Publications
Division of Mathematics 50 most recent publications
[1]
A. Borzi et al.,
"The leading coefficient of Lascoux polynomials,"
Discrete Mathematics, vol. 346, no. 2, 2023.
[2]
A. Eguizabal, O. Öktem and M. Persson,
"A deep learning one-step solution to material image reconstruction in photon counting spectral CT,"
in Proceedings Volume 12031, Medical Imaging 2022: Physics of Medical Imaging, 2022.
[3]
G. Colombo et al.,
"A tool for mapping microglial morphology, morphOMICs, reveals brain-region and sex-dependent phenotypes,"
Nature Neuroscience, vol. 25, no. 10, pp. 1379-+, 2022.
[4]
T. Bauer,
"Affine and formal abelian group schemes on p-polar rings,"
Mathematica Scandinavica, vol. 128, no. 1, pp. 35-53, 2022.
[5]
D. De Silva, S. Jeon and H. Shahgholian,
"Almost minimizers for a singular system with free boundary,"
Journal of Differential Equations, vol. 336, pp. 167-203, 2022.
[6]
M. Gerspach,
"Almost sure lower bounds for a model problem for multiplicative chaos in number theory,"
Mathematika, vol. 68, no. 4, pp. 1331-1363, 2022.
[7]
Q. Chen and R. de la Llave,
"Analytic genericity of diffusing orbits in a priori unstable Hamiltonian systems,"
Nonlinearity, vol. 35, no. 4, pp. 1986-2019, 2022.
[8]
P. A. Warrick et al.,
"Arrhythmia classification of 12-lead and reduced-lead electrocardiograms via recurrent networks, scattering, and phase harmonic correlation,"
Physiological Measurement, vol. 43, no. 9, 2022.
[9]
C. Charlier,
"Asymptotics of Muttalib-Borodin determinants with Fisher-Hartwig singularities,"
Selecta Mathematica, New Series, vol. 28, no. 3, 2022.
[10]
J. Hekking,
"Blow-ups and normal bundles in derived algebraic geometry and beyond,"
Doctoral thesis Stockholm : KTH Royal Institute of Technology, TRITA-SCI-FOU, 2022;62, 2022.
[11]
A. Brown, D. Damjanović and Z. Zhang,
"C-1 actions on manifolds by lattices in Lie groups,"
Compositio Mathematica, vol. 158, no. 3, pp. 529-549, 2022.
[12]
K. Bjerklöv,
"Circle maps driven by a class of uniformly distributed sequences on T,"
Bulletin of the London Mathematical Society, vol. 54, no. 3, pp. 910-928, 2022.
[13]
M. P. Forsström,
"Decay of Correlations in Finite Abelian Lattice Gauge Theories,"
Communications in Mathematical Physics, vol. 393, no. 3, pp. 1311-1346, 2022.
[14]
H. Andrade-Loarca et al.,
"Deep microlocal reconstruction for limited-angle tomography,"
Applied and Computational Harmonic Analysis, vol. 59, pp. 155-197, 2022.
[15]
H. Karlsson et al.,
"Deep-learning-based denoising for photon-counting CT : Image domain or projection domain?,"
in MEDICAL IMAGING 2022 : PHYSICS OF MEDICAL IMAGING, 2022.
[16]
L. Schoug, A. Sepulveda and F. Viklund,
"Dimensions of Two-Valued Sets via Imaginary Chaos,"
International mathematics research notices, vol. 2022, no. 5, pp. 3219-3261, 2022.
[17]
R. M. Skjelnes and G. Sædén Ståhl,
"Explicit projective embeddings of standard opens of the Hilbert scheme of points,"
Journal of Algebra, vol. 590, pp. 254-276, 2022.
[18]
P. Moreillon,
"Free convolutions and the Pearcey process in random matrix theory,"
Doctoral thesis Stockholm : KTH Royal Institute of Technology, TRITA-SCI-FOU, 2022;54, 2022.
[19]
E. Blackstone, C. Charlier and J. Lenells,
"Gap probabilities in the bulk of the Airy process,"
Random Matrices. Theory and Applications, vol. 11, no. 02, 2022.
[20]
G. Zickert and C. E. Yarman,
"Gaussian mixture model decomposition of multivariate signals,"
Signal, Image and Video Processing, vol. 16, no. 2, pp. 429-436, 2022.
[21]
K. Jochemko and M. Ravichandran,
"Generalized permutahedra : Minkowski linear functionals and Ehrhart positivity,"
Mathematika, vol. 68, no. 1, pp. 217-236, 2022.
[22]
B. Gustafsson and A. Sebbar,
"Hadamard's variational formula in terms of stress and strain tensors,"
Analysis and Mathematical Physics, vol. 12, no. 1, 2022.
[23]
B. Gustafsson,
"Harold S. Shapiro at KTH : some personal memories,"
Analysis and Mathematical Physics, vol. 12, no. 2, 2022.
[24]
G. Farré Puiggalí and B. Fayad,
"Instabilities of invariant quasi-periodic tori,"
Journal of the European Mathematical Society (Print), vol. 24, no. 12, pp. 4363-4383, 2022.
[25]
A. A. Sarma et al.,
"Internal Feedback in Biological Control : Architectures and Examples,"
in 2022 American Control Conference (ACC), 2022, pp. 456-461.
