define canonical momenta for SU(N) lattice gauge t...
An automated approach, that relies on the use of distance and level set functions as explained in [1...
A formalism is proposed for developing phase-space representations of elementary quantum systems un...
Some fixed point results in semi-metric spaces as well as in symmetric spaces are proved. Applicatio...
This is a review paper on recent results for different types of generalized ordinary differential eq...
We propose a new extended G family of distributions. Some of its structural properties are derived a...
We prove Caccioppoli type estimates and consequently establish local Hölder continuity for a class o...
Fixed point theory has fascinated hundreds of researchers since 1922 with the celebrated Banach’s fi...
In this paper we deal with the linear two variable functional equation ℎ_0(x,y)f_0(g_0(x,y))+⋅⋅⋅+ℎ...
Assume that T : P -> R and U : P -> R are arbitrary mappings between two partially ordered rings P a...
In this study, we explore the effects of $\mathcal CP$-violating anomalous interactions of the top-q...
This new version uses the definitions and some of the results found in Sargent’s Macroeconomic Theor...
We give accurate estimates of the constants Cn(A(I),x) appearing in direct inequalities of the form ...
In this paper we establish some strong convergence theorem for two asymptotically non expansive mapp...
In recent years nonlinear problems have several methods to be solved and utilize a well-known analyt...
In this proceeding contribution we discuss how to define canonical momenta for SU(N) lattice gauge t...
An automated approach, that relies on the use of distance and level set functions as explained in [1...
A formalism is proposed for developing phase-space representations of elementary quantum systems un...
Some fixed point results in semi-metric spaces as well as in symmetric spaces are proved. Applicatio...
This is a review paper on recent results for different types of generalized ordinary differential eq...
We propose a new extended G family of distributions. Some of its structural properties are derived a...
We prove Caccioppoli type estimates and consequently establish local Hölder continuity for a class o...
Fixed point theory has fascinated hundreds of researchers since 1922 with the celebrated Banach’s fi...
In this paper we deal with the linear two variable functional equation ℎ_0(x,y)f_0(g_0(x,y))+⋅⋅⋅+ℎ...
Assume that T : P -> R and U : P -> R are arbitrary mappings between two partially ordered rings P a...
In this study, we explore the effects of $\mathcal CP$-violating anomalous interactions of the top-q...
This new version uses the definitions and some of the results found in Sargent’s Macroeconomic Theor...
We give accurate estimates of the constants Cn(A(I),x) appearing in direct inequalities of the form ...
In this paper we establish some strong convergence theorem for two asymptotically non expansive mapp...
In recent years nonlinear problems have several methods to be solved and utilize a well-known analyt...
In this proceeding contribution we discuss how to define canonical momenta for SU(N) lattice gauge t...
An automated approach, that relies on the use of distance and level set functions as explained in [1...