Results 101 to 110 of about 41,853 (190)
Moments of L$L$‐functions via a relative trace formula
Proceedings of the London Mathematical Society, Volume 132, Issue 4, April 2026.Abstract We prove an asymptotic formula for the second moment of the GL(n)×GL(n−1)$\mathrm{GL}(n)\times \mathrm{GL}(n-1)$ Rankin–Selberg central L$L$‐values L(1/2,Π⊗π)$L(1/2,\Pi \otimes \pi)$, where π$\pi$ is a fixed cuspidal representation of GL(n−1)$\mathrm{GL}(n-1)$ that is tempered and unramified at every place, while Π$\Pi$ varies over a family of
Subhajit Jana, Ramon Nunes
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International Journal for Numerical Methods in Engineering, Volume 127, Issue 6, 30 March 2026.ABSTRACT The contribution deals with algebraic multigrid (AMG) based preconditioning methods for the iterative solution of a coupled linear system of equations arising in numerical simulations of failure of quasi‐brittle materials using generalized continuum approaches.
Nasser Alkmim +4 more
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For closed $k$-Schur Katalan functions $\fgλ{k}$ with $k$ a positive integer and $λ$ a $k$-bounded partition, Blasiak, Morse and Seelinger proposed the alternating dual Pieri rule conjecture and the $k$-branching conjecture. In the present paper, we positively prove the first one for large enough $k$ and for strictly decreasing partitions $λ ...
Fang, Yaozhou, Gao, Xing
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From double quantum Schubert polynomials to k-double Schur functions via the Toda lattice [PDF]
, 2011 Thomas Lam, Mark Shimozono
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Positive specializations of K-theoretic Schur P- and Q-functions [PDF]
Eric Marberg
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Expanding K-theoretic Schur Q-functions [PDF]
, 2021 Yu-Cheng Chiu, Eric Marberg
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A Pieri-type formula for $K$-$k$-Schur functions and a factorization formula [PDF]
, 2018 Motoki Takigiku
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ON SOME FACTORIZATION FORMULAS OF $K$-$k$-SCHUR FUNCTIONS (Combinatorics of Lie Type)
ON SOME FACTORIZATION FORMULAS OF $K$-$k$-SCHUR FUNCTIONS (Combinatorics of Lie Type)We give some new formulas about factorizations of K-ksim Schur functions g_{$lambda$}^{(k)}, analogous to the k-rectangle factorization formula s_{(t^{k+1-mathrm{t}})cup $lambda$}^{(k)}= s_{(t^{k+1-t})}^{(k)}s_{$lambda$}^{(k)} of k-Schur functions. Although the formula of the same form does not hold for K-k-Schur functions, we can prove that g_{R_{t}}^{
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Factorization formulas of $K$-$k$-Schur functions I [PDF]
, 2017 Motoki Takigiku
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