Add to ORKGK. Igari has constructed a distribution null-solution for Fuchsian partial differential operators in the sense of Baouendi-Goulaouic, that is, operators with one Fuchsian variable. Our aim is to extend his result for operators having several Fuchsian variables with analytic coefficients defined by N. S. Madi.
Abstract. We will consider linear Fuchsian partial differential operators of the form P = (tDt)m + ∑...
AbstractWe consider a ramified Cauchy problem for Fuchsian operators of the form a(x,D)=x0(D0+qx0q−1...
Introduction. We study linear partial differential equations of Fuchsian type with respect to a hype...
We construct a distribution null-solution for {\em every} Fuchsian partial differential operator in ...
We construct a distribution null-solution for {\em every} Fuchsian partial differential operator in ...
Abstract. We give a structure theorem for distribution null-solutions to Fuchsian partial differenti...
We will consider linear Fuchsian partial differential operators of the form $\PP = (tD_t)^m + \sum_{...
We construct three types of solutions for a Fuchsian equation withvariable indices: (1) branched sol...
Given a linear, constant coefficient partial differential equation in ℝd+1, where one independent va...
For nonlinear partial differential equations, with several Fuchsian variables, we give sufficient co...
Without any assumption on the characteristic exponents, we give fundamental solutions of linear Fuch...
AbstractWe construct three types of solutions for a Fuchsian equation with variable indices: (1) bra...
We obtain conditions sufficient for the set of distribution solutions of a weakly nonlinear differen...
We obtain conditions sufficient for the set of distribution solutions of a weakly nonlinear differen...
This article presents a global version of the main theorem by Baouendi and Goulaouic cite{bago}, in...
Abstract. We will consider linear Fuchsian partial differential operators of the form P = (tDt)m + ∑...
AbstractWe consider a ramified Cauchy problem for Fuchsian operators of the form a(x,D)=x0(D0+qx0q−1...
Introduction. We study linear partial differential equations of Fuchsian type with respect to a hype...
We construct a distribution null-solution for {\em every} Fuchsian partial differential operator in ...
We construct a distribution null-solution for {\em every} Fuchsian partial differential operator in ...
Abstract. We give a structure theorem for distribution null-solutions to Fuchsian partial differenti...
We will consider linear Fuchsian partial differential operators of the form $\PP = (tD_t)^m + \sum_{...
We construct three types of solutions for a Fuchsian equation withvariable indices: (1) branched sol...
Given a linear, constant coefficient partial differential equation in ℝd+1, where one independent va...
For nonlinear partial differential equations, with several Fuchsian variables, we give sufficient co...
Without any assumption on the characteristic exponents, we give fundamental solutions of linear Fuch...
AbstractWe construct three types of solutions for a Fuchsian equation with variable indices: (1) bra...
We obtain conditions sufficient for the set of distribution solutions of a weakly nonlinear differen...
We obtain conditions sufficient for the set of distribution solutions of a weakly nonlinear differen...
This article presents a global version of the main theorem by Baouendi and Goulaouic cite{bago}, in...
Abstract. We will consider linear Fuchsian partial differential operators of the form P = (tDt)m + ∑...
AbstractWe consider a ramified Cauchy problem for Fuchsian operators of the form a(x,D)=x0(D0+qx0q−1...
Introduction. We study linear partial differential equations of Fuchsian type with respect to a hype...