The following pages link to Juan Carlos Sampedro (Q312437):
Displaying 22 items.
- Some unit square integrals (Q312438) (← links)
- On a new constant related to Euler's constant (Q1635623) (← links)
- Global perturbation of nonlinear eigenvalues (Q2041944) (← links)
- New analytical and geometrical aspects of the algebraic multiplicity (Q2049349) (← links)
- Axiomatization of the degree of Fitzpatrick, Pejsachowicz and Rabier (Q2073452) (← links)
- Approximation schemes for path integration on Riemannian manifolds (Q2122200) (← links)
- Algebraic multiplicity and topological degree for Fredholm operators (Q2202211) (← links)
- On the space of infinite dimensional integrable functions (Q2310491) (← links)
- Some identities involving inverse Gamma integrals (Q2422054) (← links)
- Periodic solutions to superlinear indefinite planar systems: a topological degree approach (Q6046546) (← links)
- Generating loops and isolas in semilinear elliptic BVP's (Q6097523) (← links)
- On the colimits of certain Sobolev spaces (Q6152525) (← links)
- Orientability through the algebraic multiplicity (Q6171183) (← links)
- Existence of infinite product measures (Q6183672) (← links)
- Axiomatization of the degree of Fitzpatrick, Pejsachowicz and Rabier (Q6370891) (← links)
- Approximation Schemes for Path Integration on Riemannian Manifolds (Q6371297) (← links)
- Blow-up estimates and a priori bounds for the positive solutions of a class of superlinear indefinite elliptic problems (Q6520111) (← links)
- Bifurcation theory for Fredholm operators (Q6564437) (← links)
- On the \(L^p\)-spaces of projective limits of probability measures (Q6592152) (← links)
- Blow-up estimates and a priori bounds for the positive solutions of a class of superlinear indefinite elliptic problems (Q6650553) (← links)
- Periodic solutions to nonlocal pseudo-differential equations. A bifurcation theoretical perspective (Q6743388) (← links)
- A proof of a conjecture on the multiplicity of positive solutions of an indefinite superlinear problem (Q6761114) (← links)