Add to ORKG19 pagesIn the worldline formalism, scalar Quantum Electrodynamics on a 2-dimensional lattice is related to the areas of closed loops on this lattice. We exploit this relationship in order to obtain the moments of the algebraic areas over the set of loops that have fixed number of edges in the two directions. We show that these moments are the product of a combinatorial factor that counts the number of such loops, by a polynomial in the numbers of steps in each direction. Our approach leads to an algorithm for obtaining explicit formulas for these moments
When random walks on a square lattice are biased horizontally to move solely to the right, the proba...
Abstract We present an explicit solution of a simply stated, yet unsolved, combinatorial problem, ...
International audienceWe study the enumeration of closed walks of given length and algebraic area on...
19 pagesInternational audienceIn theworldline formalism, scalar Quantum Electrodynamics on a 2-dimen...
54 pages, 14 figuresWe use a discrete worldline representation in order to study the continuum limit...
20 pages, 1 figure, misprints corrected, one section in the Appendix addedInternational audienceWe p...
8 pages, LaTeX 2e. Reformulated in terms of q-commutatorsInternational audienceThe algebraic area pr...
In this article we analize statistical distributions of nearest-neighbour spacings between energy le...
We analyze several families of one and two-dimensional nearest neighbor Quantum Random Walks. Using ...
Joint work with Li Guo and Bin ZhangStarting from the principle of locality in quantum field theory,...
We derive a formula for the level spacing probability distribution in quantum graphs. We apply it to...
University of Minnesota M.S. thesis. January 2018. Major: Mathematics. Advisors: Vitaly Vanchurin, Y...
International audienceFor fixed $n>0$, the space of finite graphs on $n$ vertices is canonically ass...
We study the problem of determining the distribution of vertices of a particular given type in the s...
International audienceWe consider the dynamical properties of Quantum Walks defined on the d-dimensi...
When random walks on a square lattice are biased horizontally to move solely to the right, the proba...
Abstract We present an explicit solution of a simply stated, yet unsolved, combinatorial problem, ...
International audienceWe study the enumeration of closed walks of given length and algebraic area on...
19 pagesInternational audienceIn theworldline formalism, scalar Quantum Electrodynamics on a 2-dimen...
54 pages, 14 figuresWe use a discrete worldline representation in order to study the continuum limit...
20 pages, 1 figure, misprints corrected, one section in the Appendix addedInternational audienceWe p...
8 pages, LaTeX 2e. Reformulated in terms of q-commutatorsInternational audienceThe algebraic area pr...
In this article we analize statistical distributions of nearest-neighbour spacings between energy le...
We analyze several families of one and two-dimensional nearest neighbor Quantum Random Walks. Using ...
Joint work with Li Guo and Bin ZhangStarting from the principle of locality in quantum field theory,...
We derive a formula for the level spacing probability distribution in quantum graphs. We apply it to...
University of Minnesota M.S. thesis. January 2018. Major: Mathematics. Advisors: Vitaly Vanchurin, Y...
International audienceFor fixed $n>0$, the space of finite graphs on $n$ vertices is canonically ass...
We study the problem of determining the distribution of vertices of a particular given type in the s...
International audienceWe consider the dynamical properties of Quantum Walks defined on the d-dimensi...
When random walks on a square lattice are biased horizontally to move solely to the right, the proba...
Abstract We present an explicit solution of a simply stated, yet unsolved, combinatorial problem, ...
International audienceWe study the enumeration of closed walks of given length and algebraic area on...