Outputs (212)

Nonparametric predictive inference for future order statistics (2017)
Journal Article
Coolen, F., Coolen-Maturi, T., & Alqifari, H. (2018). Nonparametric predictive inference for future order statistics. Communications in Statistics - Theory and Methods, 47(10), 2527-2548. https://doi.org/10.1080/03610926.2017.1342834

This paper presents nonparametric predictive inference for future order statistics. Given data consisting of n real-valued observations, m future observations are considered and predictive probabilities are presented for the r-th ordered future obser... Read More about Nonparametric predictive inference for future order statistics.

Shimizu’s Lemma for Quaternionic Hyperbolic Space (2017)
Journal Article
Cao, W., & Parker, J. R. (2018). Shimizu’s Lemma for Quaternionic Hyperbolic Space. Computational Methods and Function Theory - Springer, 18(1), 159-191. https://doi.org/10.1007/s40315-017-0212-4

We give a generalisation of Shimizu’s lemma to complex or quaternionic hyperbolic space in any dimension for groups of isometries containing an arbitrary parabolic map. This completes a project begun by Kamiya (Hiroshima Math J 13:501–506, 1983). It... Read More about Shimizu’s Lemma for Quaternionic Hyperbolic Space.

Towards a holographic quark matter crystal (2017)
Journal Article
Faedo, A. F., Mateos, D., Pantelidou, C., & Tarrío, J. (2017). Towards a holographic quark matter crystal. Journal of High Energy Physics, 2017(10), Article 139. https://doi.org/10.1007/jhep10%282017%29139

We construct the gravity dual of d = 4, N=4N=4 , SU(Nc) super Yang-Mills theory, coupled to Nf flavors of dynamical quarks, at non-zero temperature T and nonzero quark density Nq. The supergravity solutions possess a regular horizon if T > 0 and incl... Read More about Towards a holographic quark matter crystal.

Morse moves in flow categories (2017)
Journal Article
Lobb, A., Jones, D., & Schuetz, D. (2017). Morse moves in flow categories. Indiana University Mathematics Journal, 66(5), 1603-1657. https://doi.org/10.1512/iumj.2017.66.6136

The regular representations of GLN over finite local principal ideal rings (2017)
Journal Article
Stasinski, A., & Stevens, S. (2017). The regular representations of GLN over finite local principal ideal rings. Bulletin of the London Mathematical Society, 49(6), 1066-1084. https://doi.org/10.1112/blms.12099

Let o o be the ring of integers in a non-Archimedean local field with finite residue field, p p its maximal ideal, and r ⩾ 2 r⩾2 an integer. An irreducible representation of the finite group G r = GL N ( o / p r ) Gr=GLN(o/pr), for an integer N ⩾ 2 N... Read More about The regular representations of GLN over finite local principal ideal rings.

Long multiplet bootstrap (2017)
Journal Article
Cornagliotto, M., Lemos, M., & Schomerus, V. (2017). Long multiplet bootstrap. Journal of High Energy Physics, 2017(10), Article 119. https://doi.org/10.1007/jhep10%282017%29119

Assessing the Contribution of Nightly Rechargeable Grid-Scale Storage to Generation Capacity Adequacy (2017)
Journal Article
Edwards, G., Sheehy, S., Dent, C., & Troffaes, M. C. (2017). Assessing the Contribution of Nightly Rechargeable Grid-Scale Storage to Generation Capacity Adequacy. Sustainable Energy, Grids and Networks, 12, 69-81. https://doi.org/10.1016/j.segan.2017.09.005

This paper is concerned with assessing the contribution of grid-scale storage to generation capacity adequacy. Results are obtained for a utility-scale exemplar involving the Great Britain power system. All stores are assumed, for the purpose of capa... Read More about Assessing the Contribution of Nightly Rechargeable Grid-Scale Storage to Generation Capacity Adequacy.

The Open Flux Problem (2017)
Journal Article
Linker, J., Caplan, R., Downs, C., Riley, P., Mikic, Z., Lionello, R., …Owens, M. (2017). The Open Flux Problem. Astrophysical Journal, 848(1), Article 70. https://doi.org/10.3847/1538-4357/aa8a70

The heliospheric magnetic field is of pivotal importance in solar and space physics. The field is rooted in the Sun's photosphere, where it has been observed for many years. Global maps of the solar magnetic field based on full-disk magnetograms are... Read More about The Open Flux Problem.

Power-expected-posterior priors for generalized linear models (2017)
Journal Article
Fouskakis, D., Ntzoufras, I., & Perrakis, K. (2017). Power-expected-posterior priors for generalized linear models. Bayesian Analysis, 13(3), 721-748. https://doi.org/10.1214/17-ba1066

The power-expected-posterior (PEP) prior provides an objective, automatic, consistent and parsimonious model selection procedure. At the same time it resolves the conceptual and computational problems due to the use of imaginary data. Namely, (i) it... Read More about Power-expected-posterior priors for generalized linear models.

Maximum antichains in posets of quiver representations (2017)
Journal Article
Gellert, F., & Lampe, P. (2018). Maximum antichains in posets of quiver representations. Contributions to Algebra and Geometry, 59(1), 1-20. https://doi.org/10.1007/s13366-017-0359-1

We study maximum antichains in two posets related to quiver representations. Firstly, we consider the set of isomorphism classes of indecomposable representations ordered by inclusion. For various orientations of the Dynkin diagram of type A we const... Read More about Maximum antichains in posets of quiver representations.