On a double phase problem of Kirchhoff-type with variable exponent

In this paper, we deal with Dirichlet problems driven by multiphase operators with three variable exponents. As a regularity theory is still missing, we provide a priori upper bounds for the weak solutions of a very general class of such multi-phase Dirichlet problems. We emphatize that in order to achieve this result we apply De Giorgi's techniques. Then, we focus on a multi-phase Dirichlet problem with variable exponents which has in the reaction a Carathéodory function which satisfies general growth and coercivity structure conditions. We investigate the existence for such problem both of positive and negative weak solutions. Further, we produce extremal constant sign weak solutions, that is, we show that the problem under consideration admits a smallest positive weak solution and a largest negative weak solution.

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On a double phase problem of Kirchhoff-type with variable exponent

Cited by 3 publications

References 38 publications

Infinitely of solutions for fractional κ(ξ)$$ \kappa \left(\xi \right) $$‐Kirchhoff equation in Hκ(ξ)ϖ,ν;μ(Λ)$$ {\mathcal{H}}_{\kappa \left(\xi \right)}&#x0005E;{\varpi, \nu; \mu}\left(\Lambda \right) $$

Infinitely of solutions for fractional κ(ξ)$$ \kappa \left(\xi \right) $$‐Kirchhoff equation in Hκ(ξ)ϖ,ν;μ(Λ)$$ {\mathcal{H}}_{\kappa \left(\xi \right)}&#x0005E;{\varpi, \nu; \mu}\left(\Lambda \right) $$

On a class of Schrödinger–Kirchhoff-double phase problems with convection term and variable exponents

A priori upper bounds and extremal weak solutions for multi-phase problems with variable exponents

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On a double phase problem of Kirchhoff-type with variable exponent

Cited by 3 publications

References 38 publications

Infinitely of solutions for fractional κ(ξ)$$ \kappa \left(\xi \right) $$‐Kirchhoff equation in Hκ(ξ)ϖ,ν;μ(Λ)$$ {\mathcal{H}}_{\kappa \left(\xi \right)}&amp;#x0005E;{\varpi, \nu; \mu}\left(\Lambda \right) $$

Infinitely of solutions for fractional κ(ξ)$$ \kappa \left(\xi \right) $$‐Kirchhoff equation in Hκ(ξ)ϖ,ν;μ(Λ)$$ {\mathcal{H}}_{\kappa \left(\xi \right)}&amp;#x0005E;{\varpi, \nu; \mu}\left(\Lambda \right) $$

On a class of Schrödinger–Kirchhoff-double phase problems with convection term and variable exponents

A priori upper bounds and extremal weak solutions for multi-phase problems with variable exponents

Contact Info

Product

Resources

About

Infinitely of solutions for fractional κ(ξ)$$ \kappa \left(\xi \right) $$‐Kirchhoff equation in Hκ(ξ)ϖ,ν;μ(Λ)$$ {\mathcal{H}}_{\kappa \left(\xi \right)}^{\varpi, \nu; \mu}\left(\Lambda \right) $$

Infinitely of solutions for fractional κ(ξ)$$ \kappa \left(\xi \right) $$‐Kirchhoff equation in Hκ(ξ)ϖ,ν;μ(Λ)$$ {\mathcal{H}}_{\kappa \left(\xi \right)}^{\varpi, \nu; \mu}\left(\Lambda \right) $$