AbstractWe construct a large family of commutative algebras of partial differential operators invariant under rotations. These algebras are isomorphic extensions of the algebras of ordinary differential operators introduced by Grünbaum and Yakimov corresponding to Darboux transformations at one end of the spectrum of the recurrence operator for the Jacobi polynomials. The construction is based on a new proof of their results which leads to a more detailed description of the one-dimensional theory. In particular, our approach establishes a conjecture by Haine concerning the explicit characterization of the Krall–Jacobi algebras of ordinary differential operators
In this work we examine C∗-algebras of Toeplitz operators over the unit ball in Cn and the unit poly...
AbstractThis paper develops the basic theory of pseudo-differential operators on Rn, through the Cal...
Abstract. We present a Lie algebra theoretical schema leading to integrable systems, based on the Ko...
AbstractWe first study some properties of images of commuting differential operators of polynomial a...
We construct families of bispectral difference operators of the form a(n)T + b(n) + c(n)T−1 where T ...
Fractional differential (and difference) operators play a role in a number of diverse settings: inte...
Geometrical aspects of the differential operators and mapping dynamics theory have been considered i...
Thesis (Ph.D.)--University of Washington, 2017-06This dissertation is an amalgamation of various res...
AbstractBy considering the factorizations (flags) and associated (simultaneous) second order Darboux...
AbstractAttached to a vector space V is a vertex algebra S(V) known as the βγ-system or algebra of c...
AbstractWe propose a method of constructing orthogonal polynomials Pn(x) (Krall's polynomials) that ...
AbstractWe consider for fixed positive integers p and q which are coprime the space of all pairs (P,...
We develop a class of Darboux transformations called additions for Jacobi operators. We show that by...
AbstractWe show that any scalar differential operator with a family of polynomials as its common eig...
This thesis work is about commutativity which is a very important topic in Mathematics, Physics, Eng...
In this work we examine C∗-algebras of Toeplitz operators over the unit ball in Cn and the unit poly...
AbstractThis paper develops the basic theory of pseudo-differential operators on Rn, through the Cal...
Abstract. We present a Lie algebra theoretical schema leading to integrable systems, based on the Ko...
AbstractWe first study some properties of images of commuting differential operators of polynomial a...
We construct families of bispectral difference operators of the form a(n)T + b(n) + c(n)T−1 where T ...
Fractional differential (and difference) operators play a role in a number of diverse settings: inte...
Geometrical aspects of the differential operators and mapping dynamics theory have been considered i...
Thesis (Ph.D.)--University of Washington, 2017-06This dissertation is an amalgamation of various res...
AbstractBy considering the factorizations (flags) and associated (simultaneous) second order Darboux...
AbstractAttached to a vector space V is a vertex algebra S(V) known as the βγ-system or algebra of c...
AbstractWe propose a method of constructing orthogonal polynomials Pn(x) (Krall's polynomials) that ...
AbstractWe consider for fixed positive integers p and q which are coprime the space of all pairs (P,...
We develop a class of Darboux transformations called additions for Jacobi operators. We show that by...
AbstractWe show that any scalar differential operator with a family of polynomials as its common eig...
This thesis work is about commutativity which is a very important topic in Mathematics, Physics, Eng...
In this work we examine C∗-algebras of Toeplitz operators over the unit ball in Cn and the unit poly...
AbstractThis paper develops the basic theory of pseudo-differential operators on Rn, through the Cal...
Abstract. We present a Lie algebra theoretical schema leading to integrable systems, based on the Ko...