Please note, we are currently updating the 2018 Journal Metrics. Revista Matemática Complutense is an international research journal supported by the School of Mathematics at Complutense University in Madrid. It publishes high quality research and survey articles across pure and applied mathematics. Fields of interests include: analysis, differential equations and applications, geometry, topology, algebra, statistics, computer sciences and astronomy. This broad interest is reflected in our interdisciplinary editorial board which is comprised of over 30 internationally esteemed researchers in diverse areas. The Editorial Board of Revista Matemática Complutense organizes the “Santaló Lecture”, a yearly event where a distinguished mathematician is invited to present a lecture at Complutense University and contribute to the journal. Past lecturers include: Charles T.C. Wall, Jack K. Hale, Hans Triebel, Marcelo Viana, Narayanswamy Balakrishnan, Nigel Kalton, Alfio Quarteroni, David E. Edmunds, Giuseppe Buttazzo, Juan L. Vázquez, Eduard Feireisl, Nigel Hitchin, Lajos Horváth, Hélène Esnault, Luigi Ambrosio, Ignacio Cirac and Bernd Sturmfels. The Santaló Lecturer for 2019 will be Noel Cressie from National Institute for Applied Statistics Research Australia (NIASRA), University of Wollongong.
Revista Matemática Complutense
Description
Identifiers
ISSN | 1139-1138 |
e-ISSN | 1988-2807 |
DOI | 10.1007/13163.1988-2807 |
Publisher
Springer International Publishing
Additional information
Data set: Springer
Articles
Revista Matemática Complutense > 2019 > 32 > 3 > 745-766
We prove that if $$p>1$$ p > 1 and $$\psi :]0,p-1[\rightarrow ]0,\infty [$$ ψ : ] 0 , p - 1 [ → ] 0 , ∞ [ is nondecreasing, then $$\begin{aligned} \sup _{0<\varepsilon<p-1} \psi (\varepsilon ) \Vert f\Vert _{L^{p-\varepsilon }(0,1)}\approx & {} \sup _{0<t<1} \psi \left( \frac{p-1}{1-\log t}\right) \Vert f^*\Vert _{L^{p}(t,1)} \\&\mathop {\Updownarrow }\limits...
Revista Matemática Complutense > 2019 > 32 > 3 > 579-599
Projected entangled pair states (PEPS) are used in practice as an efficient parametrization of the set of ground states of quantum many body systems. The aim of this paper is to present, for a broad mathematical audience, some mathematical questions about PEPS.
Revista Matemática Complutense > 2019 > 32 > 3 > 853-873
We consider the moduli space of log smooth pairs formed by a cubic surface and an anticanonical divisor. We describe all compactifications of this moduli space which are constructed using geometric invariant theory and the anticanonical polarization. The construction depends on a weight on the divisor. For smaller weights the stable pairs consist of mildly singular surfaces and very singular divisors...