## Contact

**KTH Royal Institute of Technology**

*SE-100 44 Stockholm Sweden +46 8 790 60 00*

[1]

P. Bränden, J. Leake and I. Pak, "Lower bounds for contingency tables via Lorentzian polynomials," *Israel Journal of Mathematics*, vol. 253, no. 1, pp. 43-90, 2023.

[2]

P. Bränden and K. Jochemko, "The Eulerian Transformation," *Transactions of the American Mathematical Society*, vol. 375, no. 3, pp. 1917-1931, 2022.

[3]

P. Bränden, "Spaces of Lorentzian and real stable polynomials are Euclidean balls," *FORUM OF MATHEMATICS SIGMA*, vol. 9, 2021.

[4]

P. Bränden and L. Solus, "Symmetric Decompositions and Real-Rootedness," *International mathematics research notices*, vol. 2021, no. 10, pp. 7764-7798, 2021.

[5]

P. Bränden and M. Leander, "Lecture hall P-partitions," *Journal of Combinatorics*, vol. 11, no. 2, pp. 391-412, 2020.

[6]

P. Bränden and J. Huh, "Lorentzian polynomials," *Annals of Mathematics*, vol. 192, no. 3, pp. 821-891, 2020.

[7]

N. Amini and P. Brändén, "Non-representable hyperbolic matroids," *Advances in Mathematics*, vol. 334, pp. 417-449, 2018.

[8]

P. Brändén and M. Chasse, "Classification theorems for operators preserving zeros in a strip," *Journal d'Analyse Mathematique*, vol. 132, no. 1, pp. 177-215, 2017.

[9]

P. Brändén, I. Krasikov and B. Shapiro, "ELEMENTS OF POLYA-SCHUR THEORY IN THE FINITE DIFFERENCE SETTING," *Proceedings of the American Mathematical Society*, vol. 144, no. 11, pp. 4831-4843, 2016.

[10]

P. Brändén, M. Leander and M. Visontai, "Multivariate Eulerian Polynomials and Exclusion Processes," *Combinatorics, probability & computing*, vol. 25, no. 4, pp. 486-499, 2016.

[11]

P. Brändén and M. Chasse, "Infinite log-concavity for polynomial pólya frequency sequences," *Proceedings of the American Mathematical Society*, vol. 143, no. 12, pp. 5147-5158, 2015.

[12]

P. Brändén and E. Ottergren, "A Characterization of Multiplier Sequences for Generalized Laguerre Bases," *Constructive approximation*, vol. 39, no. 3, pp. 585-596, 2014.

[13]

P. Brändén, "Hyperbolicity cones of elementary symmetric polynomials are spectrahedral," *Optimization Letters*, vol. 8, no. 5, pp. 1773-1782, 2014.

[14]

P. Brändén, "The Lee-Yang and Pólya-Schur programs. III. Zero-preservers on Bargmann-Fock spaces," *American Journal of Mathematics*, vol. 136, no. 1, pp. 241-253, 2014.

[15]

P. Bränden and L. Moci, "The multivariate arithmetic Tutte polynomial," *Transactions of the American Mathematical Society*, vol. 366, no. 10, pp. 5523-5540, 2014.

[16]

P. Brändén and J. Jonasson, "Negative Dependence in Sampling," *Scandinavian Journal of Statistics*, vol. 39, no. 4, pp. 830-838, 2012.

[17]

P. Brändén, "Solutions to two problems on permanents," *Linear Algebra and its Applications*, vol. 436, no. 1, pp. 53-58, 2012.

[18]

P. Brändén and L. Moci, "The multivariate arithmetic Tutte polynomial," *Discrete Mathematics & Theoretical Computer Science*, pp. 661-672, 2012.

[19]

P. Brändén, "A generalization of the Heine-Stieltjes theorem," *Constructive approximation*, vol. 34, no. 1, pp. 135-148, 2011.

[20]

P. Brändén, "Iterated sequences and the geometry of zeros," *Journal für die Reine und Angewandte Mathematik*, vol. 658, pp. 115-131, 2011.

[21]

P. Brändén and A. Claesson, "Mesh patterns and the expansion of permutation statistics as sums of permutation patterns," *The Electronic Journal of Combinatorics*, vol. 18, no. 2, pp. Paper 5-14, 2011.

[22]

P. Brändén, "Obstructions to determinantal representability," *Advances in Mathematics*, vol. 226, no. 2, pp. 1202-1212, 2011.

[23]

P. Brändén, "Discrete concavity and the half-plane property," *SIAM Journal on Discrete Mathematics*, vol. 24, no. 3, pp. 921-933, 2010.

[24]

J. Borcea and P. Brändén, "Hyperbolicity preservers and majorization," *Comptes rendus. Mathematique*, vol. 348, no. 15-16, pp. 843-846, 2010.

