AbstractIn this work we prove the existence of a unique nonlocal solution for the vibrations of a nonhomogeneous stretched string in Sobolev spaces and without any smallness conditions on the size of the initial data
AbstractIn this paper we continue the existence theories of classical solutions of nonlinear evoluti...
In the current paper, in the domain $D=\{(t,x): t\in(0,T), x\in(0,L)\}$ we investigate the boundary ...
In this work we study the equation $Lu=f$, where $L$ is a degenerate elliptic operator, with Neumann...
AbstractIn this work we prove the existence of a unique nonlocal solution for the vibrations of a no...
AbstractIn this paper we analyze from the mathematical point of view a model for small vertical vibr...
A mathematical model for the small vibration of an elastic string is considered. The model takes int...
In this paper, we study a highly nonlocal parametric problem involving a fractional-type operator co...
The theorem involving a locally Lipschitz continuous function is proven with a global-in-time unifor...
In this thesis, we study the fine properties of solutions to quasilinear elliptic and parabolic equa...
AbstractWe consider the second order Cauchy problemu″+m(|A1/2u|2)Au=0,u(0)=u0,u′(0)=u1, where m:[0,+...
We consider Kirchhoff equations with strong damping, namely with a friction term which depends on a ...
AbstractWe prove a blow up result for the equation ωtt(x, t) = a(x)ϕ(ωx(x, t))ωxx(x, t), which can b...
In this article, we prove global well-posedness for a family of one dimensional nonlinear nonlocal C...
Consider the initial boundary value problem for degenerate dissipative wave equations of Kirchhoff t...
summary:The existence and uniqueness of classical global solution and blow up of non-global solution...
AbstractIn this paper we continue the existence theories of classical solutions of nonlinear evoluti...
In the current paper, in the domain $D=\{(t,x): t\in(0,T), x\in(0,L)\}$ we investigate the boundary ...
In this work we study the equation $Lu=f$, where $L$ is a degenerate elliptic operator, with Neumann...
AbstractIn this work we prove the existence of a unique nonlocal solution for the vibrations of a no...
AbstractIn this paper we analyze from the mathematical point of view a model for small vertical vibr...
A mathematical model for the small vibration of an elastic string is considered. The model takes int...
In this paper, we study a highly nonlocal parametric problem involving a fractional-type operator co...
The theorem involving a locally Lipschitz continuous function is proven with a global-in-time unifor...
In this thesis, we study the fine properties of solutions to quasilinear elliptic and parabolic equa...
AbstractWe consider the second order Cauchy problemu″+m(|A1/2u|2)Au=0,u(0)=u0,u′(0)=u1, where m:[0,+...
We consider Kirchhoff equations with strong damping, namely with a friction term which depends on a ...
AbstractWe prove a blow up result for the equation ωtt(x, t) = a(x)ϕ(ωx(x, t))ωxx(x, t), which can b...
In this article, we prove global well-posedness for a family of one dimensional nonlinear nonlocal C...
Consider the initial boundary value problem for degenerate dissipative wave equations of Kirchhoff t...
summary:The existence and uniqueness of classical global solution and blow up of non-global solution...
AbstractIn this paper we continue the existence theories of classical solutions of nonlinear evoluti...
In the current paper, in the domain $D=\{(t,x): t\in(0,T), x\in(0,L)\}$ we investigate the boundary ...
In this work we study the equation $Lu=f$, where $L$ is a degenerate elliptic operator, with Neumann...
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