[26]
J. Stenberg et al.,
"Internal Feedback in Biological Control : Diversity, Delays, and Standard Theory,"
in 2022 American Control Conference (ACC), 2022, pp. 462-467.
[27]
G. Zickert, O. Öktem and C. E. Yarman,
"Joint Gaussian dictionary learning and tomographic reconstruction,"
Inverse Problems, vol. 38, no. 10, 2022.
[28]
A. Figalli, S. Kim and H. Shahgholian,
"Lipschitz regularity in vectorial linear transmission problems,"
Nonlinear Analysis, vol. 221, pp. 112911, 2022.
[29]
P. Meisner and A. Södergren,
"Low-lying zeros in families of elliptic curve L-functions over function fields,"
Finite Fields and Their Applications, vol. 84, 2022.
[30]
P. Jell et al.,
"Moduli Spaces of Co dimension-One Subspaces in a Linear Variety and their Tropicalization,"
The Electronic Journal of Combinatorics, vol. 29, no. 2, 2022.
[31]
D. Apushkinskaya, A. Petrosyan and H. Shahgholian,
"Nina Nikolaevna Uraltseva,"
Notices of the American Mathematical Society, vol. 69, no. 03, pp. 1-395, 2022.
[32]
K. Johansson and M. Rahman,
"On inhomogeneous polynuclear growth,"
Annals of Probability, vol. 50, no. 2, pp. 559-590, 2022.
[33]
Q. Chen, D. Damjanović and B. Petkovic,
"On simultaneous linearization of certain commuting nearly integrable diffeomorphisms of the cylinder,"
Mathematische Zeitschrift, vol. 301, no. 2, pp. 1881-1912, 2022.
[34]
B. K. Berntson, E. Langmann and J. Lenells,
"On the non-chiral intermediate long wave equation,"
Nonlinearity, vol. 35, no. 8, pp. 4549-4584, 2022.
[35]
B. K. Berntson, E. Langmann and J. Lenells,
"On the non-chiral intermediate long wave equation : II. Periodic case,"
Nonlinearity, vol. 35, no. 8, pp. 4517-4548, 2022.
[36]
E. Blackstone, C. Charlier and J. Lenells,
"Oscillatory Asymptotics for the Airy Kernel Determinant on Two Intervals,"
International mathematics research notices, vol. 2022, no. 4, pp. 2636-2687, 2022.
[37]
M. Dostert and A. Kolpakov,
"Packable hyperbolic surfaces with symmetries,"
Canadian mathematical bulletin, pp. 1-11, 2022.
[38]
E. Ström et al.,
"Photon-Counting CT Reconstruction With a Learned Forward Operator,"
IEEE Transactions on Computational Imaging, vol. 8, pp. 536-550, 2022.
[39]
L. El Hajj and H. Shahgholian,
"Quadrature identities with a background PDE,"
Analysis and Mathematical Physics, vol. 12, no. 2, 2022.
[40]
G. Pineda-Villavicencio and B. Schröter,
"Reconstructibility of Matroid Polytopes,"
SIAM Journal on Discrete Mathematics, vol. 36, no. 1, pp. 490-508, 2022.
[41]
B. Petkovic,
"Rigidity properties of certain discrete solvable group actions on tori,"
Doctoral thesis : KTH Royal Institute of Technology, TRITA-SCI-FOU, 2022;61, 2022.
[42]
S. Mason,
"Roughening in dimer models : Random matrix statistics and surface fluctuations,"
Doctoral thesis Stockholm : KTH Royal Institute of Technology, TRITA-SCI-FOU, 2022:66, 2022.
[43]
M. Dostert, A. Kolpakov and F. M. de Oliveira Filho,
"Semidefinite programming bounds for the average kissing number,"
Israel Journal of Mathematics, vol. 247, no. 2, pp. 635-659, 2022.
[44]
F. Galuppi, R. Mulas and L. Venturello,
"Spectral theory of weighted hypergraphs via tensors,"
Linear and multilinear algebra, pp. 1-31, 2022.
[45]
B. K. Berntson, E. Langmann and J. Lenells,
"Spin generalizations of the Benjamin-Ono equation,"
Letters in Mathematical Physics, vol. 112, no. 3, 2022.
[46]
E. Ahlqvist,
"Stacky Modifications and Operations in the Étale Cohomology of Number Fields,"
Doctoral thesis Stockholm : KTH Royal Institute of Technology, TRITA-SCI-FOU, 2022:41, 2022.
[47]
J. Adler et al.,
"Task adapted reconstruction for inverse problems,"
Inverse Problems, vol. 38, no. 7, 2022.
[48]
P. Bränden and K. Jochemko,
"The Eulerian Transformation,"
Transactions of the American Mathematical Society, vol. 375, no. 3, pp. 1917-1931, 2022.
[49]
A. B. Monvel, J. Lenells and D. Shepelsky,
"The Focusing NLS Equation with Step-Like Oscillating Background : The Genus 3 Sector,"
Communications in Mathematical Physics, vol. 390, no. 3, pp. 1081-1148, 2022.
[50]
C. Charlier and J. Lenells,
"The "Good" Boussinesq Equation : a Riemann-Hilbert Approach,"
Indiana University Mathematics Journal, vol. 71, no. 4, pp. 1505-1562, 2022.