[25]

J. Borcea and P. Brändén, "Multivariate Polya-Schur classification problems in the Weyl algebra," *Proceedings of the London Mathematical Society*, vol. 101, pp. 73-104, 2010.

[26]

P. Brändén and R. González D'Leon, "On the half-plane property and the {T}utte group of a matroid," *Journal of combinatorial theory. Series B (Print)*, vol. 100, no. 5, pp. 485-492, 2010.

[27]

P. Bränden and D. G. Wagner, "A converse to the Grace-Walsh-Szego theorem," *Mathematical proceedings of the Cambridge Philosophical Society (Print)*, vol. 147, pp. 447-453, 2009.

[28]

P. Brändén, "Discrete Concavity and Zeros of Polynomials," *Electronic Notes in Discrete Mathematics*, vol. 34, pp. 531-535, 2009.

[29]

J. Borcea, P. Bränden and T. M. Liggett, "NEGATIVE DEPENDENCE AND THE GEOMETRY OF POLYNOMIALS," *Journal of The American Mathematical Society*, vol. 22, no. 2, pp. 521-567, 2009.

[30]

J. Borcea and P. Bränden, "Polya-Schur master theorems for circular domains and their boundaries," *Annals of Mathematics*, vol. 170, no. 1, pp. 465-492, 2009.

[31]

J. Borcea and P. Bränden, "The Lee-Yang and Polya-Schur Programs. II. Theory of Stable Polynomials and Applications," *Communications on Pure and Applied Mathematics*, vol. 62, no. 12, pp. 1595-1631, 2009.

[32]

J. Borcea and P. Bränden, "The Lee-Yang and Polya-Schur programs. I. Linear operators preserving stability," *Inventiones Mathematicae*, vol. 177, no. 3, pp. 541-569, 2009.

[33]

P. Bränden, "Actions on permutations and unimodality of descent polynomials," *European journal of combinatorics (Print)*, vol. 29, no. 2, pp. 514-531, 2008.

[34]

J. Borcea and P. Bränden, "Applications of stable polynomials to mixed determinants : Johnson's conjectures, unimodality, and symmetrized Fischer products," *Duke mathematical journal*, vol. 143, no. 2, pp. 205-223, 2008.

[35]

J. Borcea and P. Bränden, "Lee-Yang Problems and the Geometry of Multivariate Polynomials," *Letters in Mathematical Physics*, vol. 86, no. 1, pp. 53-61, 2008.

[36]

P. Bränden, "Polynomials with the half-plane property and matroid theory," *Advances in Mathematics*, vol. 216, no. 1, pp. 302-320, 2007.

[37]

P. Bränden, "On linear transformations preserving the Polya frequency property," *Transactions of the American Mathematical Society*, vol. 358, no. 8, pp. 3697-3716, 2006.

[38]

P. Brändén and T. Mansour, "Finite automata and pattern avoidance in words," *Journal of combinatorial theory. Series A (Print)*, vol. 110, no. 1, pp. 127-145, 2005.

[39]

P. Bränden, "Counterexamples to the Neggers-Stanley conjecture," *Electronic research announcements of the American Mathematical Society*, vol. 10, pp. 155-158, 2004.

[40]

P. Bränden, "On operators on polynomials preserving real-rootedness and the Neggers-Stanley conjecture," *Journal of Algebraic Combinatorics*, vol. 20, no. 2, pp. 119-130, 2004.

[41]

P. Bränden, "Sign-graded posets, unimodality of W-polynomials and the Charney-Davis conjecture," *The Electronic Journal of Combinatorics*, vol. 11, no. 2, 2004.

[42]

P. Bränden, "q-Narayana numbers and the flag h-vector," *Discrete Mathematics*, vol. 281, no. 03-jan, pp. 67-81, 2004.

[43]

P. Bränden, A. Claesson and E. Steingrimsson, "Catalan continued fractions, and increasing subsequences in permutations," *Discrete Mathematics*, vol. 258, no. 03-jan, pp. 275-287, 2002.

[44]

N. Amini and P. Bränden, "Non-representable hyperbolic matroids," in *Discrete Mathematics and Theoretical Computer Science*, 2016, pp. 37-48.

[45]

P. Brändén *et al.*, "Proof of the Monotone Column Permanent Conjecture," in *Notions of Positivity and the Geometry of Polynomials, *Petter Brändén, Mikael Passare, Mihai Putinar Ed., 1st ed. : Birkhäuser Verlag, 2011, pp. 63-78.

Senaste synkning med DiVA:

2024-02-25 00:49:51

**KTH Royal Institute of Technology**

*SE-100 44 Stockholm Sweden +46 8 790 60 00*