We present a discretization of the CP1 sigma model. We show that the discrete CP1 sigma model is described by a nonlinear partial second-order difference equation with rational nonlinearity. To derive discrete surfaces immersed in three-dimensional Euclidean space a 'complex' lattice is introduced. The so-obtained surfaces are characterized in terms of the quadrilateral cross-ratio of four surface points. In this way we prove that all surfaces associated with the discrete CP1 sigma model are of constant mean curvature. An explicit example of such discrete surfaces is constructed
We use various nonlinear geometric partial dierential equations to eciently solve several surface mo...
We consider a discrete classical integrable model on a three-dimensional cubic lattice. The solution...
International audienceWe investigate certain properties of $\mathfrak{su}(N)$ -valued two-dimensiona...
We present a discretization of the CP1 sigma model. We show that the discrete CP1 sigma model is des...
It is shown that time-independent solutions to the (2+1)-dimensional nonlinear O(3) sigma model may ...
Abstract. Soliton surfaces associated with the CPN−1 sigma model are constructed using the Generaliz...
The present work deals with a scale bridging approach to the curvatures of discrete models of struct...
International audienceThe main result of this paper is a discrete Lawson correspondence between disc...
In this paper, the Weierstrass technique for harmonic maps S² → CPN−1 is employed in order to obtain...
summary:In this paper we discuss planar quadrilateral (PQ) nets as discrete models for convex affine...
Abstract: We define a new theory of discrete Riemann surfaces and present its basic results. The key...
There are many discrete analog of the Painleve dierential equations. A classication of discrete Pain...
In this chapter, we give a brief account of the notion of discrete varifolds, which are general an...
A 3 dimensional analogue of Sakai’s theory concerning the relation between rational surfaces and dis...
We consider the CP2 non-linear σ-model in a four-dimensional Riemannian space as a natural extension...
We use various nonlinear geometric partial dierential equations to eciently solve several surface mo...
We consider a discrete classical integrable model on a three-dimensional cubic lattice. The solution...
International audienceWe investigate certain properties of $\mathfrak{su}(N)$ -valued two-dimensiona...
We present a discretization of the CP1 sigma model. We show that the discrete CP1 sigma model is des...
It is shown that time-independent solutions to the (2+1)-dimensional nonlinear O(3) sigma model may ...
Abstract. Soliton surfaces associated with the CPN−1 sigma model are constructed using the Generaliz...
The present work deals with a scale bridging approach to the curvatures of discrete models of struct...
International audienceThe main result of this paper is a discrete Lawson correspondence between disc...
In this paper, the Weierstrass technique for harmonic maps S² → CPN−1 is employed in order to obtain...
summary:In this paper we discuss planar quadrilateral (PQ) nets as discrete models for convex affine...
Abstract: We define a new theory of discrete Riemann surfaces and present its basic results. The key...
There are many discrete analog of the Painleve dierential equations. A classication of discrete Pain...
In this chapter, we give a brief account of the notion of discrete varifolds, which are general an...
A 3 dimensional analogue of Sakai’s theory concerning the relation between rational surfaces and dis...
We consider the CP2 non-linear σ-model in a four-dimensional Riemannian space as a natural extension...
We use various nonlinear geometric partial dierential equations to eciently solve several surface mo...
We consider a discrete classical integrable model on a three-dimensional cubic lattice. The solution...
International audienceWe investigate certain properties of $\mathfrak{su}(N)$ -valued two-dimensiona...