Global solvability and hypoellipticity on the torus for a class of differential operators withvariable coefficients

“…We remark that recently several authors have studied global hypoellipticity and solvability in this setting (see, for example, [8][9][10][11][14][15][16][25][26][27]33] and the references quoted therein). We recall that generalized Diophantine conditions have been given to characterize global hypoellipticitysolvability of classes of operators with variable coefficients (see [3,[8][9][10][14][15][16]). The simplest such condition was first used by Greenfield and Wallach [12] to show that the operator P ¼ @ t À a@ x ; aAR; is globally hypoelliptic in T 2 if and only if a is not a Liouville number.…”

Global hypoellipticity and global solvability in Gevrey classes on the n-dimensional torus

“…We remark that recently several authors have studied global hypoellipticity and solvability in this setting (see, for example, [8][9][10][11][14][15][16][25][26][27]33] and the references quoted therein). We recall that generalized Diophantine conditions have been given to characterize global hypoellipticitysolvability of classes of operators with variable coefficients (see [3,[8][9][10][14][15][16]). The simplest such condition was first used by Greenfield and Wallach [12] to show that the operator P ¼ @ t À a@ x ; aAR; is globally hypoelliptic in T 2 if and only if a is not a Liouville number.…”

Global hypoellipticity and global solvability in Gevrey classes on the n-dimensional torus

“…These operators include certain classes of systems of vector fields and certain classes of second order operators, but do not include operators in the form of a sum of squares of vector fields (see, e.g., [1,2,3,4,5,8]). In [9] the global solvability on the torus for a particular class of operators in the form of a sum of squares of vector fields with constant coefficients was studied.…”

Global Solvability on the Torus for Certain Classes of Operators in the Form of a Sum of Squares of Vector Fields

“…The study of global properties for vector fields and systems of vector fields defined on closed manifolds has made a great advance in the last decades, especially in the case where the manifold is a torus or a product of a torus by another closed manifold. See, for example, the impressive list of articles [2,3,7,[14][15][16][17][18][20][21][22] and references therein, discussing problems related to the global solvability and global hypoellipticity in the smooth, analytical and ultradifferentiable senses.…”

Partial Fourier series on compact Lie groups