A new plethystic symmetric function operator and the rational compositional shuffle conjecture at t </ce:hsp>= </ce:hsp>1/q

A new plethystic symmetric function operator and the rational compositional shuffle conjecture at t ce:hsp>= ce:hsp>1/q

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作者：Adriano Garsia^a ; ¹ ; ^{garsia@math.ucsd.edu" class="auth_mail" title="E-mail the corresponding author} ; Emily Sergel Leven^a ; ² ; ^{esergel@ucsd.edu" class="auth_mail" title="E-mail the corresponding author} ; Nolan Wallach^a ; ³ ; ^{nwallach@ucsd.edu" class="auth_mail" title="E-mail the corresponding author} ; Guoce Xin^b ; ⁴ ; ^{guoce.xin@gmail.com" class="auth_mail" title="E-mail the corresponding author}
关键词：Parking function ; Shuffle conjecture ; Plethysm
刊名：Journal of Combinatorial Theory, Series A
出版年：2017
出版时间：January 2017
年：2017
卷：145
期：Complete
页码：57-100
全文大小：653 K

文摘

Our main result here is that the specialization at Img" data-mathURL="/science?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0097316516300541&_mathId=si1.gif&_user=111111111&_pii=S0097316516300541&_rdoc=1&_issn=00973165&md5=bfb7cfcdb14e8aaf95e847d1ef0cf7a1" title="Click to view the MathML source">t=1/q

img="si1.gif" overflow="scroll"> t = 1 / q

of the ce?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0097316516300541&_mathId=si2.gif&_user=111111111&_pii=S0097316516300541&_rdoc=1&_issn=00973165&md5=d120c0b33398e3f66366b0b7fc128357" title="Click to view the MathML source">Q_km,kn

img="si2.gif" overflow="scroll"> Q_{k m, k n}

operators studied in Bergeron et al. [2] may be given a very simple plethystic form. This discovery yields elementary and direct derivations of several identities relating these operators at ce?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0097316516300541&_mathId=si1.gif&_user=111111111&_pii=S0097316516300541&_rdoc=1&_issn=00973165&md5=bfb7cfcdb14e8aaf95e847d1ef0cf7a1" title="Click to view the MathML source">t=1/q

img="si1.gif" overflow="scroll"> t = 1 / q

to the Rational Compositional Shuffle conjecture of Bergeron et al. [3]. In particular we show that if m, n and k are positive integers and ce?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0097316516300541&_mathId=si3.gif&_user=111111111&_pii=S0097316516300541&_rdoc=1&_issn=00973165&md5=ae30d03eead71033e8dd933c78819d88" title="Click to view the MathML source">(m,n)

img="si3.gif" overflow="scroll"> (m, n)

is a coprime pair then

ce" class="mathImg" data-mathURL="/science?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0097316516300541&_mathId=si4.gif&_user=111111111&_pii=S0097316516300541&_rdoc=1&_issn=00973165&md5=e7faa4800a0cf7d0b9f75f1fb511fbea"><img class="imgLazyJSB inlineImage" height="43" width="426" alt="View the MathML source" title="View the MathML source" src="/sd/grey_pxl.gif" data-inlimgeid="1-s2.0-S0097316516300541-si4.gif">

imceceim

img="si4.gif" overflow="scroll"> q^{\frac{(k m - 1) (k n - 1) + k - 1}{2}} Q_{k m, k n} {(- 1)}^{k n} |_{t = 1 / q} ce width="0.2em"> ce> = ce width="0.2em"> ce> \frac{{[k]}_{q}}{{[k m]}_{q}} e_{k m} [X {[k m]}_{q}]

where as customarily, for any integer ce?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0097316516300541&_mathId=si177.gif&_user=111111111&_pii=S0097316516300541&_rdoc=1&_issn=00973165&md5=8bb5b340ddf7713ce721dd4c8dc45a37" title="Click to view the MathML source">s≥0

img="si177.gif" overflow="scroll"> s \geq 0

and indeterminate u we set ce?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0097316516300541&_mathId=si6.gif&_user=111111111&_pii=S0097316516300541&_rdoc=1&_issn=00973165&md5=a73edd762f790ee2e9079d30254e214e" title="Click to view the MathML source">[s]_u=1+u+⋯+u^s−1

img="si6.gif" overflow="scroll"> {[s]}_{u} = 1 + u + \dots + u^{s - 1}

. We also show that the symmetric polynomial on the right hand side is always Schur positive. Moreover, using the Rational Compositional Shuffle conjecture, we derive a precise formula expressing this polynomial in terms of Parking Functions in the ce?_ob=MathURL&_method=retrieve&_eid=1-s2.0-S0097316516300541&_mathId=si69.gif&_user=111111111&_pii=S0097316516300541&_rdoc=1&_issn=00973165&md5=3ed99bf7ae48efaa5340eedea6950942" title="Click to view the MathML source">km×kn

img="si69.gif" overflow="scroll"> k m &times; k n

lattice rectangle.

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